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Joint shear strength models for exterior RC beam-column connections exposed to biaxial and uniaxial cyclic loading
Journal Pre-proof Joint shear strength models for exterior RC beam-column connections exposed to biaxial and uniaxial cyclic loading Yasmin Murad PII:
S2352-7102(19)31066-6
DOI:
https://doi.org/10.1016/j.jobe.2020.101225
Reference:
JOBE 101225
To appear in:
Journal of Building Engineering
Received Date: 27 June 2019 Revised Date:
27 January 2020
Accepted Date: 27 January 2020
Please cite this article as: Y. Murad, Joint shear strength models for exterior RC beam-column connections exposed to biaxial and uniaxial cyclic loading, Journal of Building Engineering (2020), doi: https://doi.org/10.1016/j.jobe.2020.101225. This is a PDF file of an article that has undergone enhancements after acceptance, such as the addition of a cover page and metadata, and formatting for readability, but it is not yet the definitive version of record. This version will undergo additional copyediting, typesetting and review before it is published in its final form, but we are providing this version to give early visibility of the article. Please note that, during the production process, errors may be discovered which could affect the content, and all legal disclaimers that apply to the journal pertain. © 2020 Published by Elsevier Ltd.
Joint Shear Strength Models for Exterior RC Beam-Column Connections Exposed to Biaxial and Uniaxial Cyclic Loading
First Author: Yasmin Murad, Ph.D., DIC. PhD in Structural Engineering at Imperial College London, 2016 Assistant Professor Civil Engineering Department The University of Jordan Amman, Jordan 11942 Phone Number: + 962-79- 6666802 E-mail: [email protected] ORCID: 0000-0002-7845-5633
Joint Shear Strength Models for Exterior RC Beam-Column Connections Exposed to Biaxial and Uniaxial Cyclic Loading Abstract Joint shear strength models available in the literature can predict the shear strength for reinforced concrete (RC) beam-column connections exposed to uniaxial cyclic loading, while an accurate biaxial joint shear strength model is still lacking. Gene expression programming (GEP) is used in this research to develop uniaxial and biaxial joint shear strength models for exterior RC beam-to-column connections exposed to uniaxial and biaxial cyclic loading respectively. The GEP models are developed based on an experimental database available in the literature, where the models are randomly trained and tested. Uniaxial joint shear strength is also predicted using the ACI 352 and ASCE 41 formulations for connections exposed to uniaxial cyclic loading. The performance of the GEP models is statistically evaluated using the coefficient of determination R-squared. The R-squared values are 79%, 79%, 95% and 93 % for the ACI, ASCE, uniaxial GEP and biaxial GEP models, respectively. The R-squared values of the GEP models are high, which confirms their accuracy and indicates that they are more fitting to the experimental results than the ACI and ASCE formulations. Keywords Joint shear strength; biaxial cyclic loading; uniaxial cyclic loading; exterior RC beam-column connections; ACI 352; ASCE 41; gene expression programming.
Introduction Reinforced concrete (RC) buildings are 3D structural systems, where RC beam-column connections are subjected to complex stress state that can cause building collapse under severe loading conditions. The 3D behaviour of RC beam-column connections under seismic loading is limited in the literature. Few experimental studies have been conducted to investigate the behaviour of 3D RC beam-column connections exposed to biaxial cyclic loading. Most of these studies have shown that biaxial connections exposed to biaxial cyclic loading is severely damaged and have less strength than similar joints exposed to uniaxial cyclic loading. Hassan (1) has shown that joint shear strength of biaxial connections is almost 25% less than that measured in the uniaxial connections. Akguzel (2) has shown that joint shear strength of RC beam-column connection exposed to biaxial cyclic loading is remarkably less than that measured in uniaxial connections. Engindeniz (3) has confirmed that corner connections exposed to biaxial loading have suffered from rapid degradation in strength and stiffness at relatively low drift levels. Hertanto (4) has shown that joint shear strength has reduced around 33% for RC beam-column connections exposed to biaxial cyclic loading. There are many analytical and empirical models, available in the literature, which can predict the shear strength of RC beam-to-column connections under cyclic and monotonic loading. Most of these models focus on the behaviour of uniaxial 2D RC beam-column connections in framed structures. Strut and tie models are analytical models with mechanical basis but they depend on the diagonal strut area that is not easy to define. Empirical models are usually built on the basis of experimental test results and they are simple and less computational demanding. An accurate biaxial joint model that can predict joint shear strength of 3D RC beam-column connection in 3D structural system is still lacking. An elliptical interaction curve, which overestimates the bidirectional joint shear strength, is suggested by several researchers and is adopted in the ACI 352 (5). Hassan (1) confirmed the validity of the elliptical interaction model in unreinforced concrete joints exposed to biaxial cyclic loading. Murad (6) proposed a biaxial hysteresis joint model that considers the effect of variations in the angle of loading between the corner connection framing beams. Hassan and Moehle (7) have proposed that the reduction in biaxial strength is simply the vectorial resolution effect, which is a widely accepted interpretation in columns and even in nonlinear analysis of many structural components.
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Based on the experimental tests and analytical models available in the literature, joint shear is mainly controlled by concrete compressive strength, joint geometry, joint transverse reinforcement, beam reinforcement ratio, and column axial load. Previous studies have shown that the increase in joint shear strength is proportional to the increase in concrete compressive strength (8)(6)(9), and joint transverse reinforcement (10). Joint shear strength increases by the decrease in joint aspect ratio (8). In the BJ failure mode, hinges are formed in the beam followed by joint shear failure. Karaynnis (11) showed that the reinforcement configuration within the joint has a significant effect on the joint behaviour, where the rectangular spiral reinforcement has shown a better response than the ordinary stirrups. Kim and LaFave (12) (13) have investigated the behaviour of RC beam-to-column connections exposed to cyclic loading and they proposed a generalized Bayesian-based model for predicting the uniaxial joint shear strength. This research focuses on the behaviour of exterior connections exposed to cyclic loading since they are more vulnerable than interior connections, which are partially confined by beams framing in from all four sides. Joint shear strength models available in the literature can predict the shear strength for RC beamcolumn connections exposed to uniaxial cyclic loading, while an accurate biaxial joint shear strength model is still lacking. Therefore, the current research develops empirical models using Gene Expression Programming (GEP) that can predict joint shear strength of exterior connections exposed to uniaxial and biaxial cyclic loading. The aim of this research is to clarify the biaxial cyclic loading effect on corner RC beam-column connections. To compare between the uniaxial and biaxial joint shear strength, a GEP model that can predict the uniaxial shear strength is also developed in this research. Although there are several models available in the literature that can predict the uniaxial joint shear strength, a GEP model that can predict the uniaxial joint shear strength is lacking in the literature. Furthermore, GEP is used to develop a uniaxial joint model in order to create a consistent comparison between it and the biaxial joint model, which is also constructed using GEP. A comparison is also made between joint shear strength values obtained using the developed GEP models and the uniaxial joint shear expressions proposed by ACI 352 (5), and ASCE 41 (14).
Experimental database Gene expression programming is used in this research to develop two empirical models that can predict uniaxial and biaxial shear strengths of exterior connections exposed to cyclic loading. Large database is found for exterior connections exposed to uniaxial cyclic loading, while only few experimental programs are carried out for exterior connection exposed to biaxial cyclic loading. Uniaxial joint shear strength model is trained and tested using 200 data test points that collected from different experimental programs (1)(15)(16)(17)(18)(19)(20)(21)(22)(23)(24)(25)(26)(27)(28)(29)(30)(31)(32)(33)(34)(35)(36)(37)(38)(39) (40)(41)(42)(43)(44), while the biaxial joint shear strength is trained and tested using 8 data test points that collected from different biaxial joint tests (1) (3)(2)(4)(45)(46). Six biaxial specimens failed due to pure joint shear, while the other two specimens tested by Engindeniz (3) suffered from a mixed mode of bond failure in bottom bars, column yielding, and some cracking in the joint area. However, it is not confirmed that this mixed mode of failure triggered the full shear capacity of the joint, which may have failure prematurely, in one direction because of anchorage loss and in the other direction because of penetration of column bar yielding into the joint. Due to the scarcity in test data in the biaxial model, these specimens are considered in the biaxial joint shear strength model. The data used for training is 75% of the total database, while that used for validation is 25% of the total database for the uniaxial model, while 65% of the biaxial database is used for training the biaxial model and 35% of the database is used for validating the biaxial GEP model. Table A-1 and Table A-2 in the appendix summarise the database that used to develop the biaxial and uniaxial joint shear strength models respectively, where the training and testing data points are randomly selected from the database. The mode of failure is joint shear for the collected database shown in Table A-1 and Table A-2. The GEP models are developed using the square root concrete compressive strength, joint transverse reinforcement, column depth, joint panel width, beam reinforcement ratio, and column axial load.
Analytical background The ACI 352R-02 (5), and other current codes propose design formulations to predict the uniaxial joint shear strength for RC beam-column connections exposed to uniaxial cyclic loading but an accurate 2
expression that can predict the biaxial joint shear strength for RC beam-column connections exposed to biaxial cyclic loading is still lacking. The ACI 352R-02 (5) design equation, illustrated in Equation1, can predict the uniaxial joint shear strength of exterior RC beam-column connections exposed to uniaxial cyclic loading. The constant γ for exterior connections under cyclic loading is 12, the effective joint width, is the column depth, and is the concrete compressive strength. Equation 1 can also be applied to predict the uniaxial joint shear strength using the ASCE 41 (14) and ACI 369 (47), where the constant γ is considered 6 for joints without hoops. = 0.083 ℎ
(1)
Gene expression programming Overview of gene expression programming Gene expression programming (GEP) is an extension to gene programming and gene algorithm. GEP was developed by Ferreira and it has an advantage of solving complex problems with small database (48) without the need of any predefined equations (49). The developed gene expression is expressed into an expression tree that encoded in the chromosomes (48) (50) (51) (52) (53). The GEP expression can also be expressed using karva language and several programming languages (c++, VBA, Matlab, etc). The GEP expression is developed by adding or deleting various parameters to best fit the experimental results (49)(54). Empirical expressions can be developed using GEP for the cases, where the analytical expressions are not available. The GEP expression can contain one or more genes, where each gene has a head and tail. The gene’s tail has terminal symbols (constants and variables) such as (1,a, b, c), while the gene’s head has the functions and terminal symbols including constants, variables, functions and mathematical operators such as (1,a, b, √, cos ,*,−, /) (55). Complex functions (56) are usually resulted by increasing the number of genes (56). Furthermore, increasing the number of chromosomes has resulted in increasing the running time (56). Simplified procedures are usually adopted to create a new GEP model by choosing the fitness function and then selecting the terminals and functions that are required to build the chromosomes. The number of genes, the head length, and the number of chromosomes are then determined. The genetic operators and the linking functions are finally selected (48). Gene expression programming has become an efficient tool in predicting the behaviour of structural elements in civil engineering applications (57)(58)(59)(60)(56)(51)(61)(62)(63) based on the experimental database. Researchers have used GEP to predict the tensile strength of concrete (52), the compressive strength of high performance concrete (HPC) mixes (57), etc. Model Development Gene expression programming is applied in this research using GeneXproTools (64) software in order to develop biaxial and uniaxial joint shear strength models for exterior connections exposed to biaxial and uniaxial cyclic loading respectively. Several GEP models are developed by changing the number of genes, chromosomes, head size, and linking function. The selected GEP model is the one that best fit the experimental results. The selected parameters for the GEP models that best fit the experimental results are shown in Table 1. The genome of gene expression programming includes a linear, symbolic string or chromosome of fixed length. Each chromosome consists of one or more genes with a fixed length. The genes form the expression trees of different sizes and shapes. The function set includes all the functions and mathematical operators such as (+ ,* ,− , / ,x2 ,x3, √, cos, sin etc) that can be used in the development of the GEP equation. The developed GEP equation consists of one or multiple of genes, where increasing the number of genes generates complex GEP equations. The linking function such as (+ ,* ,− , / ) is the mathematical operator that links the genes together. The constants per gene determine the number of constants that can be used in the mathematical equation for each gene. The mutation rate can create diversity and change genomes by changing an element by another. For example, functions can be replaced by another function or terminal. Recombination rate incorporates the creation of new chromosomes by combining different parts from the parent chromosomes.
3
Transposition incorporates the introduction of an insertion sequence somewhere in a chromosome, while the inversion rate consists of a small sequence within a chromosome. Two genes are used to develop each GEP model in order to obtain simplified uniaxial and biaxial joint shear strength expressions. The genes are linked together using a multiplication linking function. Simplified functional set is used including addition, subtraction, multiplication, division, square root, and square functions. Two constants are used per gene for the uniaxial and biaxial GEP models. The constants of the uniaxial model are c0 = -7.4, c1= -12.75 for the first gene, while the second gene has only one constant that equals to c0 = -126.7. Biaxial joint model has 2 constants per gene. The constants of the first gene are (c0 = -2.49, c1= 6.18) and the constants of the second gene are (c0 = 4.98, c1= 45.81). The parameters that control the uniaxial shear strength in the GEP model are concrete compressive strength, joint transverse reinforcement, column depth, joint panel width, beam longitudinal reinforcement ratio, and column axial load. Biaxial GEP model is simple and it depends on the concrete compressive strength, joint transverse reinforcement, column depth, and joint panel width. The collected database is used to develop the GEP models, where the data points of the biaxial model are limited due to the scarcity of the biaxial database. The development of the GEP models normally requires 65% to 75% of the database to be used as a training database and the rest is to be used as a validating database. Thus, five points, which are randomly selected, are used to develop the biaxial GEP model, while the other three points, which are also randomly selected are used to verify the model. The validation and training points are randomly varied during the development process of the GEP model. The validation points shown in Figure 3 (c) are selected from Akguzel (2), Hertanto (4), and Chen (46) test results. Both GEP models are expressed mathematically in Equation 4 and 5 and using the expression tree format that shown in Figure 1 and Figure 2 for the uniaxial and biaxial joint shear strength models respectively. In the expression tree do, d1, d2, d3, d4 and d5 are square root concrete compressive strength ( ), joint transverse reinforcement ( ), column depth (ℎ ), joint panel width ( ), beam longitudinal reinforcement ratio ( ) , and column axial load ( ), respectively, while c0 and c1 are constants. It should be noted that the proposed biaxial joint model that best fit the experimental results is not influenced by column axial load and beam longitudinal reinforcement ratio but all the selected parameters are used to develop the uniaxial joint shear strength model. Thus, the column axial load and beam longitudinal reinforcement ratio are excluded from the biaxial joint shear strength expression and tree. Both GEP models can predict the biaxial and uniaxial joint shear strength of exterior RC connections exposed to cyclic loading with an acceptable accuracy. Table 1 Gep setting parameter GEP Function set +, -, *, /,√ , Genes 2 Chromosomes 30 Head Size 8 Linking Function Multiplication Constant per gene 2 Mutation rate 0.05 Inversion rate 0.1 Transposition rate 0.1 One point recombination rate 0.3 Two point recombination rate 0.3 Gene recombination rate 0.1 Gene transportation rate 0.1 The performance of the GEP models is then statistically evaluated using the coefficient of determination (R2) that defined in equation 2. The predicted joint shear strength values are compared to the experimental joint shear strength values that collected from the literature and it is found that the distribution of points is close to the ideal fit as shown in Figure 3 and Figure 4. This confirms that the proposed GEP models have an acceptable capacity in predicting the uniaxial and biaxial joint shear strengths. The mean absolute error (MAE) is also calculated in order to further validate the model. The MAE values for the uniaxial and 4
biaxial joint shear strengths are 41.68% and 9.67% respectively for all data. The MAE values, which indicate to the error, are low. -
' ' "∑) %*+($% &$)((% &( ), ($% &$' )- ∑) ((% &(' )-
! = ∑)
%*+
. /=
0
1
(2)
%*+
∑1 470|34 − 64 |
(3)
Biaxial and uniaxial joint shear strength models have high R-squared values for validation, training, and all data, which confirms that both GEP models have an excellent correlation between the predicted and experimental values and hence can predict the experimental joint shear strength with acceptable accuracy. A comparison is made between the experimental and predicted joint shear strengths for exterior connections exposed to biaxial and uniaxial cyclic loading in Figure 3 and Figure 4 respectively. Each figure illustrates the experimental vs predicted joint shear strength for the training, validation, and all data. The R-squared values for the biaxial GEP model are 98 %, 90 %, and 93% for the validation, training, and all data, respectively as shown in Figure 3. The R-squared values for the uniaxial GEP model are 94%, 98%, and 95% for the validation, training, and all data, respectively as shown in Figure 4. The ACI formulation and the GEP models have the same trends, where the shear strength, in all models, increases by the increase of concrete compressive strength, column depth, and joint panel width as shown in equation 1, 4, and 5. This confirms the consistency of the proposed GEP models with the analytical code formulation. The proposed biaxial joint model can predict the shear strength of RC beam to column connections exposed to biaxial cyclic loading with acceptable accuracy. It should be noted that the GEP model is built based on limited database thus it needs further verification with many more tests to be considered accurate. Existing models that can predict the biaxial joint shear strength are limited in the literature. Therefore, the proposed biaxial GEP model is a novel model that can easily predict the biaxial shear strength for RC beam-to-column connections exposed to biaxial cyclic loading.
5
Figure 1 Expression tree of the developed uniaxial GEP model
Figure 2 Expression tree of the developed biaxial GEP model The following expression predicts the uniaxial joint shear strength: = 89:"
+ 7.42, −
0@ ? A × "−7.42
× (
+ 12.75),E + F × G
× H(−126.72
−
0@ L
(4)
),W
(5)
) − (ℎ + )JK
The following expression predicts the biaxial joint shear strength: = GH−15.37"6.18 −
,J × H"−2.49 +
, + (ℎ −
)JK × N O
(a)
0
PQRS &?.TU
−(
+
)V − "91.6 − (
(b)
6
−
(c) Figure 3 Comparison between the predicted and experimental values of validating data using biaxial GEP model
(a)
(b)
(c) Figure 4 Comparison between the predicted and experimental values of training data using uniaxial GEP model
Comparison between the GEP models, the ACI 352, and ASCE 41, expressions As mentioned earlier, the ACI 352R-02 (5) design formulation can predict the uniaxial joint shear strength for RC beam-column connections exposed to uniaxial cyclic loading but an expression that can predict the biaxial joint shear strength for RC beam-column connections exposed to biaxial cyclic loading is still lacking. The ASCE 41 (14) is also used to calculate the shear strength of existing joints without hoops, which is the typical practice in the industry. Thus, the comparison is made between the biaxial GEP and uniaxial GEP models, the ACI 352, and the ASCE 41, expressions for the uniaxial joint shear strength as shown in Figure 5. The R-square values for both GEP models are higher than that obtained using the ACI expression, where the R-squared values are 79%, 79%, 95%, and 93 % for the ACI, ASCE, uniaxial GEP 7
Predicted Joint Shear Strength (kN)
and biaxial GEP models, respectively. Equation 1 is used to predict the uniaxial joint shear strength using the ACI 352 and ASCE 41 codes, where the constant γ is the only difference between the two codes as explained earlier. Although the joint shear strength values predicted using the ASCE 41 are lower than that values predicted using the ACI 352, the R-squared values for both codes is the same and equals to 79% because both codes have the same formulation with different values for the constant γ. Joint shear strength values predicted using the GEP models are more fitting to the experimental results than that obtained using the ACI 352 and ASCE 41 expressions. The trend of the GEP models in agreement with the trend of the ACI 352, ASCE 41, expressions and the experimental results. This confirms the consistency of the GEP models.
2500 2000
R² = 0.7899 uni-GEP
1500 R² = 0.9487
uni-ACI
1000 ASCE-41 R² = 0.7899
500
Bi-GEP R² = 0.9288
0 0
500
1000
1500
2000
2500
Experimental Joint Shear Strength (kN)
Figure 5 Comparison between the ACI, ASCE, and GEP models
Conclusion Joint shear strength models available in the literature can predict the shear strength for RC beam-column connections exposed to uniaxial cyclic loading, while an accurate biaxial joint shear strength model is still lacking. Biaxial and uniaxial joint shear strength models are developed in this research using gene expression programming for exterior RC beam-to-column connections exposed to uniaxial and biaxial cyclic loading respectively. Uniaxial and biaxial GEP models are randomly trained and tested using 200 and 8 data test points respectively. Uniaxial GEP model is developed using six main parameters including square root concrete compressive strength, joint transverse reinforcement, column depth, joint panel width, beam reinforcement ratio, and column axial load. Biaxial GEP model is developed using four main parameters including square root concrete compressive strength, joint transverse reinforcement, column depth, and joint panel width. Uniaxial joint shear strength is also predicted using the ACI 352 and ASCE 41 formulations. The coefficient of determination R-squared is used to evaluate the performance of the models. The values of R-squared are 79%, 79%, 95%, and 93 % for the ACI, ASCE, uniaxial GEP and biaxial GEP models, respectively. The high R-square value of the GEP models confirms their accuracy and indicates that they are more fitting to the experimental results than the ACI and ASCE formulations.
References 1.
W.M. Hassan Analytical and Experimental Assessment of Seismic Vulnerability of Beam-Column Joints without Transverse Reinforcement in Concrete Buildings. (Ph.D. thesis) University of California, Berkeley, (2011). URL: https://escholarship.org/uc/item/1k49h3mx.
2.
U. Akguzel Seismic Performance of FRP Retrofitted Exterior RC Beam-Column Joints under Varying Axial
8
and Bidirectional Loading. (Ph.D. thesis) University of Canterbury. (2011). URL: https://ir.canterbury.ac.nz/handle/10092/5993. 3.
M. Engindeniz Repair and strengthening of Pre-1970 reinforced concrete corner beam-column joints using CFRP composites. (Ph.D. thesis) Georgia Institute of Technology. (2008).
4.
E. Hertanto Seismic Assessment of Pre-1970s Reinforced Concrete Structure. (MS.c. thesis). University of Canterbury. (2005). URL: https://ir.canterbury.ac.nz/handle/10092/1120.
5.
ACI-ASCE Committee 352. Recommendations for Design of Beam-Column Connections in Monolithic Reinforced Concrete Structures (ACI-352R-02) Farmington Hills, MI, 2002.
6.
Y.Z. Murad Analytical and numerical assessment of seismically vulnerable corner connections under bidirectional loading in RC framed structures. (Ph.D. thesis). Imperial College London, (2016). URL: https://spiral.imperial.ac.uk/handle/10044/1/44493.
7.
W.M. Hassan, J.P. Moehle Shear Strength of Exterior and Corner Beam-Column Joints without Transverse Reinforcement. ACI Structural Journal, 115 (2018), pp. 1719–1727.
8.
R.L. Vollum, J.B. Newman Strut and tie models for analysisadesign of external beam-column joints. Magazine of Concrete Research, 51 (1999), pp. 415–425. DOI:10.1680/macr.1999.51.6.415. URL:
9.
Y. Murad, Y. Abu-Haniyi, A. Alkaraki, Z. Hamadeh An experimental study on cyclic behaviour of RC connections using waste materials as cement partial replacement. Canadian Journal of Civil Engineering. 46 (2018), pp. 522–533. http://www.nrcresearchpress.com/doi/10.1139/cjce-2018-0555.
10.
T. Paulay, M.J.N Priestley Seismic Design of Reinforced Concrete and Masonry Buildings. John Wiley & Sons, Inc. NewYork, 1992.
11.
C.G. Karayannis Mechanics of external RC beam-column joints with rectangular spiral shear reinforcement: experimental verification. Meccanica. 50 (2015), pp. 311–322. http://link.springer.com/10.1007/s11012-014-9953-6.
12.
J. Kim, J.M. LaFave Probabilistic Joint Shear Strength Models for Design of RC Beam-Column Connections. ACI Structural Journal. 105 (2008), pp. 770–780. DOI:10.14359/20105. URL:http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&I D=20105.
13.
J. Kim, J.M. LaFave, J. Song Joint shear behaviour of reinforced concrete beam–column connections. Magazine of Concrete Research. (61) 2009,
9
pp.
119–132.
http://www.icevirtuallibrary.com/doi/10.1680/macr.2008.00068 14.
ASCE-41. Seismic Evaluation and Retrofit of Existing Buildings (41-17), American Society of Civil Engineers2017.
15.
G.M.S. Alva, A.L.H de Cresce El Debs, M.K. El Debs An experimental study on cyclic behaviour of reinforced concrete connections. Canadian Journal of Civil Engineering. 34 (2007), http://www.nrcresearchpress.com/doi/10.1139/l06-164.
pp.
565–575.
16.
C.E. Chalioris, M.J. Favvata, C.G. Karayannis Reinforced concrete beam–column joints with crossed inclined bars under cyclic deformations. Earthquake Engineering & Structural Dynamics. (37) 2008, pp. 881–897. http://doi.wiley.com/10.1002/eqe.793.
17.
S.C. Chun, D.Y. Kim Evaluation of Mechanical Anchorage of Reinforcement by Exterior Beam-Column Joint Experiments. 13th World Conference on Earthquake EngineeringVancouver, B.C., Canada, (2004). pp. 326.
18.
G.M.S Alva Estudo teórico-experimental do comportamento de nós de pórtico de concreto armado submetidos a ações cíclicas. Biblioteca Digital de Teses e Dissertações da Universidade de São Paulo. São Carlos, 2004.
19.
G.M. Calvi, G. Magenes, S. Pampanin Studio sperimentale sulla risposta sismica di edifici a telaio in cemento armato progettati per soli carichi da gravita’. X Congresso Nazionale ‘L’ingegneria sismica in Italia. 2001. https://ir.canterbury.ac.nz/handle/10092/269.
20.
S.C. Chun, S.H. Lee, T.H. Kang, B. Oh, J.W. Wallace Mechanical Anchorage in Exterior Beam-Column Joints Subjected to Cyclic Loading. ACI Structural Journal. (104) 2007, pp. 102–113. DOI:10.14359/18438. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=184 38.
21.
N. Chutarat, R.S. Aboutaha Cyclic Response of Exterior Reinforced Concrete Beam-Column Joints Reinforced with Headed Bars—Experimental Investigation. ACI Structural Journal. (100) 2003, pp. 259–264. DOI:10.14359/12490. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=124 90.
22.
C.P. Pantelides, C. Clyde, L.D. Reaveley Performance-Based Evaluation of Reinforced Concrete Building Exterior Joints for Seismic Excitation. Earthquake Spectra. (18) 2002, pp. 449–480. http://earthquakespectra.org/doi/10.1193/1.1510447.
23.
A.J. Durrani, H.E. Zerbe Seismic Resistance of R/C Exterior Connections with Floor Slab. Journal of Structural Engineering. (113) 1987, pp. 1850–1864. DOI:10.1061/(ASCE)0733-9445(1987)113:8(1850). URL: http://ascelibrary.org/doi/10.1061/%28ASCE%290733-9445%281987%29113%3A8%281850%29
24.
M.R. Ehsani, F. Alameddine
10
Design Recommendations for Type 2 High-Strength Reinforced Concrete Connections. ACI Structural Journal. (88) 1991, pp. 277–291. DOI:10.14359/3108. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=310 8. 25.
M.R. Ehsani, A.E. Moussa, C.R. Valenilla Comparison of Inelastic Behavior of Reinforced Ordinary- and High-Strength concrete frames. ACI Structural Journal. (84) 1987, pp 161–169. DOI:10.14359/2841. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=284 1.
26.
M.R. Ehsani, J.K. Wight Effect of Transverse Beams and Slab on Behavior of Reinforced Concrete Beam-to-Column Connections. ACI Journal Proceedings. (82) 1985, pp. 188–195. DOI:10.14359/10327. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=103 27.
27.
M.R. Ehsani, J.K. Wight Exterior Reinforced Concrete Beam-to-Column Connections Subjected to Earthquake-Type Loading. ACI Journal Proceedings. (82), 1985, pp. 492–499. DOI:10.14359/10361. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=103 61.
28.
M. Gencoglu, E. Ilhan. An Experimental Study on the Effect of Steel Fiber Reinforced Concrete on the Behavior of the Exterior Beam-Column Joints Subjected to Reversal Cyclic Loading. Turkish Journal of Engineering and Environmental Sciences. (26) 2002, pp. 493 – 502. http://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.914.3967&rep=rep1&type=pdf
29.
S.J. Hamil Reinforced concrete beam-column connection behaviour. (Ph.D. thesis) Durham University., (2000). http://etheses.dur.ac.uk/1523/
30.
S. Hakuto, R. Park, H. Tanaka Seismic Load Tests on Interior and Exterior Beam-Column Joints with Substandard Reinforcing Details. ACI Structural Journal. (97) 2000, pp. 11–25. DOI:10.14359/829. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=829
31.
S.J. Hwang, H.J. Lee, K.C. Wang Seismic Design and Detailing of Exterior Reinforced Concrete Beam-Column Joints. 13 th World Conference on Earthquake EngineeringVancouver, B.C., Canada, (2004). pp. 397.
32.
I.B. Salim The influence of concrete strengths on the behaviour of external beam-column joints. Malaysia. (MS.c. thesis) Universiti Teknologi, 2007.
33.
C.G. Karayannis, C.E. Chalioris, G.M. Sirkelis Local retrofit of exterior RC beam–column joints using thin RC jackets—An experimental study. Earthquake Engineering & Structural Dynamics. (37) 2008, pp. 727–746. http://doi.wiley.com/10.1002/eqe.783.
11
34.
C. Karayannis, G. Sirkelis Response of columns and joints with spiral shear reinforcement. Computational Methods and Experimental Measurements XII. (41) 2005, pp. 455–463. DOI:1743-355X. URL: www.witpress.com.
35.
C. Liu Seismic behaviour of beam-column joint subassemblies reinforced with steel fibres. (MS.c. thesis) University of Canterbury. 2006. URL: https://ir.canterbury.ac.nz/handle/10092/1118.
36.
S. Pampanin, G.M. Calvi, M. Moratti Seismic Behavior of R.C. Beam-Column Joints Designed for Gravity Only. 12th European Conference on Earthquake EngineeringLondon, UK, (2002). pp. 726.
37.
C.P. Pantelides Assessment of reinforced concrete building exterior joints with substandard details. Pacific Earthquake Engineering Research Center,. Berkeley, 2002.
38.
D.E. Parker, P.J.M. Bullman Shear Strength Within Reinforced Concrete Beam-Column Joints. Structural Engineer. (75) 1997. URL: https://trid.trb.org/view/575180.
39.
R.H. Scott Intrinsic Mechanisms in Reinforced Concrete Beam-Column Connection Behavior. ACI Structural Journal. (93) 1996, pp. 336–346. DOI:10.14359/9693. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=969 3.
40.
A.G. Tsonos, I.A. Tegos, G.G Penelis Seismic Resistance of Type 2 Exterior Beam-Column Joints Reinforced With Inclined Bars. ACI Structural Journal. (89) 1993, pp. 3–12. DOI:10.14359/1278. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=127 8.
41.
A.G. Tsonos Lateral Load Response of Strengthened Reinforced Concrete Beam-to-Column Joints. ACI Structural Journal. (96) 1999, pp. 46–56. DOI:10.14359/595. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=595
42.
A.G. Tsonos Cyclic load behaviour of reinforced concrete beam-column subassemblages of modern structures. Structural Journal. (104) 2007, pp. 468–478. URL: www.witpress.com.
43.
Ridwan. Reinforced concrete beam-column joints strengthened in shear with embedded bars. (Ph.D. thesis) University of Birmingham. (2016). URL: https://etheses.bham.ac.uk/id/eprint/7138/
44.
J.S. Kuang, H.F. Wong Effects of beam bar anchorage on beam–column joint behaviour. Proceedings of the Institution of Civil Engineers - Structures and Buildings. (159) 2006, pp. 115–124. DOI:10.1680/stbu.2006.159.2.115. URL: http://www.icevirtuallibrary.com/doi/10.1680/stbu.2006.159.2.115.
12
45.
M. Engindeniz, L.F. Kahn, A.H. Zureick Pre-1970 RC corner beam-column-slab joints: Seismic adequacy and upgrading with CFRP composites. The 14th World Conference on Earthquake EngineeringBeijing, China, (2008).
46.
T.H. Chen Retrofit strategy of non-seismically designed frame systems based on a metallic haunch system. (MS.c. thesis) University of Canterbury. 2006. https://ir.canterbury.ac.nz/handle/10092/1222.
47.
ACI-369. Guide for Seismic Rehabilitation of Existing Concrete Frame Buildings and Commentary2011.
48.
C. Ferreira Gene Expression Programming in Problem Solving. Soft Computing and Industry. Springer London. London, 2002. Pp. 635–653.
49.
A. Cevik, M. Sonebi Modelling the performance of self-compacting SIFCON of cement slurries using genetic programming technique. Computers and Concrete. (5) 2008, pp. 475–490. DOI:10.12989/cac.2008.5.5.475. URL: http://koreascience.or.kr/journal/view.jsp?kj=KJKHDQ&py=2008&vnc=v5n5&sp=475
50.
M. Sarıdemir Genetic programming approach for prediction of compressive strength of concretes containing rice husk ash. Construction and Building Materials. (24) 2010, pp. 1911–1919. DOI:10.1016/j.conbuildmat.2010.04.011. URL: https://linkinghub.elsevier.com/retrieve/pii/S0950061810001315.
51.
A.H. Gandomi, A.H. Alavi, S. Kazemi, M. Gandomi Formulation of shear strength of slender RC beams using gene expression programming, part I: Without shear reinforcement. Automation in Construction. (42) 2014, pp. 112–121. DOI:10.1016/J.AUTCON.2014.02.007. URL: https://www.sciencedirect.com/science/article/pii/S0926580514000326.
52.
F. Özcan Gene expression programming based formulations for splitting tensile strength of concrete. Construction and Building Materials. (26) 2012, pp. 404–410. DOI:10.1016/J.CONBUILDMAT.2011.06.039. URL: https://www.sciencedirect.com/science/article/pii/S0950061811003023.
53.
S. Jafari, S.S. Mahini Lightweight concrete design using gene expression programing. Construction and Building Materials. (139) DOI:10.1016/J.CONBUILDMAT.2017.01.120. https://www.sciencedirect.com/science/article/pii/S0950061817301575.
2017,
pp.
93–100. URL:
54.
M. Sonebi, A. Cevik Genetic programming based formulation for fresh and hardened properties of self-compacting concrete containing pulverised fuel ash. Construction and Building Materials. (23) 2009, pp. 2614–2622. DOI:10.1016/J.CONBUILDMAT.2009.02.012. URL: https://www.sciencedirect.com/science/article/abs/pii/S0950061809000403
55.
S.B. Beheshti Aval, H. Ketabdari, S. Asil Gharebaghi Estimating Shear Strength of Short Rectangular Reinforced Concrete Columns Using Nonlinear
13
Regression and Gene Expression Programming. Structures. (12) 2017, pp. 13–23. DOI:10.1016/J.ISTRUC.2017.07.002. https://www.sciencedirect.com/science/article/pii/S2352012417300425
URL:
56.
A. Gholampour, A.H. Gandomi, T. Ozbakkaloglu New formulations for mechanical properties of recycled aggregate concrete using gene expression programming. Construction and Building Materials. (130) 2017, pp. 122–145. DOI:10.1016/J.CONBUILDMAT.2016.10.114. URL: https://www.sciencedirect.com/science/article/pii/S0950061816317408.
57.
S.M. Mousavi, P. Aminian, A.H. Gandomi, A.H. Alavi, H. Bolandi A new predictive model for compressive strength of HPC using gene expression programming. Advances in Engineering Software. (45) 2012, pp. 105–114. DOI:10.1016/J.ADVENGSOFT.2011.09.014. URL: https://www.sciencedirect.com/science/article/pii/S0965997811002535.
58.
S. Soleimani, S. Rajaei, P. Jiao, A. Sabz, S. Soheilinia New prediction models for unconfined compressive strength of geopolymer stabilized soil using multi-gen genetic programming. Measurement. (113) 2018, pp. 99–107. DOI:10.1016/J.MEASUREMENT.2017.08.043. URL: https://www.sciencedirect.com/science/article/pii/S0263224117305511
59.
J.C. Lim, M. Karakus, T. Ozbakkaloglu Evaluation of ultimate conditions of FRP-confined concrete columns using genetic programming. Computers & Structures. (162) 2016, pp. 28–37. DOI:10.1016/J.COMPSTRUC.2015.09.005. URL: https://www.sciencedirect.com/science/article/pii/S0045794915002643.
60.
I. González-Taboada, B. González-Fonteboa, F. Martínez-Abella, J.L. Pérez-Ordóñez Prediction of the mechanical properties of structural recycled concrete using multivariable regression and genetic programming. Construction and Building Materials. (106) 2016, pp. 480–499. DOI:10.1016/J.CONBUILDMAT.2015.12.136. URL: https://www.sciencedirect.com/science/article/pii/S0950061815308072.
61.
A. Nazari, F. Pacheco Torgal Modeling the compressive strength of geopolymeric binders by gene expression programmingGEP. Expert Systems with Applications. (40) 2013, pp. 5427–5438. DOI:10.1016/J.ESWA.2013.04.014. URL: https://www.sciencedirect.com/science/article/pii/S0957417413002510.
62.
Y. Murad, A. Ashteyat, R. Hunaifat Predictive model to the bond strength of FRP-to-concrete under direct pullout using gene expression programming. JOURNAL OF CIVIL ENGINEERING AND MANAGEMENT. (25) 2019, pp. 773–784. DOI:10.3846/jcem.2019.10798. URL: https://journals.vgtu.lt/index.php/JCEM/article/view/10798.
63.
Y. Murad, R. Imam, H. Abu Hajar, D. Habeh, A. Hammad, Z. Shawash Predictive compressive strength models for green concrete. International Journal of Structural Integrity. (2019). ahead-of-print(ahead-of-print). DOI:10.1108/IJSI-05-2019-0044. URL: https://www.emeraldinsight.com/doi/10.1108/IJSI-05-20190044.
64.
Gepsoft. Gepsoft GeneXproTools - Data Modeling & Analysis Software. . 2014 URL: https://www.gepsoft.com/
14
Appendix Table A-1 Biaxial joint shear database Authors and year
Specimen name
cylinder Concrete compressive strength (MPa)
Joint shear reinforcement area (mm2)
column depth (mm)
Joint width (mm)
joint aspect ratio
beam reinforcement ratio
Column axial load (N)
Number of cycles used in each displacement amplitude
Joint shear strength (N)
TDP-1 TDP-2 TDD-2
22.9 25 24.7
56.5487 56.5487 0
230 230 230
215 215 215
1.434 1.434 1.434
0.0196 0.0196 0.0220
0 0 0
4 4 4
97000 117000 141000
3D1
17.4
0
230
230
1.434
0.0191
115000
2
18820
specimen 1 specimen 2
34.12
0
356
330.5
1.43
0.0128
0
3
51000
34.54
0
356
330.5
1.43
0.0128
0
3
53000
B-J-1
30.43
0
457.2
431.8
1
0.0221
2862
2
765056
DD1
28.9
0
230
215
1
0.0224
200000
4
82200
Eric Hertanto 2005
Umut akguzel 2011 Engindeniz 2008
Hassan 2011 Chen 2006
*Joint width is calculated according to ACI-352
Table A-2 Uniaxial joint shear database
Authors and year
Specimen name
cylinder Concrete compressive strength (MPa)
Binbhu & Jaya 2008
A1 T1
Joint shear reinforcement Area
column depth
Joint width joint aspect ratio
beam reinforcement ratio
Column axial load (N)
Joint shear strength (N)
Joint shear strength predicted using ACI-352 (N)
Joint shear strength predicted using ASCE-41 (N)
(mm2)
(mm)
(mm)
36.7
396
150
100
1
0.1072
15920
74710
90507
45254
23.9
0
200
200
1.65
0.0163
120000
62290
194768
97384
JA-0
34
157
300
200
0.67
0.0151
102000
241230
348458
174229
Ja-S5
34
660
300
200
1
0.0151
102000
242760
348458
174229 174229
Ja-x12
34
383
300
200
1
0.0151
102000
241230
348458
JA-X14
34
465
300
200
1
0.0151
102000
24046
348458
174229
JB-0
31.6
0
300
200
1
0.0157
94800
230970
335934
167967
Calvi 2001
Chalioris 2008
JB-S1
31.6
101
300
200
1
0.0157
94800
252530
335934
167967
JB-X10
31.6
157
300
200
1
0.0157
94800
247160
335934
167967
JB-X12
31.6
226
300
200
1
0.0157
94800
245630
335934
167967
JCA-0
20.6
0
200
100
1
0.0157
41200
241230
90411
45206
JCA-X10
20.6
157
200
100
1
0.0157
41200
70470
90411
45206
JCA-S1
20.6
101
200
100
1
0.0157
41200
69370
90411
45206
JCA-S1X10
20.6
258
200
100
1
0.0157
41200
70470
90411
45206
JCA-s2
200
100
1
0.0157
41200
69010
90411
45206
20.6
201
jca-s2x10
20.6
358
200
100
1
0.0157
41200
70110
90411
45206
jcb-0
20.6
0
200
100
1
0.0236
46000
105770
90411
45206
jcb-x10
20.6
157
200
100
1
0.0236
46000
103860
90411
45206
jcb-s1
20.6
101
200
100
1
0.0236
46000
104980
90411
45206 45206
jcb-s1x10
20.6
258
200
100
1
0.0236
46000
105340
90411
jcb-s2
20.6
201
200
100
1
0.0236
46000
106080
90411
45206
jcb-s2x10
20.6
358
200
100
1
0.0236
46000
106440
90411
45206
15
Chun & kim 2004
Chun 2007
Chutarat & Aboutaha 2003
jc-2
60.1
2752
500
425
1
0.0213
490000
1343.89
1640799
820400
jm-2
60.1
2752
500
425
1
0.0213
490000
1342.22
1640799
820400
jc-2
60.1
4054
500
425
1
0.0213
0
1199900
1640799
820400
jm-2
60.1
4054
500
425
1
0.0213
0
1197600
1640799
820400
32.8
3103
520
550
0.97
0.0169
0
1125630
1631407
815703
32.8
3103
520
550
0.97
0.0169
0
1113890
1631407
815703
32.8
3103
520
550
0.97
0.0169
0
1080400
1631407
815703
27.6
1548
406
381
1.126
0.0246
0
932470
809403
404702
27.6
1548
406
381
1.126
0.0433
0
1188600
809403
404702
#2
55.7
774
457
305
0.888
0.0371
689000
1154340
1036103
518052
#4
49.4
774
457
305
0.888
0.0371
1380000
1302610
975751
487875
#5
44.6
774
457
305
0.888
0.0371
1357000
1184770
927135
463567
#6
48.3
774
457
305
0.888
0.0371
587000
1104490
964826
482413
J1
47.4
2280
305
279.5
1.249
0.0246
175000
457790
584561
292281
J2
47
2280
305
279.5
1.249
0.0246
175000
633500
582090
291045
J5
46.6
2280
305
279.5
1.249
0.0328
175000
985980
579607
289804
J7
49
2280
305
279.5
1.249
0.0382
175000
760570
594346
297173
jc-no.111 jm no. 11-1a jm -no 11-1b
I-GROUP 1 IIGROUP 1
CLYDE 2000
DURRANI & ZERBE 1987
EHSANI & ALAMEDDINE 1991
EHSANI 1987
EHSANI & WIGHT 1985 A
LL8
55.1
2294
356
337
1.427
0.0319
293700
942960
886982
443491
LH8
55.1
3054
356
337
1.427
0.0319
293700
946930
886982
443491
HL8
55.1
2533
356
337
1.427
0.0408
507300
1231020
886982
443491
HH8
55.1
3293
356
337
1.427
0.0408
507300
1230020
886982
443491
LL11
75.8
2294
356
337
1.427
0.0319
285000
929150
1040337
520168
LH11
75.8
3054
356
337
1.427
0.0319
276000
925090
1040337
520168
HL11
75.8
2533
356
337
1.427
0.0408
587000
1177460
1040337
520168
HH14
96.5
3293
356
337
1.427
0.0408
605000
1217610
1173824
586912
LL14
96.5
2294
356
337
1.427
0.0319
236000
936500
1173824
586912
LH14
96.5
3054
356
337
1.427
0.0319
222000
933530
1173824
586912
HH11
96.5
3293
356
337
1.427
0.0408
605200
1217610
1173824
586912
1
64.6
1333
340
320
1.411
0.0202
133000
676160
870973
435486
2
67.2
1333
340
320
1.411
0.0247
338000
592680
888327
444164
3
64.6
1333
300
279.5
1.463
0.0279
383000
716270
671241
335621
4
67.2
1534
300
279.5
1.463
0.0346
325000
920970
684616
342308
5
44.6
1333
300
279.5
1.463
0.0449
222000
843450
557737
278869
1S
51.4
1080
300
279.5
1.6
0.019
222000
384560
598748
299374
2S
47.6
1333
300
279.5
1.6
0.019
222000
368860
576190
288095
3S
34.9
1080
300
279.5
1.463
0.019
222000
402160
493373
246686
6S
42.3
1080
340
320
1.412
0.0201
303310
490650
704788
352394
16
EHSANI & WIGHT 1985 B
GENCOGLU & EREN 2002
HAMIL 2000
1B
40.5
1080
300
279.5
1.6
0.0449
177870
591210
531484
265742
2B
42.1
1080
300
279.5
1.463
0.0449
221870
679470
541880
270940
3B
49.3
1333
300
279.5
1.6
0.0449
221870
1053730
586389
293195
4B
53.8
1333
300
279.5
1.463
0.0449
221870
1062200
612567
306283
5B
29.3
1520
340
320
1.412
0.0402
356580
444270
586573
293286
6B
48
1080
340
320
1.412
0.03
303820
437010
750773
375387
#2
39.5
0
400
250
1.5
0.0092
150000
114040
625976
312988
C6LN0
53.1
0
150
130
1.4
0.0357
50000
113900
141528
70764
C6LN1
53.1
57
150
130
1.4
0.0357
50000
118650
141528
70764
C6LN3
50.6
170
150
130
1.4
0.0357
50000
137860
138156
69078
C6LN5
38.2
283
150
130
1.4
0.0357
50000
164680
120040
60020
C6LH0
104.6
0
150
130
1.4
0.0357
100000
163860
198637
99318
C6LH1
105.4
57
150
130
1.4
0.0357
100000
169070
199395
99697
C6LH3
100.4
170
150
130
1.4
0.0357
100000
187650
194608
97304
C4ALN0
44
0
150
130
1.4
0.0357
50000
129600
128831
64415
C4ALN1
47.3
57
150
130
1.4
0.0357
50000
162260
133575
66787
C4ALN3
43.2
170
150
130
1.4
0.0357
50000
168300
127654
63827
C4ALN5
52.3
283
150
130
1.4
0.0357
50000
185170
140457
70229
C4ALH0
107.9
283
150
130
1.4
0.0357
100000
200980
201746
100873
O6
41
57
460
380
1.087
0.0107
0
434300
1114789
557395
O7
37.3
57
460
380
1.087
0.0107
0
440240
1063298
531649
RK3
57.2
1030
200
150
1.5
0.0419
500000
402000
225984
112992
RK4
51.7
1030
200
150
1.5
0.0419
500000
357000
214845
107423
RK5
54.9
1030
200
150
1.5
0.0419
500000
423000
221394
110697
RK6
86.5
1030
200
150
1.5
0.0419
500000
556000
277900
138950
RK7
54.7
1030
200
150
2
0.0419
500000
277000
220991
110495
RK8
38.9
1030
200
150
1.5
0.0419
500000
273000
186361
93181
HAKUTO 2000
HEGGER 2003
70-2T5
92.3
2431
450
385
1
0.02
196000
1276660
1657805
828902
70-1T55
84
2431
450
385
1
0.02
196000
1282170
1581511
790756
28-3T4
42.2
4028
550
465
0.909
0.0134
196000
1200810
1654745
827373
28-0T0
39.8
3278
550
465
0.909
0.0134
196000
1230620
1607002
803501
HWANG 2004
0T0
81.1
1639
420
370
1.071
0.0229
196000
1078820
1393865
696933
1B8
74.5
1639
420
370
1.071
0.0229
196000
1151020
1335945
667972
3T3
83.1
2277
420
370
1.071
0.0229
196000
1058500
1410948
705474
2T4
85.5
2146
420
370
1.071
0.0229
196000
1066320
1431177
715589
1T44
87.7
2146
420
370
1.071
0.0229
196000
1072570
1449473
724737
3T4
90.7
2779
450
385
1
0.0202
196000
1280760
1643373
821687
2T5
92.3
2431
450
385
1
0.0202
196000
1272890
1657805
828902
1T55
84
2431
450
385
1
0.0202
196000
1278400
1581511
790756
S1
36.1
0
180
165
1.67
0.0318
90000
194080
177734
88867
S2
94
0
180
165
1.67
0.0318
90000
199040
286800
143400
HUANG 2005
IDAYANI 2007
17
170
180
165
1.67
0.0318
90000
223870
177734
88867
31.6
0
200
200
1.5
0.0079
152290
82560
223956
111978
31.6
101
200
200
1.5
0.0079
126400
82930
223956
111978
A2
31.6
201
200
200
1.5
0.0079
152290
82930
223956
111978
A3
31.6
302
200
200
1.5
0.0079
152290
82200
223956
111978
B0
31.6
0
300
200
1
0.0157
228430
227810
335934
167967
B1
31.6
101
300
200
1
0.0157
228430
253290
335934
167967
C0
31.6
157
300
200
1
0.0151
228430
239700
335934
167967
C2
31.6
358
300
200
1
0.0151
228430
242760
335934
167967
C3
31.6
459
300
200
1
0.0151
228430
239700
335934
167967
C5
31.6
660
300
200
1
0.0151
228430
243530
335934
167967
AJ1S
32.8
101
200
200
1.5
0.0079
70000
84830
228169
114084
A1
36.4
0
200
200
1.5
0.0079
70000
74950
240364
120182
A2
36.4
0
200
200
1.5
0.0079
70000
76070
240364
120182
B1
36.4
402
200
200
1.5
0.0079
70000
77190
240364
120182
B2
36.4
402
200
200
1.5
0.0079
70000
77190
240364
120182
BS-OL
30.9
0
300
280
1.5
0.0209
402980
264210
465070
232535
BS-LL
30.9
0
300
280
1.5
0.0209
402980
534590
465070
232535
BS-U
30.9
0
300
280
1.5
0.0209
402980
411210
465070
232535
BS-L-LS
30.9
0
300
280
1.5
0.0209
402980
415730
465070
232535
E1
30.4
435
300
300
1
0.0268
216000
535550
494241
247120
E2
30.4
435
300
300
1
0.0268
216000
371130
494241
247120
B2
28.3
435
300
300
1
0.0177
216000
370030
476865
238432
LEE & KO 2007
W0
34.8
1402
400
450
1.125
0.0127
835200
907830
1057600
528800
LIU 2006
RC-1
18
0
230
215
1.4348
0.0178
75000
148710
208959
104480
T5
21.5
603
300
300
1.67
0.0124
290250
267900
415644
207822
T9
21.5
603
300
300
1.67
0.0124
580500
303200
415644
207822
T10
21.5
603
300
300
1.67
0.0124
290250
322500
415644
207822
T2
29.1
0
200
200
1.65
0.0164
100000
72090
214915
107457
1
39.9
0
406
406
1
0.0314
546700
1224550
1037046
518523
2
36.4
0
406
406
1
0.0314
1247000
1110450
990517
495259
3
41
0
406
406
1
0.0314
561500
1045820
1051244
525622
4
38.1
0
406
406
1
0.0314
1304800
1771780
1013384
506692
5
38.2
0
406
406
1
0.0314
523600
966870
1014713
507356
KARAYANNIS 2008
KARAYANNIS & SIRKELIS 2005
KARAYANNIS & SIRKELIS 2008
KUANG & WONG 2006
KUSHARA & SHIOHARA 2008
MASI 2009
PAMPANIN 2002
PANTELIDES 2002
S3
36.1
A0 A1
18
PARKER & BULIMAN 1997
6
37.3
0
406
406
1
0.0314
1280000
1160640
1002688
501344
4A
49
0
300
275
1.67
4B
49
0
300
275
1.67
0.0218
0
231270
575190
287595
0.0218
300000
270470
575190
4C
46
0
300
275
287595
1.67
0.0218
570000
333190
557304
4D
49
0
300
278652
275
1.67
0.0218
0
293990
575190
287595
4E
50
0
300
275
1.67
0.0218
300000
313590
581030
290515
4F
47
0
300
275
1.67
0.0218
600000
358670
563329
281665
5A
53
679
300
275
1.67
0.0218
0
455890
598207
299103
5B
54
679
300
275
1.67
0.0218
300000
477180
603824
301912
5C
54
679
300
275
1.67
0.0218
600000
474180
603824
301912
5D
54
679
300
275
1.67
0.0357
0
454570
603824
301912
5E
56
679
300
275
1.67
0.0357
300000
593360
614904
307452
5F
54
679
300
275
1.67
0.0357
600000
647670
603824
301912
62709
C1AL
41.7
57
150
130
1.4
0.0201
50000
114650
125419
C2
61.7
57
150
130
1.4
0.0201
275000
110360
152559
76279
C3L
44.4
57
150
130
1.4
0.0201
50000
112310
129415
64708
C4
44.4
57
150
130
1.4
0.0357
275000
159630
129415
64708
C4A
55.4
57
150
130
1.4
0.0357
275000
169610
144560
72280
C4AL
44.7
57
150
130
1.4
0.0357
50000
154260
129852
64926
C5
41.3
57
150
130
1.4
0.0357
275000
75620
124816
62408
C6
49.8
57
150
130
1.4
0.0357
275000
118660
137059
68530
C6L
57.3
57
150
130
1.4
0.0357
50000
140170
147018
73509
SCOTT 1996
C7
44
57
150
130
1.4
0.0357
275000
104380
128831
64415
C8
55.6
57
150
130
1.4
0.0357
275000
89040
144821
72410
C9
44.9
57
150
130
1.4
0.0357
275000
92210
130142
65071
M1
34
444
200
200
1.5
0.0192
300000
153660
232305
116153
M2
33.5
451
200
200
1.5
0.0308
300000
282150
230591
115295
A1
35
581
200
200
1.5
0.0157
200000
157280
235697
117848
E2
35
732
200
200
1.5
0.0154
200000
152500
235697
117848
E1
26.5
732
200
200
1.5
0.0231
200000
233960
205089
102544
G1
26.5
760
200
200
1.5
0.0231
200000
239320
205089
102544
S1
44.6
918
200
200
1.5
0.0154
713600
143390
266064
133032
S2
31.3
1018
200
200
1.5
0.0153
500800
157200
222890
111445
S6
39.8
1018
200
200
1.5
0.0308
636800
225600
251340
125670
X6
32.5
616
200
200
1.5
0.0308
520000
302530
227123
113561
TSONOS 1999
TSONOS 2007
TSONOS 1992
WONG & KUANG 2008
S'6
34.9
0
200
200
1.5
0.0308
558400
303770
235360
117680
F2
28.9
0
200
200
1.5
0.0308
462400
205550
214175
107087
BS-L-300
42.6
0
300
280
1
0.0209
575100
561830
546064
273032
BS-L-450
38.6
0
300
280
1.5
0.0209
521100
377440
519795
259898
BS-L-600
45.5
0
300
280
2
0.0209
614250
340120
564345
282172
BS-L-V2
40.7
314
300
280
1.5
0.0209
549450
514180
533747
266874
VS-L-V4
35.4
628
300
280
1.5
0.0209
477900
533800
497783
248892
BS-L-H1
41.6
157
300
280
1.5
0.0209
561600
495480
539617
269808
19
ALVA 2004
BS-L-H2
52.6
314
300
280
1.5
0.0209
710100
531070
606780
303390
LVP1
40.4
1208
300
200
1.33
0.0268
360000
539500
379841
189920
LVP2
23.9
1005
300
200
1.33
0.0268
397620
514100
292152
146076
LVP3
24.6
1206
300
200
1.33
0.0268
215010
364400
296400
148200
LVP4
24.6
1005
300
200
1.33
0.0268
221580
327200
296400
148200
LVP5
25.9
1206
300
200
1.33
0.0268
233190
380400
304131
152065
2D1
17.9
0
230
230
1.4348
0.0118
115000
18250
222916
111458
2D2
18.9
0
230
230
1.4348
0.0118
115000
23890
229058
114529
2D3
18
0
230
230
1.4347
0.0119
115000
26780
223538
111769
2D4
18.7
0
230
230
1.4347
0.0119
115000
23890
227843
113922
U-J-1
29.63
0
457.2
430.9
1
0.028
97860
991950
1068090
534045
U-J-2
30.54
0
457.2
430.9
1.67
0.0221
97860
791780
1084368
542184
U-BJ-1
30.27
0
457.2
430.9
1
0.0109
97860
533570
1079564
539782
31.31
100.53
200
250
1.5
0.0201
0
257904
278658
139329
45.52
100.53
200
250
1.5
0.0201
0
368165
335993
167997
31.8
100.53
200
250
1.5
0.0201
0
372400
280830
140415
24.88
100.53
200
250
1.5
0.0201
0
330547
248402
124201
ALVA 2007
Umut Akguzel 2011
HASSAN WAEL 2011
Ridwan 2016
Sefatullah Halim 2014
BCJ-CSA BCJ-SSS4 BCJ-SSF4 BCJ-SSS8 BCJ-SSF8 BCJ-CSB
32.29
100.53
200
250
1.5
0.0201
0
358623
282985
141492
28.68
502.655
200
250
1.5
0.0201
0
336809
266697
133349
I-1
26.4
226.195
500
450
0.9
0.0155
2250000
950000
1151447
575723
I-1t
25.5
452.39
500
450
0.9
0.0219
2250000
1065000
1131650
565825
*Joint width is calculated according to ACI-352
20
Highlights •
•
Joint shear strength models available in the literature can predict the shear strength for RC beam-column connections exposed to uniaxial cyclic loading while an accurate biaxial joint shear strength model is still lacking. Gene expression programming is used in this research to develop uniaxial and biaxial joint shear strength models for exterior RC beam-column connections.
S2352-7102(19)31066-6
DOI:
https://doi.org/10.1016/j.jobe.2020.101225
Reference:
JOBE 101225
To appear in:
Journal of Building Engineering
Received Date: 27 June 2019 Revised Date:
27 January 2020
Accepted Date: 27 January 2020
Please cite this article as: Y. Murad, Joint shear strength models for exterior RC beam-column connections exposed to biaxial and uniaxial cyclic loading, Journal of Building Engineering (2020), doi: https://doi.org/10.1016/j.jobe.2020.101225. This is a PDF file of an article that has undergone enhancements after acceptance, such as the addition of a cover page and metadata, and formatting for readability, but it is not yet the definitive version of record. This version will undergo additional copyediting, typesetting and review before it is published in its final form, but we are providing this version to give early visibility of the article. Please note that, during the production process, errors may be discovered which could affect the content, and all legal disclaimers that apply to the journal pertain. © 2020 Published by Elsevier Ltd.
Joint Shear Strength Models for Exterior RC Beam-Column Connections Exposed to Biaxial and Uniaxial Cyclic Loading
First Author: Yasmin Murad, Ph.D., DIC. PhD in Structural Engineering at Imperial College London, 2016 Assistant Professor Civil Engineering Department The University of Jordan Amman, Jordan 11942 Phone Number: + 962-79- 6666802 E-mail: [email protected] ORCID: 0000-0002-7845-5633
Joint Shear Strength Models for Exterior RC Beam-Column Connections Exposed to Biaxial and Uniaxial Cyclic Loading Abstract Joint shear strength models available in the literature can predict the shear strength for reinforced concrete (RC) beam-column connections exposed to uniaxial cyclic loading, while an accurate biaxial joint shear strength model is still lacking. Gene expression programming (GEP) is used in this research to develop uniaxial and biaxial joint shear strength models for exterior RC beam-to-column connections exposed to uniaxial and biaxial cyclic loading respectively. The GEP models are developed based on an experimental database available in the literature, where the models are randomly trained and tested. Uniaxial joint shear strength is also predicted using the ACI 352 and ASCE 41 formulations for connections exposed to uniaxial cyclic loading. The performance of the GEP models is statistically evaluated using the coefficient of determination R-squared. The R-squared values are 79%, 79%, 95% and 93 % for the ACI, ASCE, uniaxial GEP and biaxial GEP models, respectively. The R-squared values of the GEP models are high, which confirms their accuracy and indicates that they are more fitting to the experimental results than the ACI and ASCE formulations. Keywords Joint shear strength; biaxial cyclic loading; uniaxial cyclic loading; exterior RC beam-column connections; ACI 352; ASCE 41; gene expression programming.
Introduction Reinforced concrete (RC) buildings are 3D structural systems, where RC beam-column connections are subjected to complex stress state that can cause building collapse under severe loading conditions. The 3D behaviour of RC beam-column connections under seismic loading is limited in the literature. Few experimental studies have been conducted to investigate the behaviour of 3D RC beam-column connections exposed to biaxial cyclic loading. Most of these studies have shown that biaxial connections exposed to biaxial cyclic loading is severely damaged and have less strength than similar joints exposed to uniaxial cyclic loading. Hassan (1) has shown that joint shear strength of biaxial connections is almost 25% less than that measured in the uniaxial connections. Akguzel (2) has shown that joint shear strength of RC beam-column connection exposed to biaxial cyclic loading is remarkably less than that measured in uniaxial connections. Engindeniz (3) has confirmed that corner connections exposed to biaxial loading have suffered from rapid degradation in strength and stiffness at relatively low drift levels. Hertanto (4) has shown that joint shear strength has reduced around 33% for RC beam-column connections exposed to biaxial cyclic loading. There are many analytical and empirical models, available in the literature, which can predict the shear strength of RC beam-to-column connections under cyclic and monotonic loading. Most of these models focus on the behaviour of uniaxial 2D RC beam-column connections in framed structures. Strut and tie models are analytical models with mechanical basis but they depend on the diagonal strut area that is not easy to define. Empirical models are usually built on the basis of experimental test results and they are simple and less computational demanding. An accurate biaxial joint model that can predict joint shear strength of 3D RC beam-column connection in 3D structural system is still lacking. An elliptical interaction curve, which overestimates the bidirectional joint shear strength, is suggested by several researchers and is adopted in the ACI 352 (5). Hassan (1) confirmed the validity of the elliptical interaction model in unreinforced concrete joints exposed to biaxial cyclic loading. Murad (6) proposed a biaxial hysteresis joint model that considers the effect of variations in the angle of loading between the corner connection framing beams. Hassan and Moehle (7) have proposed that the reduction in biaxial strength is simply the vectorial resolution effect, which is a widely accepted interpretation in columns and even in nonlinear analysis of many structural components.
1
Based on the experimental tests and analytical models available in the literature, joint shear is mainly controlled by concrete compressive strength, joint geometry, joint transverse reinforcement, beam reinforcement ratio, and column axial load. Previous studies have shown that the increase in joint shear strength is proportional to the increase in concrete compressive strength (8)(6)(9), and joint transverse reinforcement (10). Joint shear strength increases by the decrease in joint aspect ratio (8). In the BJ failure mode, hinges are formed in the beam followed by joint shear failure. Karaynnis (11) showed that the reinforcement configuration within the joint has a significant effect on the joint behaviour, where the rectangular spiral reinforcement has shown a better response than the ordinary stirrups. Kim and LaFave (12) (13) have investigated the behaviour of RC beam-to-column connections exposed to cyclic loading and they proposed a generalized Bayesian-based model for predicting the uniaxial joint shear strength. This research focuses on the behaviour of exterior connections exposed to cyclic loading since they are more vulnerable than interior connections, which are partially confined by beams framing in from all four sides. Joint shear strength models available in the literature can predict the shear strength for RC beamcolumn connections exposed to uniaxial cyclic loading, while an accurate biaxial joint shear strength model is still lacking. Therefore, the current research develops empirical models using Gene Expression Programming (GEP) that can predict joint shear strength of exterior connections exposed to uniaxial and biaxial cyclic loading. The aim of this research is to clarify the biaxial cyclic loading effect on corner RC beam-column connections. To compare between the uniaxial and biaxial joint shear strength, a GEP model that can predict the uniaxial shear strength is also developed in this research. Although there are several models available in the literature that can predict the uniaxial joint shear strength, a GEP model that can predict the uniaxial joint shear strength is lacking in the literature. Furthermore, GEP is used to develop a uniaxial joint model in order to create a consistent comparison between it and the biaxial joint model, which is also constructed using GEP. A comparison is also made between joint shear strength values obtained using the developed GEP models and the uniaxial joint shear expressions proposed by ACI 352 (5), and ASCE 41 (14).
Experimental database Gene expression programming is used in this research to develop two empirical models that can predict uniaxial and biaxial shear strengths of exterior connections exposed to cyclic loading. Large database is found for exterior connections exposed to uniaxial cyclic loading, while only few experimental programs are carried out for exterior connection exposed to biaxial cyclic loading. Uniaxial joint shear strength model is trained and tested using 200 data test points that collected from different experimental programs (1)(15)(16)(17)(18)(19)(20)(21)(22)(23)(24)(25)(26)(27)(28)(29)(30)(31)(32)(33)(34)(35)(36)(37)(38)(39) (40)(41)(42)(43)(44), while the biaxial joint shear strength is trained and tested using 8 data test points that collected from different biaxial joint tests (1) (3)(2)(4)(45)(46). Six biaxial specimens failed due to pure joint shear, while the other two specimens tested by Engindeniz (3) suffered from a mixed mode of bond failure in bottom bars, column yielding, and some cracking in the joint area. However, it is not confirmed that this mixed mode of failure triggered the full shear capacity of the joint, which may have failure prematurely, in one direction because of anchorage loss and in the other direction because of penetration of column bar yielding into the joint. Due to the scarcity in test data in the biaxial model, these specimens are considered in the biaxial joint shear strength model. The data used for training is 75% of the total database, while that used for validation is 25% of the total database for the uniaxial model, while 65% of the biaxial database is used for training the biaxial model and 35% of the database is used for validating the biaxial GEP model. Table A-1 and Table A-2 in the appendix summarise the database that used to develop the biaxial and uniaxial joint shear strength models respectively, where the training and testing data points are randomly selected from the database. The mode of failure is joint shear for the collected database shown in Table A-1 and Table A-2. The GEP models are developed using the square root concrete compressive strength, joint transverse reinforcement, column depth, joint panel width, beam reinforcement ratio, and column axial load.
Analytical background The ACI 352R-02 (5), and other current codes propose design formulations to predict the uniaxial joint shear strength for RC beam-column connections exposed to uniaxial cyclic loading but an accurate 2
expression that can predict the biaxial joint shear strength for RC beam-column connections exposed to biaxial cyclic loading is still lacking. The ACI 352R-02 (5) design equation, illustrated in Equation1, can predict the uniaxial joint shear strength of exterior RC beam-column connections exposed to uniaxial cyclic loading. The constant γ for exterior connections under cyclic loading is 12, the effective joint width, is the column depth, and is the concrete compressive strength. Equation 1 can also be applied to predict the uniaxial joint shear strength using the ASCE 41 (14) and ACI 369 (47), where the constant γ is considered 6 for joints without hoops. = 0.083 ℎ
(1)
Gene expression programming Overview of gene expression programming Gene expression programming (GEP) is an extension to gene programming and gene algorithm. GEP was developed by Ferreira and it has an advantage of solving complex problems with small database (48) without the need of any predefined equations (49). The developed gene expression is expressed into an expression tree that encoded in the chromosomes (48) (50) (51) (52) (53). The GEP expression can also be expressed using karva language and several programming languages (c++, VBA, Matlab, etc). The GEP expression is developed by adding or deleting various parameters to best fit the experimental results (49)(54). Empirical expressions can be developed using GEP for the cases, where the analytical expressions are not available. The GEP expression can contain one or more genes, where each gene has a head and tail. The gene’s tail has terminal symbols (constants and variables) such as (1,a, b, c), while the gene’s head has the functions and terminal symbols including constants, variables, functions and mathematical operators such as (1,a, b, √, cos ,*,−, /) (55). Complex functions (56) are usually resulted by increasing the number of genes (56). Furthermore, increasing the number of chromosomes has resulted in increasing the running time (56). Simplified procedures are usually adopted to create a new GEP model by choosing the fitness function and then selecting the terminals and functions that are required to build the chromosomes. The number of genes, the head length, and the number of chromosomes are then determined. The genetic operators and the linking functions are finally selected (48). Gene expression programming has become an efficient tool in predicting the behaviour of structural elements in civil engineering applications (57)(58)(59)(60)(56)(51)(61)(62)(63) based on the experimental database. Researchers have used GEP to predict the tensile strength of concrete (52), the compressive strength of high performance concrete (HPC) mixes (57), etc. Model Development Gene expression programming is applied in this research using GeneXproTools (64) software in order to develop biaxial and uniaxial joint shear strength models for exterior connections exposed to biaxial and uniaxial cyclic loading respectively. Several GEP models are developed by changing the number of genes, chromosomes, head size, and linking function. The selected GEP model is the one that best fit the experimental results. The selected parameters for the GEP models that best fit the experimental results are shown in Table 1. The genome of gene expression programming includes a linear, symbolic string or chromosome of fixed length. Each chromosome consists of one or more genes with a fixed length. The genes form the expression trees of different sizes and shapes. The function set includes all the functions and mathematical operators such as (+ ,* ,− , / ,x2 ,x3, √, cos, sin etc) that can be used in the development of the GEP equation. The developed GEP equation consists of one or multiple of genes, where increasing the number of genes generates complex GEP equations. The linking function such as (+ ,* ,− , / ) is the mathematical operator that links the genes together. The constants per gene determine the number of constants that can be used in the mathematical equation for each gene. The mutation rate can create diversity and change genomes by changing an element by another. For example, functions can be replaced by another function or terminal. Recombination rate incorporates the creation of new chromosomes by combining different parts from the parent chromosomes.
3
Transposition incorporates the introduction of an insertion sequence somewhere in a chromosome, while the inversion rate consists of a small sequence within a chromosome. Two genes are used to develop each GEP model in order to obtain simplified uniaxial and biaxial joint shear strength expressions. The genes are linked together using a multiplication linking function. Simplified functional set is used including addition, subtraction, multiplication, division, square root, and square functions. Two constants are used per gene for the uniaxial and biaxial GEP models. The constants of the uniaxial model are c0 = -7.4, c1= -12.75 for the first gene, while the second gene has only one constant that equals to c0 = -126.7. Biaxial joint model has 2 constants per gene. The constants of the first gene are (c0 = -2.49, c1= 6.18) and the constants of the second gene are (c0 = 4.98, c1= 45.81). The parameters that control the uniaxial shear strength in the GEP model are concrete compressive strength, joint transverse reinforcement, column depth, joint panel width, beam longitudinal reinforcement ratio, and column axial load. Biaxial GEP model is simple and it depends on the concrete compressive strength, joint transverse reinforcement, column depth, and joint panel width. The collected database is used to develop the GEP models, where the data points of the biaxial model are limited due to the scarcity of the biaxial database. The development of the GEP models normally requires 65% to 75% of the database to be used as a training database and the rest is to be used as a validating database. Thus, five points, which are randomly selected, are used to develop the biaxial GEP model, while the other three points, which are also randomly selected are used to verify the model. The validation and training points are randomly varied during the development process of the GEP model. The validation points shown in Figure 3 (c) are selected from Akguzel (2), Hertanto (4), and Chen (46) test results. Both GEP models are expressed mathematically in Equation 4 and 5 and using the expression tree format that shown in Figure 1 and Figure 2 for the uniaxial and biaxial joint shear strength models respectively. In the expression tree do, d1, d2, d3, d4 and d5 are square root concrete compressive strength ( ), joint transverse reinforcement ( ), column depth (ℎ ), joint panel width ( ), beam longitudinal reinforcement ratio ( ) , and column axial load ( ), respectively, while c0 and c1 are constants. It should be noted that the proposed biaxial joint model that best fit the experimental results is not influenced by column axial load and beam longitudinal reinforcement ratio but all the selected parameters are used to develop the uniaxial joint shear strength model. Thus, the column axial load and beam longitudinal reinforcement ratio are excluded from the biaxial joint shear strength expression and tree. Both GEP models can predict the biaxial and uniaxial joint shear strength of exterior RC connections exposed to cyclic loading with an acceptable accuracy. Table 1 Gep setting parameter GEP Function set +, -, *, /,√ , Genes 2 Chromosomes 30 Head Size 8 Linking Function Multiplication Constant per gene 2 Mutation rate 0.05 Inversion rate 0.1 Transposition rate 0.1 One point recombination rate 0.3 Two point recombination rate 0.3 Gene recombination rate 0.1 Gene transportation rate 0.1 The performance of the GEP models is then statistically evaluated using the coefficient of determination (R2) that defined in equation 2. The predicted joint shear strength values are compared to the experimental joint shear strength values that collected from the literature and it is found that the distribution of points is close to the ideal fit as shown in Figure 3 and Figure 4. This confirms that the proposed GEP models have an acceptable capacity in predicting the uniaxial and biaxial joint shear strengths. The mean absolute error (MAE) is also calculated in order to further validate the model. The MAE values for the uniaxial and 4
biaxial joint shear strengths are 41.68% and 9.67% respectively for all data. The MAE values, which indicate to the error, are low. -
' ' "∑) %*+($% &$)((% &( ), ($% &$' )- ∑) ((% &(' )-
! = ∑)
%*+
. /=
0
1
(2)
%*+
∑1 470|34 − 64 |
(3)
Biaxial and uniaxial joint shear strength models have high R-squared values for validation, training, and all data, which confirms that both GEP models have an excellent correlation between the predicted and experimental values and hence can predict the experimental joint shear strength with acceptable accuracy. A comparison is made between the experimental and predicted joint shear strengths for exterior connections exposed to biaxial and uniaxial cyclic loading in Figure 3 and Figure 4 respectively. Each figure illustrates the experimental vs predicted joint shear strength for the training, validation, and all data. The R-squared values for the biaxial GEP model are 98 %, 90 %, and 93% for the validation, training, and all data, respectively as shown in Figure 3. The R-squared values for the uniaxial GEP model are 94%, 98%, and 95% for the validation, training, and all data, respectively as shown in Figure 4. The ACI formulation and the GEP models have the same trends, where the shear strength, in all models, increases by the increase of concrete compressive strength, column depth, and joint panel width as shown in equation 1, 4, and 5. This confirms the consistency of the proposed GEP models with the analytical code formulation. The proposed biaxial joint model can predict the shear strength of RC beam to column connections exposed to biaxial cyclic loading with acceptable accuracy. It should be noted that the GEP model is built based on limited database thus it needs further verification with many more tests to be considered accurate. Existing models that can predict the biaxial joint shear strength are limited in the literature. Therefore, the proposed biaxial GEP model is a novel model that can easily predict the biaxial shear strength for RC beam-to-column connections exposed to biaxial cyclic loading.
5
Figure 1 Expression tree of the developed uniaxial GEP model
Figure 2 Expression tree of the developed biaxial GEP model The following expression predicts the uniaxial joint shear strength: = 89:"
+ 7.42, −
0@ ? A × "−7.42
× (
+ 12.75),E + F × G
× H(−126.72
−
0@ L
(4)
),W
(5)
) − (ℎ + )JK
The following expression predicts the biaxial joint shear strength: = GH−15.37"6.18 −
,J × H"−2.49 +
, + (ℎ −
)JK × N O
(a)
0
PQRS &?.TU
−(
+
)V − "91.6 − (
(b)
6
−
(c) Figure 3 Comparison between the predicted and experimental values of validating data using biaxial GEP model
(a)
(b)
(c) Figure 4 Comparison between the predicted and experimental values of training data using uniaxial GEP model
Comparison between the GEP models, the ACI 352, and ASCE 41, expressions As mentioned earlier, the ACI 352R-02 (5) design formulation can predict the uniaxial joint shear strength for RC beam-column connections exposed to uniaxial cyclic loading but an expression that can predict the biaxial joint shear strength for RC beam-column connections exposed to biaxial cyclic loading is still lacking. The ASCE 41 (14) is also used to calculate the shear strength of existing joints without hoops, which is the typical practice in the industry. Thus, the comparison is made between the biaxial GEP and uniaxial GEP models, the ACI 352, and the ASCE 41, expressions for the uniaxial joint shear strength as shown in Figure 5. The R-square values for both GEP models are higher than that obtained using the ACI expression, where the R-squared values are 79%, 79%, 95%, and 93 % for the ACI, ASCE, uniaxial GEP 7
Predicted Joint Shear Strength (kN)
and biaxial GEP models, respectively. Equation 1 is used to predict the uniaxial joint shear strength using the ACI 352 and ASCE 41 codes, where the constant γ is the only difference between the two codes as explained earlier. Although the joint shear strength values predicted using the ASCE 41 are lower than that values predicted using the ACI 352, the R-squared values for both codes is the same and equals to 79% because both codes have the same formulation with different values for the constant γ. Joint shear strength values predicted using the GEP models are more fitting to the experimental results than that obtained using the ACI 352 and ASCE 41 expressions. The trend of the GEP models in agreement with the trend of the ACI 352, ASCE 41, expressions and the experimental results. This confirms the consistency of the GEP models.
2500 2000
R² = 0.7899 uni-GEP
1500 R² = 0.9487
uni-ACI
1000 ASCE-41 R² = 0.7899
500
Bi-GEP R² = 0.9288
0 0
500
1000
1500
2000
2500
Experimental Joint Shear Strength (kN)
Figure 5 Comparison between the ACI, ASCE, and GEP models
Conclusion Joint shear strength models available in the literature can predict the shear strength for RC beam-column connections exposed to uniaxial cyclic loading, while an accurate biaxial joint shear strength model is still lacking. Biaxial and uniaxial joint shear strength models are developed in this research using gene expression programming for exterior RC beam-to-column connections exposed to uniaxial and biaxial cyclic loading respectively. Uniaxial and biaxial GEP models are randomly trained and tested using 200 and 8 data test points respectively. Uniaxial GEP model is developed using six main parameters including square root concrete compressive strength, joint transverse reinforcement, column depth, joint panel width, beam reinforcement ratio, and column axial load. Biaxial GEP model is developed using four main parameters including square root concrete compressive strength, joint transverse reinforcement, column depth, and joint panel width. Uniaxial joint shear strength is also predicted using the ACI 352 and ASCE 41 formulations. The coefficient of determination R-squared is used to evaluate the performance of the models. The values of R-squared are 79%, 79%, 95%, and 93 % for the ACI, ASCE, uniaxial GEP and biaxial GEP models, respectively. The high R-square value of the GEP models confirms their accuracy and indicates that they are more fitting to the experimental results than the ACI and ASCE formulations.
References 1.
W.M. Hassan Analytical and Experimental Assessment of Seismic Vulnerability of Beam-Column Joints without Transverse Reinforcement in Concrete Buildings. (Ph.D. thesis) University of California, Berkeley, (2011). URL: https://escholarship.org/uc/item/1k49h3mx.
2.
U. Akguzel Seismic Performance of FRP Retrofitted Exterior RC Beam-Column Joints under Varying Axial
8
and Bidirectional Loading. (Ph.D. thesis) University of Canterbury. (2011). URL: https://ir.canterbury.ac.nz/handle/10092/5993. 3.
M. Engindeniz Repair and strengthening of Pre-1970 reinforced concrete corner beam-column joints using CFRP composites. (Ph.D. thesis) Georgia Institute of Technology. (2008).
4.
E. Hertanto Seismic Assessment of Pre-1970s Reinforced Concrete Structure. (MS.c. thesis). University of Canterbury. (2005). URL: https://ir.canterbury.ac.nz/handle/10092/1120.
5.
ACI-ASCE Committee 352. Recommendations for Design of Beam-Column Connections in Monolithic Reinforced Concrete Structures (ACI-352R-02) Farmington Hills, MI, 2002.
6.
Y.Z. Murad Analytical and numerical assessment of seismically vulnerable corner connections under bidirectional loading in RC framed structures. (Ph.D. thesis). Imperial College London, (2016). URL: https://spiral.imperial.ac.uk/handle/10044/1/44493.
7.
W.M. Hassan, J.P. Moehle Shear Strength of Exterior and Corner Beam-Column Joints without Transverse Reinforcement. ACI Structural Journal, 115 (2018), pp. 1719–1727.
8.
R.L. Vollum, J.B. Newman Strut and tie models for analysisadesign of external beam-column joints. Magazine of Concrete Research, 51 (1999), pp. 415–425. DOI:10.1680/macr.1999.51.6.415. URL:
9.
Y. Murad, Y. Abu-Haniyi, A. Alkaraki, Z. Hamadeh An experimental study on cyclic behaviour of RC connections using waste materials as cement partial replacement. Canadian Journal of Civil Engineering. 46 (2018), pp. 522–533. http://www.nrcresearchpress.com/doi/10.1139/cjce-2018-0555.
10.
T. Paulay, M.J.N Priestley Seismic Design of Reinforced Concrete and Masonry Buildings. John Wiley & Sons, Inc. NewYork, 1992.
11.
C.G. Karayannis Mechanics of external RC beam-column joints with rectangular spiral shear reinforcement: experimental verification. Meccanica. 50 (2015), pp. 311–322. http://link.springer.com/10.1007/s11012-014-9953-6.
12.
J. Kim, J.M. LaFave Probabilistic Joint Shear Strength Models for Design of RC Beam-Column Connections. ACI Structural Journal. 105 (2008), pp. 770–780. DOI:10.14359/20105. URL:http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&I D=20105.
13.
J. Kim, J.M. LaFave, J. Song Joint shear behaviour of reinforced concrete beam–column connections. Magazine of Concrete Research. (61) 2009,
9
pp.
119–132.
http://www.icevirtuallibrary.com/doi/10.1680/macr.2008.00068 14.
ASCE-41. Seismic Evaluation and Retrofit of Existing Buildings (41-17), American Society of Civil Engineers2017.
15.
G.M.S. Alva, A.L.H de Cresce El Debs, M.K. El Debs An experimental study on cyclic behaviour of reinforced concrete connections. Canadian Journal of Civil Engineering. 34 (2007), http://www.nrcresearchpress.com/doi/10.1139/l06-164.
pp.
565–575.
16.
C.E. Chalioris, M.J. Favvata, C.G. Karayannis Reinforced concrete beam–column joints with crossed inclined bars under cyclic deformations. Earthquake Engineering & Structural Dynamics. (37) 2008, pp. 881–897. http://doi.wiley.com/10.1002/eqe.793.
17.
S.C. Chun, D.Y. Kim Evaluation of Mechanical Anchorage of Reinforcement by Exterior Beam-Column Joint Experiments. 13th World Conference on Earthquake EngineeringVancouver, B.C., Canada, (2004). pp. 326.
18.
G.M.S Alva Estudo teórico-experimental do comportamento de nós de pórtico de concreto armado submetidos a ações cíclicas. Biblioteca Digital de Teses e Dissertações da Universidade de São Paulo. São Carlos, 2004.
19.
G.M. Calvi, G. Magenes, S. Pampanin Studio sperimentale sulla risposta sismica di edifici a telaio in cemento armato progettati per soli carichi da gravita’. X Congresso Nazionale ‘L’ingegneria sismica in Italia. 2001. https://ir.canterbury.ac.nz/handle/10092/269.
20.
S.C. Chun, S.H. Lee, T.H. Kang, B. Oh, J.W. Wallace Mechanical Anchorage in Exterior Beam-Column Joints Subjected to Cyclic Loading. ACI Structural Journal. (104) 2007, pp. 102–113. DOI:10.14359/18438. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=184 38.
21.
N. Chutarat, R.S. Aboutaha Cyclic Response of Exterior Reinforced Concrete Beam-Column Joints Reinforced with Headed Bars—Experimental Investigation. ACI Structural Journal. (100) 2003, pp. 259–264. DOI:10.14359/12490. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=124 90.
22.
C.P. Pantelides, C. Clyde, L.D. Reaveley Performance-Based Evaluation of Reinforced Concrete Building Exterior Joints for Seismic Excitation. Earthquake Spectra. (18) 2002, pp. 449–480. http://earthquakespectra.org/doi/10.1193/1.1510447.
23.
A.J. Durrani, H.E. Zerbe Seismic Resistance of R/C Exterior Connections with Floor Slab. Journal of Structural Engineering. (113) 1987, pp. 1850–1864. DOI:10.1061/(ASCE)0733-9445(1987)113:8(1850). URL: http://ascelibrary.org/doi/10.1061/%28ASCE%290733-9445%281987%29113%3A8%281850%29
24.
M.R. Ehsani, F. Alameddine
10
Design Recommendations for Type 2 High-Strength Reinforced Concrete Connections. ACI Structural Journal. (88) 1991, pp. 277–291. DOI:10.14359/3108. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=310 8. 25.
M.R. Ehsani, A.E. Moussa, C.R. Valenilla Comparison of Inelastic Behavior of Reinforced Ordinary- and High-Strength concrete frames. ACI Structural Journal. (84) 1987, pp 161–169. DOI:10.14359/2841. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=284 1.
26.
M.R. Ehsani, J.K. Wight Effect of Transverse Beams and Slab on Behavior of Reinforced Concrete Beam-to-Column Connections. ACI Journal Proceedings. (82) 1985, pp. 188–195. DOI:10.14359/10327. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=103 27.
27.
M.R. Ehsani, J.K. Wight Exterior Reinforced Concrete Beam-to-Column Connections Subjected to Earthquake-Type Loading. ACI Journal Proceedings. (82), 1985, pp. 492–499. DOI:10.14359/10361. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=103 61.
28.
M. Gencoglu, E. Ilhan. An Experimental Study on the Effect of Steel Fiber Reinforced Concrete on the Behavior of the Exterior Beam-Column Joints Subjected to Reversal Cyclic Loading. Turkish Journal of Engineering and Environmental Sciences. (26) 2002, pp. 493 – 502. http://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.914.3967&rep=rep1&type=pdf
29.
S.J. Hamil Reinforced concrete beam-column connection behaviour. (Ph.D. thesis) Durham University., (2000). http://etheses.dur.ac.uk/1523/
30.
S. Hakuto, R. Park, H. Tanaka Seismic Load Tests on Interior and Exterior Beam-Column Joints with Substandard Reinforcing Details. ACI Structural Journal. (97) 2000, pp. 11–25. DOI:10.14359/829. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=829
31.
S.J. Hwang, H.J. Lee, K.C. Wang Seismic Design and Detailing of Exterior Reinforced Concrete Beam-Column Joints. 13 th World Conference on Earthquake EngineeringVancouver, B.C., Canada, (2004). pp. 397.
32.
I.B. Salim The influence of concrete strengths on the behaviour of external beam-column joints. Malaysia. (MS.c. thesis) Universiti Teknologi, 2007.
33.
C.G. Karayannis, C.E. Chalioris, G.M. Sirkelis Local retrofit of exterior RC beam–column joints using thin RC jackets—An experimental study. Earthquake Engineering & Structural Dynamics. (37) 2008, pp. 727–746. http://doi.wiley.com/10.1002/eqe.783.
11
34.
C. Karayannis, G. Sirkelis Response of columns and joints with spiral shear reinforcement. Computational Methods and Experimental Measurements XII. (41) 2005, pp. 455–463. DOI:1743-355X. URL: www.witpress.com.
35.
C. Liu Seismic behaviour of beam-column joint subassemblies reinforced with steel fibres. (MS.c. thesis) University of Canterbury. 2006. URL: https://ir.canterbury.ac.nz/handle/10092/1118.
36.
S. Pampanin, G.M. Calvi, M. Moratti Seismic Behavior of R.C. Beam-Column Joints Designed for Gravity Only. 12th European Conference on Earthquake EngineeringLondon, UK, (2002). pp. 726.
37.
C.P. Pantelides Assessment of reinforced concrete building exterior joints with substandard details. Pacific Earthquake Engineering Research Center,. Berkeley, 2002.
38.
D.E. Parker, P.J.M. Bullman Shear Strength Within Reinforced Concrete Beam-Column Joints. Structural Engineer. (75) 1997. URL: https://trid.trb.org/view/575180.
39.
R.H. Scott Intrinsic Mechanisms in Reinforced Concrete Beam-Column Connection Behavior. ACI Structural Journal. (93) 1996, pp. 336–346. DOI:10.14359/9693. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=969 3.
40.
A.G. Tsonos, I.A. Tegos, G.G Penelis Seismic Resistance of Type 2 Exterior Beam-Column Joints Reinforced With Inclined Bars. ACI Structural Journal. (89) 1993, pp. 3–12. DOI:10.14359/1278. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=127 8.
41.
A.G. Tsonos Lateral Load Response of Strengthened Reinforced Concrete Beam-to-Column Joints. ACI Structural Journal. (96) 1999, pp. 46–56. DOI:10.14359/595. URL: http://www.concrete.org/Publications/ACIMaterialsJournal/ACIJournalSearch.aspx?m=details&ID=595
42.
A.G. Tsonos Cyclic load behaviour of reinforced concrete beam-column subassemblages of modern structures. Structural Journal. (104) 2007, pp. 468–478. URL: www.witpress.com.
43.
Ridwan. Reinforced concrete beam-column joints strengthened in shear with embedded bars. (Ph.D. thesis) University of Birmingham. (2016). URL: https://etheses.bham.ac.uk/id/eprint/7138/
44.
J.S. Kuang, H.F. Wong Effects of beam bar anchorage on beam–column joint behaviour. Proceedings of the Institution of Civil Engineers - Structures and Buildings. (159) 2006, pp. 115–124. DOI:10.1680/stbu.2006.159.2.115. URL: http://www.icevirtuallibrary.com/doi/10.1680/stbu.2006.159.2.115.
12
45.
M. Engindeniz, L.F. Kahn, A.H. Zureick Pre-1970 RC corner beam-column-slab joints: Seismic adequacy and upgrading with CFRP composites. The 14th World Conference on Earthquake EngineeringBeijing, China, (2008).
46.
T.H. Chen Retrofit strategy of non-seismically designed frame systems based on a metallic haunch system. (MS.c. thesis) University of Canterbury. 2006. https://ir.canterbury.ac.nz/handle/10092/1222.
47.
ACI-369. Guide for Seismic Rehabilitation of Existing Concrete Frame Buildings and Commentary2011.
48.
C. Ferreira Gene Expression Programming in Problem Solving. Soft Computing and Industry. Springer London. London, 2002. Pp. 635–653.
49.
A. Cevik, M. Sonebi Modelling the performance of self-compacting SIFCON of cement slurries using genetic programming technique. Computers and Concrete. (5) 2008, pp. 475–490. DOI:10.12989/cac.2008.5.5.475. URL: http://koreascience.or.kr/journal/view.jsp?kj=KJKHDQ&py=2008&vnc=v5n5&sp=475
50.
M. Sarıdemir Genetic programming approach for prediction of compressive strength of concretes containing rice husk ash. Construction and Building Materials. (24) 2010, pp. 1911–1919. DOI:10.1016/j.conbuildmat.2010.04.011. URL: https://linkinghub.elsevier.com/retrieve/pii/S0950061810001315.
51.
A.H. Gandomi, A.H. Alavi, S. Kazemi, M. Gandomi Formulation of shear strength of slender RC beams using gene expression programming, part I: Without shear reinforcement. Automation in Construction. (42) 2014, pp. 112–121. DOI:10.1016/J.AUTCON.2014.02.007. URL: https://www.sciencedirect.com/science/article/pii/S0926580514000326.
52.
F. Özcan Gene expression programming based formulations for splitting tensile strength of concrete. Construction and Building Materials. (26) 2012, pp. 404–410. DOI:10.1016/J.CONBUILDMAT.2011.06.039. URL: https://www.sciencedirect.com/science/article/pii/S0950061811003023.
53.
S. Jafari, S.S. Mahini Lightweight concrete design using gene expression programing. Construction and Building Materials. (139) DOI:10.1016/J.CONBUILDMAT.2017.01.120. https://www.sciencedirect.com/science/article/pii/S0950061817301575.
2017,
pp.
93–100. URL:
54.
M. Sonebi, A. Cevik Genetic programming based formulation for fresh and hardened properties of self-compacting concrete containing pulverised fuel ash. Construction and Building Materials. (23) 2009, pp. 2614–2622. DOI:10.1016/J.CONBUILDMAT.2009.02.012. URL: https://www.sciencedirect.com/science/article/abs/pii/S0950061809000403
55.
S.B. Beheshti Aval, H. Ketabdari, S. Asil Gharebaghi Estimating Shear Strength of Short Rectangular Reinforced Concrete Columns Using Nonlinear
13
Regression and Gene Expression Programming. Structures. (12) 2017, pp. 13–23. DOI:10.1016/J.ISTRUC.2017.07.002. https://www.sciencedirect.com/science/article/pii/S2352012417300425
URL:
56.
A. Gholampour, A.H. Gandomi, T. Ozbakkaloglu New formulations for mechanical properties of recycled aggregate concrete using gene expression programming. Construction and Building Materials. (130) 2017, pp. 122–145. DOI:10.1016/J.CONBUILDMAT.2016.10.114. URL: https://www.sciencedirect.com/science/article/pii/S0950061816317408.
57.
S.M. Mousavi, P. Aminian, A.H. Gandomi, A.H. Alavi, H. Bolandi A new predictive model for compressive strength of HPC using gene expression programming. Advances in Engineering Software. (45) 2012, pp. 105–114. DOI:10.1016/J.ADVENGSOFT.2011.09.014. URL: https://www.sciencedirect.com/science/article/pii/S0965997811002535.
58.
S. Soleimani, S. Rajaei, P. Jiao, A. Sabz, S. Soheilinia New prediction models for unconfined compressive strength of geopolymer stabilized soil using multi-gen genetic programming. Measurement. (113) 2018, pp. 99–107. DOI:10.1016/J.MEASUREMENT.2017.08.043. URL: https://www.sciencedirect.com/science/article/pii/S0263224117305511
59.
J.C. Lim, M. Karakus, T. Ozbakkaloglu Evaluation of ultimate conditions of FRP-confined concrete columns using genetic programming. Computers & Structures. (162) 2016, pp. 28–37. DOI:10.1016/J.COMPSTRUC.2015.09.005. URL: https://www.sciencedirect.com/science/article/pii/S0045794915002643.
60.
I. González-Taboada, B. González-Fonteboa, F. Martínez-Abella, J.L. Pérez-Ordóñez Prediction of the mechanical properties of structural recycled concrete using multivariable regression and genetic programming. Construction and Building Materials. (106) 2016, pp. 480–499. DOI:10.1016/J.CONBUILDMAT.2015.12.136. URL: https://www.sciencedirect.com/science/article/pii/S0950061815308072.
61.
A. Nazari, F. Pacheco Torgal Modeling the compressive strength of geopolymeric binders by gene expression programmingGEP. Expert Systems with Applications. (40) 2013, pp. 5427–5438. DOI:10.1016/J.ESWA.2013.04.014. URL: https://www.sciencedirect.com/science/article/pii/S0957417413002510.
62.
Y. Murad, A. Ashteyat, R. Hunaifat Predictive model to the bond strength of FRP-to-concrete under direct pullout using gene expression programming. JOURNAL OF CIVIL ENGINEERING AND MANAGEMENT. (25) 2019, pp. 773–784. DOI:10.3846/jcem.2019.10798. URL: https://journals.vgtu.lt/index.php/JCEM/article/view/10798.
63.
Y. Murad, R. Imam, H. Abu Hajar, D. Habeh, A. Hammad, Z. Shawash Predictive compressive strength models for green concrete. International Journal of Structural Integrity. (2019). ahead-of-print(ahead-of-print). DOI:10.1108/IJSI-05-2019-0044. URL: https://www.emeraldinsight.com/doi/10.1108/IJSI-05-20190044.
64.
Gepsoft. Gepsoft GeneXproTools - Data Modeling & Analysis Software. . 2014 URL: https://www.gepsoft.com/
14
Appendix Table A-1 Biaxial joint shear database Authors and year
Specimen name
cylinder Concrete compressive strength (MPa)
Joint shear reinforcement area (mm2)
column depth (mm)
Joint width (mm)
joint aspect ratio
beam reinforcement ratio
Column axial load (N)
Number of cycles used in each displacement amplitude
Joint shear strength (N)
TDP-1 TDP-2 TDD-2
22.9 25 24.7
56.5487 56.5487 0
230 230 230
215 215 215
1.434 1.434 1.434
0.0196 0.0196 0.0220
0 0 0
4 4 4
97000 117000 141000
3D1
17.4
0
230
230
1.434
0.0191
115000
2
18820
specimen 1 specimen 2
34.12
0
356
330.5
1.43
0.0128
0
3
51000
34.54
0
356
330.5
1.43
0.0128
0
3
53000
B-J-1
30.43
0
457.2
431.8
1
0.0221
2862
2
765056
DD1
28.9
0
230
215
1
0.0224
200000
4
82200
Eric Hertanto 2005
Umut akguzel 2011 Engindeniz 2008
Hassan 2011 Chen 2006
*Joint width is calculated according to ACI-352
Table A-2 Uniaxial joint shear database
Authors and year
Specimen name
cylinder Concrete compressive strength (MPa)
Binbhu & Jaya 2008
A1 T1
Joint shear reinforcement Area
column depth
Joint width joint aspect ratio
beam reinforcement ratio
Column axial load (N)
Joint shear strength (N)
Joint shear strength predicted using ACI-352 (N)
Joint shear strength predicted using ASCE-41 (N)
(mm2)
(mm)
(mm)
36.7
396
150
100
1
0.1072
15920
74710
90507
45254
23.9
0
200
200
1.65
0.0163
120000
62290
194768
97384
JA-0
34
157
300
200
0.67
0.0151
102000
241230
348458
174229
Ja-S5
34
660
300
200
1
0.0151
102000
242760
348458
174229 174229
Ja-x12
34
383
300
200
1
0.0151
102000
241230
348458
JA-X14
34
465
300
200
1
0.0151
102000
24046
348458
174229
JB-0
31.6
0
300
200
1
0.0157
94800
230970
335934
167967
Calvi 2001
Chalioris 2008
JB-S1
31.6
101
300
200
1
0.0157
94800
252530
335934
167967
JB-X10
31.6
157
300
200
1
0.0157
94800
247160
335934
167967
JB-X12
31.6
226
300
200
1
0.0157
94800
245630
335934
167967
JCA-0
20.6
0
200
100
1
0.0157
41200
241230
90411
45206
JCA-X10
20.6
157
200
100
1
0.0157
41200
70470
90411
45206
JCA-S1
20.6
101
200
100
1
0.0157
41200
69370
90411
45206
JCA-S1X10
20.6
258
200
100
1
0.0157
41200
70470
90411
45206
JCA-s2
200
100
1
0.0157
41200
69010
90411
45206
20.6
201
jca-s2x10
20.6
358
200
100
1
0.0157
41200
70110
90411
45206
jcb-0
20.6
0
200
100
1
0.0236
46000
105770
90411
45206
jcb-x10
20.6
157
200
100
1
0.0236
46000
103860
90411
45206
jcb-s1
20.6
101
200
100
1
0.0236
46000
104980
90411
45206 45206
jcb-s1x10
20.6
258
200
100
1
0.0236
46000
105340
90411
jcb-s2
20.6
201
200
100
1
0.0236
46000
106080
90411
45206
jcb-s2x10
20.6
358
200
100
1
0.0236
46000
106440
90411
45206
15
Chun & kim 2004
Chun 2007
Chutarat & Aboutaha 2003
jc-2
60.1
2752
500
425
1
0.0213
490000
1343.89
1640799
820400
jm-2
60.1
2752
500
425
1
0.0213
490000
1342.22
1640799
820400
jc-2
60.1
4054
500
425
1
0.0213
0
1199900
1640799
820400
jm-2
60.1
4054
500
425
1
0.0213
0
1197600
1640799
820400
32.8
3103
520
550
0.97
0.0169
0
1125630
1631407
815703
32.8
3103
520
550
0.97
0.0169
0
1113890
1631407
815703
32.8
3103
520
550
0.97
0.0169
0
1080400
1631407
815703
27.6
1548
406
381
1.126
0.0246
0
932470
809403
404702
27.6
1548
406
381
1.126
0.0433
0
1188600
809403
404702
#2
55.7
774
457
305
0.888
0.0371
689000
1154340
1036103
518052
#4
49.4
774
457
305
0.888
0.0371
1380000
1302610
975751
487875
#5
44.6
774
457
305
0.888
0.0371
1357000
1184770
927135
463567
#6
48.3
774
457
305
0.888
0.0371
587000
1104490
964826
482413
J1
47.4
2280
305
279.5
1.249
0.0246
175000
457790
584561
292281
J2
47
2280
305
279.5
1.249
0.0246
175000
633500
582090
291045
J5
46.6
2280
305
279.5
1.249
0.0328
175000
985980
579607
289804
J7
49
2280
305
279.5
1.249
0.0382
175000
760570
594346
297173
jc-no.111 jm no. 11-1a jm -no 11-1b
I-GROUP 1 IIGROUP 1
CLYDE 2000
DURRANI & ZERBE 1987
EHSANI & ALAMEDDINE 1991
EHSANI 1987
EHSANI & WIGHT 1985 A
LL8
55.1
2294
356
337
1.427
0.0319
293700
942960
886982
443491
LH8
55.1
3054
356
337
1.427
0.0319
293700
946930
886982
443491
HL8
55.1
2533
356
337
1.427
0.0408
507300
1231020
886982
443491
HH8
55.1
3293
356
337
1.427
0.0408
507300
1230020
886982
443491
LL11
75.8
2294
356
337
1.427
0.0319
285000
929150
1040337
520168
LH11
75.8
3054
356
337
1.427
0.0319
276000
925090
1040337
520168
HL11
75.8
2533
356
337
1.427
0.0408
587000
1177460
1040337
520168
HH14
96.5
3293
356
337
1.427
0.0408
605000
1217610
1173824
586912
LL14
96.5
2294
356
337
1.427
0.0319
236000
936500
1173824
586912
LH14
96.5
3054
356
337
1.427
0.0319
222000
933530
1173824
586912
HH11
96.5
3293
356
337
1.427
0.0408
605200
1217610
1173824
586912
1
64.6
1333
340
320
1.411
0.0202
133000
676160
870973
435486
2
67.2
1333
340
320
1.411
0.0247
338000
592680
888327
444164
3
64.6
1333
300
279.5
1.463
0.0279
383000
716270
671241
335621
4
67.2
1534
300
279.5
1.463
0.0346
325000
920970
684616
342308
5
44.6
1333
300
279.5
1.463
0.0449
222000
843450
557737
278869
1S
51.4
1080
300
279.5
1.6
0.019
222000
384560
598748
299374
2S
47.6
1333
300
279.5
1.6
0.019
222000
368860
576190
288095
3S
34.9
1080
300
279.5
1.463
0.019
222000
402160
493373
246686
6S
42.3
1080
340
320
1.412
0.0201
303310
490650
704788
352394
16
EHSANI & WIGHT 1985 B
GENCOGLU & EREN 2002
HAMIL 2000
1B
40.5
1080
300
279.5
1.6
0.0449
177870
591210
531484
265742
2B
42.1
1080
300
279.5
1.463
0.0449
221870
679470
541880
270940
3B
49.3
1333
300
279.5
1.6
0.0449
221870
1053730
586389
293195
4B
53.8
1333
300
279.5
1.463
0.0449
221870
1062200
612567
306283
5B
29.3
1520
340
320
1.412
0.0402
356580
444270
586573
293286
6B
48
1080
340
320
1.412
0.03
303820
437010
750773
375387
#2
39.5
0
400
250
1.5
0.0092
150000
114040
625976
312988
C6LN0
53.1
0
150
130
1.4
0.0357
50000
113900
141528
70764
C6LN1
53.1
57
150
130
1.4
0.0357
50000
118650
141528
70764
C6LN3
50.6
170
150
130
1.4
0.0357
50000
137860
138156
69078
C6LN5
38.2
283
150
130
1.4
0.0357
50000
164680
120040
60020
C6LH0
104.6
0
150
130
1.4
0.0357
100000
163860
198637
99318
C6LH1
105.4
57
150
130
1.4
0.0357
100000
169070
199395
99697
C6LH3
100.4
170
150
130
1.4
0.0357
100000
187650
194608
97304
C4ALN0
44
0
150
130
1.4
0.0357
50000
129600
128831
64415
C4ALN1
47.3
57
150
130
1.4
0.0357
50000
162260
133575
66787
C4ALN3
43.2
170
150
130
1.4
0.0357
50000
168300
127654
63827
C4ALN5
52.3
283
150
130
1.4
0.0357
50000
185170
140457
70229
C4ALH0
107.9
283
150
130
1.4
0.0357
100000
200980
201746
100873
O6
41
57
460
380
1.087
0.0107
0
434300
1114789
557395
O7
37.3
57
460
380
1.087
0.0107
0
440240
1063298
531649
RK3
57.2
1030
200
150
1.5
0.0419
500000
402000
225984
112992
RK4
51.7
1030
200
150
1.5
0.0419
500000
357000
214845
107423
RK5
54.9
1030
200
150
1.5
0.0419
500000
423000
221394
110697
RK6
86.5
1030
200
150
1.5
0.0419
500000
556000
277900
138950
RK7
54.7
1030
200
150
2
0.0419
500000
277000
220991
110495
RK8
38.9
1030
200
150
1.5
0.0419
500000
273000
186361
93181
HAKUTO 2000
HEGGER 2003
70-2T5
92.3
2431
450
385
1
0.02
196000
1276660
1657805
828902
70-1T55
84
2431
450
385
1
0.02
196000
1282170
1581511
790756
28-3T4
42.2
4028
550
465
0.909
0.0134
196000
1200810
1654745
827373
28-0T0
39.8
3278
550
465
0.909
0.0134
196000
1230620
1607002
803501
HWANG 2004
0T0
81.1
1639
420
370
1.071
0.0229
196000
1078820
1393865
696933
1B8
74.5
1639
420
370
1.071
0.0229
196000
1151020
1335945
667972
3T3
83.1
2277
420
370
1.071
0.0229
196000
1058500
1410948
705474
2T4
85.5
2146
420
370
1.071
0.0229
196000
1066320
1431177
715589
1T44
87.7
2146
420
370
1.071
0.0229
196000
1072570
1449473
724737
3T4
90.7
2779
450
385
1
0.0202
196000
1280760
1643373
821687
2T5
92.3
2431
450
385
1
0.0202
196000
1272890
1657805
828902
1T55
84
2431
450
385
1
0.0202
196000
1278400
1581511
790756
S1
36.1
0
180
165
1.67
0.0318
90000
194080
177734
88867
S2
94
0
180
165
1.67
0.0318
90000
199040
286800
143400
HUANG 2005
IDAYANI 2007
17
170
180
165
1.67
0.0318
90000
223870
177734
88867
31.6
0
200
200
1.5
0.0079
152290
82560
223956
111978
31.6
101
200
200
1.5
0.0079
126400
82930
223956
111978
A2
31.6
201
200
200
1.5
0.0079
152290
82930
223956
111978
A3
31.6
302
200
200
1.5
0.0079
152290
82200
223956
111978
B0
31.6
0
300
200
1
0.0157
228430
227810
335934
167967
B1
31.6
101
300
200
1
0.0157
228430
253290
335934
167967
C0
31.6
157
300
200
1
0.0151
228430
239700
335934
167967
C2
31.6
358
300
200
1
0.0151
228430
242760
335934
167967
C3
31.6
459
300
200
1
0.0151
228430
239700
335934
167967
C5
31.6
660
300
200
1
0.0151
228430
243530
335934
167967
AJ1S
32.8
101
200
200
1.5
0.0079
70000
84830
228169
114084
A1
36.4
0
200
200
1.5
0.0079
70000
74950
240364
120182
A2
36.4
0
200
200
1.5
0.0079
70000
76070
240364
120182
B1
36.4
402
200
200
1.5
0.0079
70000
77190
240364
120182
B2
36.4
402
200
200
1.5
0.0079
70000
77190
240364
120182
BS-OL
30.9
0
300
280
1.5
0.0209
402980
264210
465070
232535
BS-LL
30.9
0
300
280
1.5
0.0209
402980
534590
465070
232535
BS-U
30.9
0
300
280
1.5
0.0209
402980
411210
465070
232535
BS-L-LS
30.9
0
300
280
1.5
0.0209
402980
415730
465070
232535
E1
30.4
435
300
300
1
0.0268
216000
535550
494241
247120
E2
30.4
435
300
300
1
0.0268
216000
371130
494241
247120
B2
28.3
435
300
300
1
0.0177
216000
370030
476865
238432
LEE & KO 2007
W0
34.8
1402
400
450
1.125
0.0127
835200
907830
1057600
528800
LIU 2006
RC-1
18
0
230
215
1.4348
0.0178
75000
148710
208959
104480
T5
21.5
603
300
300
1.67
0.0124
290250
267900
415644
207822
T9
21.5
603
300
300
1.67
0.0124
580500
303200
415644
207822
T10
21.5
603
300
300
1.67
0.0124
290250
322500
415644
207822
T2
29.1
0
200
200
1.65
0.0164
100000
72090
214915
107457
1
39.9
0
406
406
1
0.0314
546700
1224550
1037046
518523
2
36.4
0
406
406
1
0.0314
1247000
1110450
990517
495259
3
41
0
406
406
1
0.0314
561500
1045820
1051244
525622
4
38.1
0
406
406
1
0.0314
1304800
1771780
1013384
506692
5
38.2
0
406
406
1
0.0314
523600
966870
1014713
507356
KARAYANNIS 2008
KARAYANNIS & SIRKELIS 2005
KARAYANNIS & SIRKELIS 2008
KUANG & WONG 2006
KUSHARA & SHIOHARA 2008
MASI 2009
PAMPANIN 2002
PANTELIDES 2002
S3
36.1
A0 A1
18
PARKER & BULIMAN 1997
6
37.3
0
406
406
1
0.0314
1280000
1160640
1002688
501344
4A
49
0
300
275
1.67
4B
49
0
300
275
1.67
0.0218
0
231270
575190
287595
0.0218
300000
270470
575190
4C
46
0
300
275
287595
1.67
0.0218
570000
333190
557304
4D
49
0
300
278652
275
1.67
0.0218
0
293990
575190
287595
4E
50
0
300
275
1.67
0.0218
300000
313590
581030
290515
4F
47
0
300
275
1.67
0.0218
600000
358670
563329
281665
5A
53
679
300
275
1.67
0.0218
0
455890
598207
299103
5B
54
679
300
275
1.67
0.0218
300000
477180
603824
301912
5C
54
679
300
275
1.67
0.0218
600000
474180
603824
301912
5D
54
679
300
275
1.67
0.0357
0
454570
603824
301912
5E
56
679
300
275
1.67
0.0357
300000
593360
614904
307452
5F
54
679
300
275
1.67
0.0357
600000
647670
603824
301912
62709
C1AL
41.7
57
150
130
1.4
0.0201
50000
114650
125419
C2
61.7
57
150
130
1.4
0.0201
275000
110360
152559
76279
C3L
44.4
57
150
130
1.4
0.0201
50000
112310
129415
64708
C4
44.4
57
150
130
1.4
0.0357
275000
159630
129415
64708
C4A
55.4
57
150
130
1.4
0.0357
275000
169610
144560
72280
C4AL
44.7
57
150
130
1.4
0.0357
50000
154260
129852
64926
C5
41.3
57
150
130
1.4
0.0357
275000
75620
124816
62408
C6
49.8
57
150
130
1.4
0.0357
275000
118660
137059
68530
C6L
57.3
57
150
130
1.4
0.0357
50000
140170
147018
73509
SCOTT 1996
C7
44
57
150
130
1.4
0.0357
275000
104380
128831
64415
C8
55.6
57
150
130
1.4
0.0357
275000
89040
144821
72410
C9
44.9
57
150
130
1.4
0.0357
275000
92210
130142
65071
M1
34
444
200
200
1.5
0.0192
300000
153660
232305
116153
M2
33.5
451
200
200
1.5
0.0308
300000
282150
230591
115295
A1
35
581
200
200
1.5
0.0157
200000
157280
235697
117848
E2
35
732
200
200
1.5
0.0154
200000
152500
235697
117848
E1
26.5
732
200
200
1.5
0.0231
200000
233960
205089
102544
G1
26.5
760
200
200
1.5
0.0231
200000
239320
205089
102544
S1
44.6
918
200
200
1.5
0.0154
713600
143390
266064
133032
S2
31.3
1018
200
200
1.5
0.0153
500800
157200
222890
111445
S6
39.8
1018
200
200
1.5
0.0308
636800
225600
251340
125670
X6
32.5
616
200
200
1.5
0.0308
520000
302530
227123
113561
TSONOS 1999
TSONOS 2007
TSONOS 1992
WONG & KUANG 2008
S'6
34.9
0
200
200
1.5
0.0308
558400
303770
235360
117680
F2
28.9
0
200
200
1.5
0.0308
462400
205550
214175
107087
BS-L-300
42.6
0
300
280
1
0.0209
575100
561830
546064
273032
BS-L-450
38.6
0
300
280
1.5
0.0209
521100
377440
519795
259898
BS-L-600
45.5
0
300
280
2
0.0209
614250
340120
564345
282172
BS-L-V2
40.7
314
300
280
1.5
0.0209
549450
514180
533747
266874
VS-L-V4
35.4
628
300
280
1.5
0.0209
477900
533800
497783
248892
BS-L-H1
41.6
157
300
280
1.5
0.0209
561600
495480
539617
269808
19
ALVA 2004
BS-L-H2
52.6
314
300
280
1.5
0.0209
710100
531070
606780
303390
LVP1
40.4
1208
300
200
1.33
0.0268
360000
539500
379841
189920
LVP2
23.9
1005
300
200
1.33
0.0268
397620
514100
292152
146076
LVP3
24.6
1206
300
200
1.33
0.0268
215010
364400
296400
148200
LVP4
24.6
1005
300
200
1.33
0.0268
221580
327200
296400
148200
LVP5
25.9
1206
300
200
1.33
0.0268
233190
380400
304131
152065
2D1
17.9
0
230
230
1.4348
0.0118
115000
18250
222916
111458
2D2
18.9
0
230
230
1.4348
0.0118
115000
23890
229058
114529
2D3
18
0
230
230
1.4347
0.0119
115000
26780
223538
111769
2D4
18.7
0
230
230
1.4347
0.0119
115000
23890
227843
113922
U-J-1
29.63
0
457.2
430.9
1
0.028
97860
991950
1068090
534045
U-J-2
30.54
0
457.2
430.9
1.67
0.0221
97860
791780
1084368
542184
U-BJ-1
30.27
0
457.2
430.9
1
0.0109
97860
533570
1079564
539782
31.31
100.53
200
250
1.5
0.0201
0
257904
278658
139329
45.52
100.53
200
250
1.5
0.0201
0
368165
335993
167997
31.8
100.53
200
250
1.5
0.0201
0
372400
280830
140415
24.88
100.53
200
250
1.5
0.0201
0
330547
248402
124201
ALVA 2007
Umut Akguzel 2011
HASSAN WAEL 2011
Ridwan 2016
Sefatullah Halim 2014
BCJ-CSA BCJ-SSS4 BCJ-SSF4 BCJ-SSS8 BCJ-SSF8 BCJ-CSB
32.29
100.53
200
250
1.5
0.0201
0
358623
282985
141492
28.68
502.655
200
250
1.5
0.0201
0
336809
266697
133349
I-1
26.4
226.195
500
450
0.9
0.0155
2250000
950000
1151447
575723
I-1t
25.5
452.39
500
450
0.9
0.0219
2250000
1065000
1131650
565825
*Joint width is calculated according to ACI-352
20
Highlights •
•
Joint shear strength models available in the literature can predict the shear strength for RC beam-column connections exposed to uniaxial cyclic loading while an accurate biaxial joint shear strength model is still lacking. Gene expression programming is used in this research to develop uniaxial and biaxial joint shear strength models for exterior RC beam-column connections.