Wave modes of a pre-stressed thick tube conveying blood on the viscoelastic foundation

Applied Mathematical Modelling xxx (2014) xxx–xxx

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Wave modes of a pre-stressed thick tube conveying blood on the viscoelastic foundation Shueei-Muh Lin a, Wen-Rong Wang a,⇑, Sen-Yung Lee b, Chien-Wi Chen b, Yu-Cheng Hsiao b, Min-Jun Teng c a

Mechanical Engineering Department, Kun Shan University, Tainan 710-03, Taiwan, ROC National Cheng Kung University, Tainan 701, Taiwan, ROC c Mechanical Engineering Department, Guangzhou College of South China University of Technology, China b

a r t i c l e

i n f o

Article history: Received 19 March 2011 Received in revised form 27 May 2014 Accepted 3 June 2014 Available online xxxx Keywords: Artery Dispersion curve Energy propagation Wave mode Viscoelastic foundation

a b s t r a c t Wave propagation of an artery is a fluid–structure interaction problem. It is very complicate. Therefore, the conventional theories for circulation of arteries are emphasized on fluid behavior, some simplified models for experimental utility or the thin-walled tube theory. Based on the geometry of an artery, the thick-walled tube theory is reasonable. In this study, a new mathematical model is proposed to describe the wave propagation through the isotropic elastic thick tube filled with viscous and incompressible fluid. Moreover, the tube is supported by the elastic muscle and simulated as the viscoelastic foundation. The radial, axial and flexural vibrations of a tube wall are introduced simultaneously. These wave modes are generally called as the flexural, Young and Lamb modes. In the literatures according to different assumptions, the Young and Lamb modes were independently derived and independent to the wave frequency. Because these conventional models are over simplified, the corresponding investigations are incomplete and inaccurate. Moreover, the present thick-walled tube theory is compared with the thin-walled tube theory and these conventional limiting theories. The dispersion curves and the energy transmissions of the three modes are investigated. It is illustrate that the energy transmitted through the artery tube is consistent to the experiment. Moreover, it is found that the effects of the viscoelastic foundation constants on the wave speed and the transmission is significant. When the foundation constant is large enough, some corresponding mode will disappear. Ó 2014 Published by Elsevier Inc.

1. Introduction No matter animals or human beings, the blood circulation plays an important role in maintaining body working well. Many scientists investigated the heart vascular system, and proposed several theories and models to explain the performances of the blood circulation system. In general, the ratio of tube thickness to the tube radius of the artery of man or dog is from 0.06 to 0.13 [1]. The thick-walled tube theory should be considered for simulating the behavior of the artery. However, since the calculations appeared to be very laborious, the thin-walled tube theory was often introduced [2,3].

⇑ Corresponding author. Tel.: +886 6 2050496; fax: +886 6 2050509. E-mail address: [email protected] (W.-R. Wang). http://dx.doi.org/10.1016/j.apm.2014.06.002 0307-904X/Ó 2014 Published by Elsevier Inc.

Please cite this article in press as: S.-M. Lin et al., Wave modes of a pre-stressed thick tube conveying blood on the viscoelastic foundation, Appl. Math. Modell. (2014), http://dx.doi.org/10.1016/j.apm.2014.06.002

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Nomenclature A cij Cr, Cx Cw D E f G h k Kr, Kx L Mij

surface area of the fluid element elastic constants damping coefficients in the r- and x-directions, respectively wave speed diameter of the tube Young’s modulus friction factor of the tube wall shear modulus thickness of the tube wall wave number elastic foundation constants in the r- and x-directions, respectively tube length twisting moment perpendicular to i-plane along j-direction or perpendicular to j-plane along i-direction per unit length Mx bending moment perpendicular to x-plane along h-direction per unit length Mh bending moment perpendicular to h-plane along x-direction per unit length Nij shearing force perpendicular to i-plane along j-direction or perpendicular to j-plane along i-direction per unit length Nx normal force perpendicular to x-plane along h-direction per unit length Nh normal force perpendicular to h-plane along x-direction per unit length ^ normal direction of surface n p liquid pressure at the wall R average radius of tube Re Reynold’s number Ri inner radius of tube Ro outer radius of tube r et percentage of energy propagations through the tube t time variable ur, uh, ux total displacements in r-direction, in h-direction and in x-direction u displacement in x-direction w displacement in r-direction ~ v the flow velocity V volume of the fluid element Greek symbols b angle due to bending cij shearing strain on i–j plane e normal strain g flow velocity distribution t Poisson’s ratio q density r normal stress sij shearing stress perpendicular to i-plane along j-direction x wave frequency Superscript, subscripts – amplitude max maximum quantity r radial coordinate h transverse coordinate x axial coordinate f fluid s solid 0 static quantity due to pre-stressed 1 disturbed quantity due to wave propagation

Please cite this article in press as: S.-M. Lin et al., Wave modes of a pre-stressed thick tube conveying blood on the viscoelastic foundation, Appl. Math. Modell. (2014), http://dx.doi.org/10.1016/j.apm.2014.06.002

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Since Harvey [4] introduced the concept of the blood circulation, scientists have developed several vital theories. Hales [5] introduced the Winkessel model. The Winkessel model regards the whole arteries system as an elastic cavity. If the heart contracts, the cavity expands. In contrast, if the heart expends, the cavity recovers to original volume. It is expressed as the compliance–resistance model (C–R model). But the Windkessel model is only suitable for predicting pressure and volume of each contraction, and fails to evaluate flow velocity [6]. Assuming a steady and laminar flow and a rigid tube, the Poiseuille’s equation explains the physical characteristics of the blood capillary [2]. Fishman and Richards [7] applied the Poiseuille’s equation in their experiment. However, the Poiseuille’s equation neglects that the pressure wave propagation in fluid creates an oscillation motion of the wall in a radial direction. Moens and Korteweg [1] developed a simple equation called as the Moens–Korteweg equation to predict the pressure wave velocity in long straight thin tube filled with an inviscid fluid. Because the effects of viscosity of fluid, inertial and shear and bending deformations of a tube are neglected, the qffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi Moens–Korteweg equation can only derive the wave speed cw ¼ Eh=½2ðR  h=2Þqf . Bergal [8] modified the Moens– Korteweg equation for a thick-walled tube. It was found that the inclusion of wall thickness in the calculations increases the wave speed by about 10% over that given by conventional Moens–Korteweg expression. The Klip model considers the longitudinal wave propagation through the wall only and the effect of the tube flexural deformation is neglected. The wave qffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi speed is cw ¼ E=½qf ð1  m2 Þ [9]. Womersley [10] considered a thin walled tube and the linearized Navier–Stokes equations that the nonlinear convective acceleration terms were neglected. Meanwhile, the radial vibration of tube wall was neglected. According to these assumptions, only the Young and Lamb modes were found. Moreover, the Young and Lamb modes represent the pressure wave modes propagating in the fluid and in the wall, respectively. Note that neglecting the radial vibration of tube does not match the real wave performance of artery. Tsangaris and Drikakis [11] used the shell theory and the Navier–Stokes equation to simulate the pressure wave traveling in anisotropic elastic tube. The model neglected the effects of the radial vibration and the moving boundary between the tube and the fluid. Demiray [6] considered the dynamic relation between the inner pressure and the radial oscillation of a tube. But the effect of flexural deformation of a tube and the viscosity of fluid were neglected. Then only the Young mode which represent pressure wave propagating in the fluid could be derived. Wang, et al. [12,13] considered an artery system as a transmission system of the blood pressure wave. When the wave frequency of the artery was consistent to the natural frequency of a tissue, the transmission efficiency was the best. This model is called as the resonant model. However, this model was derived too roughly to investigate the effects of the pre-pressure, the flow velocity and the flexural and axial vibrations. Lin et al. [2] investigated the wave modes of an elastic thin tube conveying blood. A new mathematical theory was proposed to describe the wave propagation through the elastic tube filled with viscous and incompressible fluid. The radial, axial and flexural vibrations of a tube wall are introduced simultaneously. In fact, the blood tube is tethered to surrounding tissue. The supporting effect of surrounding tissue on the wave propagation in the blood tube is not considered in the literature. The effect is not considered by Lin et al. [2]. Hodis and Zamir [14,15] investigated the effect of surrounding tissue on the shear stress in the tube wall. The cases of fully tethered and free walls and the complex Young’s modulus were considered. But the radial displacement was neglected and all properties were independent to the longitudinal axis. So far, no literature studies the wave propagation in the thick-walled blood tube tethering to surrounding tissue. In this paper, the mathematical theory for a thick-walled tube with the supporting effect of surrounding tissue on the wave propagation in the blood tube is investigated.

2. Governing equation of motion 2.1. Motion of an elastic tube Consider an artery as uniform isotropic elastic thick tube [2]. The blood flows in the tube. In general, the critical threshold between laminar and turbulent flow is usually in the neighborhood of 2300. The mean average Reynold number in ascending aorta of an adult man is about 1500. Thus the flow field is laminar [16]. When any pulse wave generates from the heart, the energy is propagated via the blood and the tube. Meanwhile, there is the coupled motion of the tube and the blood. In order to investigate the coupled motion, the dynamic behavior of the tube is simulated by using the thick shell theory, as shown in Fig. 1. The blood flow field is simulated later. The assumptions about the tube are as follows: a. b. c. d. e.

The The The The The

angle due to bending and the rotary inertia are considered. shear deformation in the x–r plane is considered. effect of tube bending is considered. plane cross section of a tube wall remains plane during deformation. axial symmetry is considered. The displacement uh ¼ 0 and the parameters are independent of the h-axis.

It is well known that due to rough simplification one can obtain only one mode of the system such as the Young mode [1] and the Lame mode [9]. In the present model, three modes will be obtained simultaneously. These should be the lower and fundamental modes dominating in the real system. So far, the relevant mechanism is not clearly investigated. It is expected that if the nonlinear, anisotropic and non-axial symmetry effects are considered, the higher modes will be found. It is helpful Please cite this article in press as: S.-M. Lin et al., Wave modes of a pre-stressed thick tube conveying blood on the viscoelastic foundation, Appl. Math. Modell. (2014), http://dx.doi.org/10.1016/j.apm.2014.06.002

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Fig. 1. Control volume of liquid flow in a circular cylinder.

to more accurately understanding the performance of wave propagation of artery. However, the system becomes too complicated to solve analytically so far. The relevant investigation will be made in future. The equilibrium equations of motion in the thick-walled tube theory are [13]

" # 3 1 @2u h @2b @w @2u @2b @u þ sw ¼ I 0 2 þ I 1 2 þ K x u þ C x þ c h ; c11 Rh 2 þ c11 12 2 R @x @x @t 12 @x @t @t

!   @b @ 2 w 1 @u @2w @w Gh þ 2  c12 h þ c11 ðln Ro  ln Ri Þw þ p ¼ I0 2 þ K r w þ C r ; @x @x R @x @t @t   3 3 c11 h @ 2 u c11 h @ 2 b @w @2u @2b ¼ I1 2 þ I2 2 ; þ  Gh b þ @x 12R @x2 12 @x2 @t @t

ð1Þ

ð2Þ

ð3Þ

where the relevant derivation is presented in Appendix. The coefficients are

I0 ¼ qs h;

I1 ¼

qs h3 12R

;

I2 ¼

qs h3 12

:

ð4Þ

Considering the tube wall is tethered, the viscoelastic foundation constants K and C are given. 2.2. Coupled motion of fluid and tube 2.2.1. Conservations of momentum and mass When a wave propagates through a tube, the flow field in the tube is assumed to be well developed. In addition, no slip condition at the wall should be considered. This condition is not considered by Lin et al. [2]. Therefore, the modified velocity distribution is expressed as

"    2 # @ h r uðx; tÞ  bðx; tÞ þ gmax ðx; tÞ 1  g¼ : @t 2 Ri þ w

ð5Þ

The average shear stress at the wall is

sw ¼ l

  @ 1 @g dz gþ : @r 2 @z wall

ð6aÞ

Considering w << R, one can obtain

sw ðx; tÞ  2lgmax =Ri :

ð6bÞ

It is well known that the conservation of linear momentum for liquid is, as shown in Fig. 1.

Fb þ Fs ¼

@ @t

Z

c:v :

~ mqf dv þ

Z

c:s:

~ mqf ~ m  n^dA;

ð7Þ

where the body force Fb is negligible here. The surface force is

   2 @p @w dx þ ppðR þ wÞ2  sw  2pRi  dx: F s ¼  p þ dx  p Ri þ w þ @x @x

ð8Þ

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Substituting the shear stress (6b) at the wall into Eq. (7) and considering a small amplitude, i.e., w << R, the momentum equation can be written as

  @w @p 2 2pRi  ðRi þ 2Ri wÞ  4lgmax @x @x (" # )      @2u h @2b 2 @u h @b @w 1 @ gmax @ gmax @w ¼ qf  þ 2R  q R R þ 2 g R þ w þ i i i f max i @t 2 @t @t 2 @t @t @t @t 2 2 @t 2 3 2 ! ! !   @u h @b @2u h @2b @2u h @2b @u h @b @ gmax 2 @ gmax 2 6 2 þ ðRi þ wÞ 7    g þð  Þ þ gmax 7 6 @t 2 @t @t@x 2 @t@x @t@x 2 @t@x max @t 2 @t @x 3 @x 7 6 ! þ qf 6 7: ð9Þ     2 7 6 @w 5 4 þ @u  h @b þ @u  h @b g 1 2 2ðR þ g þ wÞ i max 3 max @t 2 @t @t 2 @t @x Meanwhile, if the amplitude of wave is small, the mass conservative equation can be expressed as

6Ri

@w þ @t

(

 

)     @ 6 @u  2h @b þ gmax @u h @b @w @t @t ¼ 0: þ gmax 2Ri 6  þ ðR2i þ 2Ri wÞ @t 2 @t @x @x

ð10Þ

A new mathematical model simulating the wave propagation through an elastic thick-walled tube conveying a liquid has been derived here. These coupled equations of wave propagation model are composed of Eqs. (1)–(3) and (9) and (10). 3. Solution method 3.1. Relation between pressure and flow velocity Consider that there exists a pre-stressed pressure and a flow rate in the tube. When a wave propagates through a tube conveying a liquid, the pressure and the velocity can be assumed to be

pðx; tÞ ¼ p0 ðxÞ þ p1 ðz; tÞ;

gmax ðx; tÞ ¼ g0 ðxÞ þ g1 ðx; tÞ;

ð11Þ

where p0,z is the pre-stressed steady pressure at the position of z, p1 the disturbed wave pressure, gmax0 the average maximum flow velocity corresponding the given flow rate, and gmax1 the disturbed wave flow velocity. In general, a steady pressure loss Dp through a tube is determined by using the Darcy–Weisbach equation as follows:

Dp ¼ f

L qf g2a ; D 2

ð12Þ

where ga is the average flow velocity which is determined via Eq. (5) and ga ¼ gmax0 =2. L is the tube length, D is the diameter of the tube, and f is the friction factor. In this study, because the flow is laminar, the friction factor f ¼ 64=Re. Substituting it back into Eq. (12), the pressure gradient is

dp0 4lg0 ¼ : dx R2i

ð13Þ

3.2. Small propagation and linearization of general system In general, because the elastic wave propagation is small, the disturbed wave pressure and velocity {p1, gmax1} are small. Substituting Eqs. (11) and (13) back into the coupled non-linear governing equations (1)–(3), (9) and (10) and considering the condition of small wave propagation, the coupled governing equations are linearized as follows:

" # 3 1 @2u h @2b @w 2lgmax @2u @2b @u þ c11 Rh 2 þ c11 þ c h ¼ I0 2 þ I1 2 þ K x u þ C x ; 12 2 R @x @x @t 12 @x Ri @t @t !   @b @ 2 w 1 @u @2w @w Gh þ 2  c12 h þ c11 ðln Ro  ln Ri Þw þ p ¼ I0 2 þ K r w þ C r ; @x @x R @x @t @t   3 3 c11 h @ 2 u c11 h @ 2 b @w @2u @2b ¼ I þ  Gh b þ þ I ; 1 2 @x 12R @x2 12 @x2 @t 2 @t2 

" # @ðp0 þ p1 Þ 2 @ 2 u1 h @ 2 b1 1 @ g1 þ qf R2i Ri  4lðg0 þ g1 Þ ¼ qf R2i  ; @x 2 @t 2 2 @t @t2

ð14Þ

ð15Þ

ð16Þ

ð17Þ

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    @w @w dg0 @ g1 dg þ 2 0 w ¼ 0: þ 2g0 þ Ri þ @t @x dx @x dx

ð18Þ

It is found that if the axial elastic foundation constant Kx is infinite, i.e., cx1 ¼ 1, the axial displacement is zero i.e., u ¼ 0. If the radial elastic foundation constant Kr is infinite, i.e., cr1 ¼ 1, the radial displacement is zero i.e., w ¼ 0. Moreover, if the elastic foundation constants Kx and Kr are infinite, the wall is fully tethered. If the elastic foundation constants Kx and Kr are zero, the wall is completely free from tethering. If the elastic foundation constants Kx and Kr are finite, the wall is partially tethered. Therefore, the degree of tethering can be clearly described by using the elastic foundation constants. Further, the effects of the elastic foundation constants on the wave speed and energy propagation are investigated later. 3.3. Characteristic equation The wave solutions of Eqs. (14)–(18) can be expressed as

gmax ¼ g0 þ g1 ¼ g0 ðxÞ þ g 1 eiðkxxtÞ ; p ¼ p0 þ p1 ¼ p0 ðxÞ þ p1 eiðkxxtÞ ; u ¼ u0 þ u1 ¼ u0 ðxÞ þ u 1 eiðkxxtÞ ;  1 eiðkxxtÞ ; w ¼ w0 þ w1 ¼ w0 ðxÞ þ w

1 eiðkxxtÞ : b ¼ b0 þ b1 ¼ b0 ðxÞ þ b

ð19Þ

Substituting Eq. (19) into Eqs. (14)–(18), the general system is divided into two subsystems as following: (a) Dynamic subsystem is composed of five following equations:

  4x h  1 þ 2ix u 1  b w 1 ; 2 kRi

g 1 ¼

1 ¼ p

"

qf ðikÞ

h 2

x2 ðu 1  b1 Þ þ

! # ix 4l  g 1 ; 2 qf R2i

1 ¼ 0; 1 þ a2 w  1 þ a3 b a1 u

ð20Þ

ð21Þ

ð22aÞ

where

  4lix 1 ¼ cx2 c11 hk2 þ I0 x2 þ ixC x þ a  cx1 ; Ri 2 ¼ cx2 a

" # ic12 hk 8lx þ 2 ; R Ri k

3 ¼ cx2 c11 a

cx1 ¼

Kx ; 1 þ Kx

! 3 2 h k 2lixh 2 þ I1 x  ; Ri 12R

cx2 ¼

1 : 1 þ Kx

1 ¼ 0;  1 þ b2 w  1 þ b3 b b1 u

ð22bÞ ð23aÞ

where

" # ic12 hk 8lx  ; b1 ¼ cr2  2 R kRi " !# 2 2 ¼ c Ghk2  c11 ðln Ro  ln Ri Þ þ I0 x2  K r þ ixC r þ 2qf x þ 16lix  cr1 ; b r2 2 2 R k Ri k R3i " # 4hlx  ; b3 ¼ cr2 iGhk þ 2 kRi

cr1 ¼

Kr ; 1 þ Kr

cr2 ¼

1 1 þ Kr

1 ¼ 0  1 þ c2 w  1 þ c3 b c1 u

ð23bÞ ð24aÞ

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where 3 2

c11 h k þ I 1 x2 ; 12R

c1 ¼ 

3 2

c2 ¼ GhðikÞ;

and c3 ¼ 

c11 h k  Gh þ I2 x2 : 12

ð24bÞ

(b) Static subsystem is composed of three following equations:

" #   2 3 2 1 d u0 h d b0 dw0 2lg0 h ; c11 Rh 2 þ c11 þ c h ¼ K u þ b þ 12 x 0 R 2 0 12 dx2 dx Ri dx 2

Gh

db0 d w0 þ 2 dx dx

! 

  1 du0 c12 h þ c11 ðln Ro  ln Ri Þw0 þ p0  K r w0 ¼ 0; R dx

  3 2 3 2 c11 h d u0 c11 h d b0 dw0 þ  Gh b0 þ ¼ 0; 2 2 12R dx 12 dx dx ðR2i þ 2Ri w0 Þ

2Ri g0

  dp0 dw0 1 dw0 dg dg  2Ri p0  4lg0 ¼ qf 2Ri g20 þ 2R2i g0 0 þ 4Ri g0 0 w0 ; 3 @x dx dx @x @x

dw0 dg0 dg þ R2i þ 2Ri 0 w0 ¼ 0: dx dx dx

ð25Þ

ð26Þ

ð27Þ

ð28Þ

ð29Þ

Note that Eqs. (25)–(29) are the relations among the static displacements, fu0 ; w0 ; b0 g, the pre-pressure p0 and flow velocity

g0. Obviously, if the small deformation of tube is considered, Eq. (28) becomes to be the same as Eq. (13). In the dynamic subsystem, Eqs. (22)-(24) can be expressed as

2

1 a 6 4 b1

2 a 2 b

32 3 2 3 3 1 a u 0 6 7 6 7 3 7 b 0 5: ¼ 54 w 5 4 1

c1

c2

c3

1 b

ð30Þ

0

As a result, the dispersion equation of this dynamic system is obtained

 a  1   b1   c1

2 a 2 b c2

 3  a 3  ¼ 0: b  c3 

ð31Þ

4. Energy propagation It is well known that the wave energy is stored in both the tube and the liquid. Milnor [1] found by experiment that for an in situ artery, over 90% of the energy is stored in the arterial wall and less than 10% is stored in the blood flow. However, the mechanism about the wave energy propagation has not been completely and clearly investigated yet. In this study, the energy transmission via different mode is investigated. The energy propagation stored in the liquid is a product of the pressure p and the flow velocity g and expressed as following:

El ¼

Z

hpðtÞ; gðtÞidA;

ð32Þ

A

RT

where the average energy rate is hpðtÞ; gðtÞi ¼ 0 ReðpÞReðgÞdt=T. The energy in the tube is composed of the normal strain energy and the shear strain energy and is written as

Et ¼

Z

hrx ; @ux =@tidA þ

A

Z

hsrx ; @ur =@tidA;

ð33Þ

A

RT where the average normal strain energy is hrx ; @ux =@ti ¼ 0 Reðrx ÞRe½@ux =@tdt=T and the average shear strain energy is RT hsrx ; @ur =@ti ¼ 0 Reðsrx ÞRe½@ur =@tdt=T. Substituting the pressure and the flow velocity of a wave mode into Eq. (32) and the stresses and the displacements of a wave mode into Eq. (33), the corresponding energy propagations stored in the blood liquid and the tube can be obtained. 5. Numerical results Given a wave frequency x, one can easily find four sets of conjugated complex wave numbers of Eq. (31), kn ðxÞ ¼ kr;n ðxÞ  iki;n ðxÞ; n ¼ 1; 2; 3; 4. Each set of conjugated roots represent both a forward wave and a backward wave, Please cite this article in press as: S.-M. Lin et al., Wave modes of a pre-stressed thick tube conveying blood on the viscoelastic foundation, Appl. Math. Modell. (2014), http://dx.doi.org/10.1016/j.apm.2014.06.002

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respectively. If ki,n is positive, the wave amplitude decays with a forward wave. But if ki,n is negative, the wave amplitude increases with a forward wave. This solution is trivial. Based on these facts, one can obtain the dispersion curves of several wave modes. In this study, the wave propagation through both the blood and the artery are considered. One finds that three sets of conjugated roots are reasonable, but one is trivial. Each reasonable solution represents one wave mode. In summary, the wave energy is propagated in terms of three kinds of wave modes shown in Fig. 2. Fig. 2 shows the influence of the wave frequency on the three mode shapes. Firstly, it is observed that the first mode is dominated by a radial displacement of a tube wall. The deformation of tube does not depend on the wave frequency. However, the influence of the wave frequency on the fluid velocity is significant. When the wave frequency is small, the fluid velocity is very small. It implies that when the wave frequency is small, the majority of the wave energy must be propagated through the tube in the bending motion. However, increasing the wave frequency significantly increases the fluid velocity. It means that when the wave frequency is large, the majority of the wave energy is propagated through both the tube in the bending motion and the fluid. Secondly, the second mode is usually called as the Young mode. It is an axial motion of a tube accompanying small radial and bending motions of a tube and relatively very large amplitude of fluid velocity. Therefore, the majority of the wave energy must be propagated through fluid in the pressure wave motion. Finally, the third mode is usually called as the Lamb mode. It is a large axial motion of a tube accompanying the negligible radial and bending motions of a tube. The influence of the wave frequency on the fluid velocity is significant. When the wave frequency is small, the ratio of the fluid velocity and the axial motion is very small. Therefore, the majority of the wave energy must be propagated through the tube in the axial motion. It is consistent to the traditional phenomenon of the Lamb mode. When the wave frequency is large enough, the ratio of the fluid velocity and the axial motion becomes significant. In other words, the majority of the wave energy is propagated through both the tube in the axial motion and the fluid. The physical and material properties in Fig. 2 are considered later. Moreover, several methods are used to investigate the dispersion curves of the Young mode. Fig. 3a shows that the numerical results by using the present thick-walled tube theory and the thin-walled tube theory [2] are compared with those by Womersley [10], Wang et al. [12], Cox [17] and Mirsky [18]. It is found that the wave speed determined by Wang et al. [12] is overestimated and that by Cox [17] is underestimated. In this case the ratio of the tube thickness to the tube radius h/R is 0.13. The numerical results by using the present thick-walled tube theory and the thin-walled tube theory [2] are almost consistent. Further, Fig. 3b shows the relation between the transmission per wavelength and the wave frequency of the second or Young mode without the elastic foundation. It is observed that the transmission per wavelength increases with the wave frequency. If the wave frequency is large enough, the transmission per wavelength approaches constant. Moreover, it is found that the transmission determined by Wang et al. [12] is over estimated. The numerical results by using the present thick-walled tube theory and the thin-walled tube theory [2] are almost consistent. Fig. 4 show the comparison of the thin-walled tube theory [2] and the present thick-walled tube theory with different ratio h/R. It is found that the effect of the ratio h/R on the relation between the wave speed and the wave frequency is great. Moreover, the larger the ratio h/R is, the more the difference between the wave speed in the present thick-walled tube theory

Fig. 2. Influence of wave frequency x on the three kinds of mode shapes. [cr1 ¼ cx1 ¼ 0, qf = 1056 kg/m3, l = 3.5  103 N  s/m2, p0 = 7466 Pa].

m = 0.5, E = 1.6 MPa, Ro = 0.13 cm, h = 0.039 cm, qs = 1100 kg/m3,

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9

Fig. 3. Comparison of wave speeds and dispersion curves of the second mode in different models. [cr1 ¼ cx1 ¼ 0, m = 0.5, E = 3 MPa, Ro = 0.23 cm, h = 0.03 cm, qt = 1100 kg/m3, qf = 1056 kg/m3, l = 3.5  103 N  s/m2, p0 = 10 kPa].

and that in the thin-walled tube theory for the first and second modes but not for the third mode. The reason can be found from the mode shapes shown in Fig. 2 that the first and second modes include both the flexural and shear deformations. But for the third mode the axial motion dominates. Based on the relations (32) and (33), one can determine the quantities of energy transmission through the tube and the liquid or blood. As shown in Fig. 5, the effect of the ratio h/R on the relation between the energy transmission through the tube and the wave frequency is significant. Increasing the ratio h/R increases the energy transmission through the tube for the second mode. It is because the flexural motion dominates for the second mode. In other hand, increasing the ratio h/R decreases the energy transmission through the tube for the third mode. It is because the axial motion dominates for the third mode. Moreover, the larger the ratio h/R is, the more the difference between the energy transmission through the tube in the present thick-walled tube theory and that in the thin-walled tube theory for all the modes. It is also observed that about

Fig. 4. Relation among the ratios h/R0, the wave frequency x and the wave speed cw. [cr1 ¼ cx1 ¼ 0, m = 0.5, E = 1.6 MPa, Ro = 0.13 cm, qs = 1100 kg/m3, qf = 1056 kg/m3, l = 3.5  103 N  s/m2, p0 = 7466 Pa].

Please cite this article in press as: S.-M. Lin et al., Wave modes of a pre-stressed thick tube conveying blood on the viscoelastic foundation, Appl. Math. Modell. (2014), http://dx.doi.org/10.1016/j.apm.2014.06.002

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99.8% and 95% of the energies of the first and third modes are transmitted through the tube. As to the second mode, if the wave frequency is large enough, only about 50% of the energy is transmitted through the tube. The detailed reasons are expressed as follows: It has been found in Fig. 2 that the first mode is a wall flexural motion accompanying with a large fluid velocity. Because both the bending rigidity and the flexural deformation of a tube wall are large, almost all the wave energy is transmitted through the tube. The third mode is with a axial motion of a tube accompanying with a negligible radial motion and a large flow velocity. Therefore, majority of the wave energy is also transmitted through the tube. However, the second mode is a large axial motion of a tube accompanying with small radial motion and very large flow velocity. It is well known that the flexural and axial motions of tube are neglected in the conventional Moens–Korteweg model for determining the Young

Fig. 5. Relation among the ratio h/R0, the percentage of the energy transmission through the tube ret and the wave frequency x. [m = 0.5, E = 1.6 MPa, Ro = 0.13 cm, qs = 1100 kg/m3, qf = 1056 kg/m3, l = 3.5  103 N  s/m2, p0 = 7466 Pa, cr1 = cx1 = 0].

Fig. 6. Influence of the axial elastic foundation constant cx1 on the transmission per wave length eki k for different modes [cr1 = 0, m = 0.5, E = 3 MPa, Ro = 0.23 cm, h = 0.03 cm, qz = 1100 kg/m3, qf = 1056 kg/m3, l = 3.5  103 N  s/m2, p0 = 10 kPa].

Please cite this article in press as: S.-M. Lin et al., Wave modes of a pre-stressed thick tube conveying blood on the viscoelastic foundation, Appl. Math. Modell. (2014), http://dx.doi.org/10.1016/j.apm.2014.06.002

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mode. According to this simplification, it is usually concluded that the Young mode represents the pressure wave propagation in the fluid and all the energy is transmitted through the liquid. It is not reasonable. In this study, Fig. 5 shows that about 50% of the wave energy is transmitted through the tube. Further, the effects of the elastic foundations on the mode shapes, the wave speed and the energy propagation are investigated here. Fig. 6 shows that if there is no the axial elastic foundation, i.e., cx1 ¼ 0, the transmissions per wave length of the first and second mode are smallest and largest, respectively. The effect of the axial elastic foundation constant cx1 on the transmissions of the first mode is negligible. However, if cx1 P 0:51, increasing the constant cx1 decreases significantly the transmission for the third mode. Moreover, the third transmission approaches to zero. In other word, the third mode disappears due to the increasing of the elastic foundation constant cx1 . Further, Fig. 7 demonstrates that if there is no the axial elastic foundation, i.e., cx1 ¼ 0, the energy transmission through the tube for the first, second and third modes are about 100%, 24% and

Fig. 7. Influence of the axial elastic foundation constant cx1 on the percentage of energy propagations through the tube ret for different modes with the same parameters as those given in Fig. 5.

Fig. 8. Influence of the axial elastic foundation constant cx1 on wave speeds cw for different modes with the same parameters as those given in Fig. 5.

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96%, respectively. The effect of the elastic foundation constant on the energy transmission ratio of the first mode is negligible. However, if 0:15 < cx1 < 0:4, the effect of the elastic foundation constant on the energy transmission ratio of the second and third modes is significant. Moreover, Fig. 8 shows that increasing the constant cx1 increases obviously the wave speed for the third mode. It is because the axial rigidity is increased. Fig. 9 shows that if the radial elastic foundation constant cr1 < 0:5, the effect of the constant on the transmission per wave length of the three modes is negligible. When 0:5 < cr1 < 0:63, the effect of the constant cr1 on the three transmissions becomes significant. Increasing the constant cr1 , the first transmission is abruptly decreased. if cr1 P 0:63, the first transmission approaches to zero. In other word, the first mode disappears. It is because for the first mode the radial displacement dominates. The radial displacement decreases with the radial foundation constant cr1 . When 0:5 < cr1 < 0:63, the

Fig. 9. Influence of the radial elastic foundation constant cr1 on the transmission per wave length eki k for different modes [cx1 = 0, m = 0.5, E = 3 MPa, Ro = 0.23 cm, h = 0.03 cm, qs = 1100 kg/m3, qf = 1056 kg/m3, l = 3.5  103 N  s/m2, p0 = 10 kPa].

Fig. 10. Influence of the radial elastic foundation constant cr1 on the percentage of energy propagations through the tube ret for different modes with the same parameters as those given in Fig. 8.

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transmission of the second modes decreases significantly with the constant cr1 . Further, when cr1 P 0:63, the transmission for the second mode is almost constant. The reverse phenomenon happens for the third mode. Further, Fig. 10 demonstrates that if there is no the radial elastic foundation, i.e., cr1 ¼ 0, the energy transmission through the tube for the first, second and third modes are about 100%, 24% and 96%, respectively. If 0:5 < cr1 < 0:63, the effect of the elastic foundation constant on the energy transmission ratio of the second and third modes is significant. The energy transmission ratio through the tube for the third mode will greatly decrease to zero at cr1 ¼ 0:63. However, if cr1 > 0:63 the energy transmission ratio of the second mode becomes from about 24% to 100%. Moreover, Fig. 11 shows that the constant cr1 is increased over the critical value of 0.63, the wave speed for the third mode is increased significantly. It is because the radial rigidity is increased. It is found in Fig. 6 that if the axial elastic foundation is infinite, i.e., cx1 ¼ 1, the axial displacement u is zero and the third mode disappears. There is no radial elastic foundation i.e., cr1 ¼ 0 in Figs. 6–8. Further, one investigates the effect of the

Fig. 11. Influence of the radial elastic foundation constant cr1 on wave speeds cw for different modes with the same parameters as those given in Fig. 8.

Fig. 12. Influence of the radial elastic foundation constant cr1 on the transmission per wave length eki k for different modes [cx1 = 1, m = 0.5, E = 3 MPa, Ro = 0.23 cm, h = 0.03 cm, qs = 1100 kg/m3, qf = 1056 kg/m3, l = 3.5  103 N  s/m2, p0 = 10 kPa].

Please cite this article in press as: S.-M. Lin et al., Wave modes of a pre-stressed thick tube conveying blood on the viscoelastic foundation, Appl. Math. Modell. (2014), http://dx.doi.org/10.1016/j.apm.2014.06.002

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radial elastic foundation constant on the wave propagation under cx1 ¼ 1. Fig. 12 shows that the effect of the constant on the transmission per wave length of the second mode is negligible. It is different to that in Fig. 9 without the axial elastic foundation, i.e., cx1 ¼ 0. Moreover, if the radial elastic foundation constant cr1 < 0:5, the effect of the constant on the transmission per wave length of the two modes is negligible. But when 0:5 < cr1 < 0:63, increasing the constant cr1 the first transmission is abruptly decreased and approaches to zero at cr1 P 0:63. In other word, the first mode disappears. Further, Fig. 13 demonstrates that if cx1 ¼ 1, the effect of the radial elastic foundation constant cr1 on the energy transmission ratio of the first two modes is negligible. Moreover, Fig. 14 shows that the constant cr1 is increased over the critical value of 0.6, the wave speed for the second mode is increased significantly. It is because the radial rigidity is increased. Fig. 15 demonstrates the effect of the longitudinal and radial damping constants {Cx, Cr} on the waves speed. It is found that the larger the longitudinal damping constant Cx is, the lower the waves speed of mode 3 is. However, its effect on those of modes 1 and 2 is negligible. It is because the longitudinal displacement of tube dominates in mode 3. Moreover, the effect

Fig. 13. Influence of the radial elastic foundation constant cr1 on the percentage of energy propagations through the tube ret for different modes with the same parameters as those given in Fig. 11.

Fig. 14. Influence of the radial elastic foundation constant cr1 on the wave speeds cw for different modes with the same parameters as those given in Fig. 11.

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Fig. 15. Influence of the longitudinal and radial damping constants {Cx, Cr} on the wave speeds cw for different modes with the same parameters as those given in Fig. 11.

Fig. 16. Influence of the longitudinal and radial damping constants {Cx, Cr} on the transmission per wave length eki k for different modes with the same parameters as those given in Fig. 11.

of the radial damping constant Cr on the wave speeds of the three modes is negligible. Further, Fig. 16 demonstrates the effect of the longitudinal and radial damping constants {Cx, Cr} on transmission. It is found that the larger the longitudinal damping constant Cx is, the lower the transmission of mode 3 is. However, its effect on those of modes 1 and 2 is negligible. Moreover, the effect of the radial damping constant Cr on the transmissions of the three modes is negligible.

6. Conclusion This paper presents a new model for simulation of wave propagation in an elastic thick tube conveying blood. The analytical solution for the system is derived. By using this new theory, the flexural, Young and Lamb modes can be obtained Please cite this article in press as: S.-M. Lin et al., Wave modes of a pre-stressed thick tube conveying blood on the viscoelastic foundation, Appl. Math. Modell. (2014), http://dx.doi.org/10.1016/j.apm.2014.06.002

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simultaneously. If the wave frequency is large enough, about {99.8%, 50%, 95%} of the energies of the first, second and third modes are transmitted through the tube. Moreover, the transmissions per wavelength of the three modes are about {0.1%, 20%, 85%}, respectively. Based the fact of transmission, the first wave mode will firstly disappear in short time. Secondly the second mode will disappear. Finally the third mode dominates. About 95% of the energy of the third mode through the artery tube is easily discovered. This conclusion is consistent to the experiment given by Milnor [1]. The larger the ratio h/R is, the more the difference between the wave speed in the present thick-walled tube theory and that in the thin-walled tube theory for the first and second modes but not for the third mode. Moreover, the effect of the viscoelastic foundation constants fcx1 ; cr1 ; C x g on the wave speed, the energy transmission through the tube ret and the transmission per wavelength eki k is significant. The main phenomena are revealed: (1) When 0:5 < cr1 < 0:63, increasing the constant cr1 the first transmission per unit wave length is abruptly decreased greatly. When the constant cr1 is increased to the critical value of 0.63, the flexural motion of artery tube (1st mode) disappears. (2) When 0:3 < cx1 < 0:51, increasing the constant cx1 the third transmission per unit wave length is abruptly decreased greatly. When the constant cx1 is increased to the critical value of 0.51, the longitudinal motion of artery tube (3rd mode) disappears. (3) If the elastic foundation constants are infinite, i.e., cr1 ¼ cx1 ¼ 1, the tube wall is fully tethered. Moreover, the first and third modes disappear. (4) The lower the waves speed and transmission of mode 3 are, the larger the longitudinal damping constant Cx. Because the flexural and longitudinal motions of artery tube are actually allowed, the dimensionless foundation constants fcr1 ; cx1 g should be less than f0:5; 0:3g, respectively. However, it is helpful for understanding the overall effect of foundation on the wave propagation of the piping system supported by any foundation. Acknowledgment The support of the National Science Council of Taiwan, ROC, is gratefully acknowledged (Grant number: Nsc99-2212E168-016). Appendix A. Relations among forces, moments, strain and curvatures of the thick-walled model The displacement fields are as following:

ux ¼ uðx; tÞ þ ðr  RÞbðx; tÞ;

uh ¼ 0;

ur ¼ wðx; tÞ:

ðA1Þ

It should be noted that the angle due to bending b is an independent variable. However, for the thin-walled model b ¼ @w=@x. Moreover, the rotary inertia and the shear deformation are not considered. The corresponding strains are [19]

ex ¼

@u @b þ ðr  RÞ ; @x @x

er ¼ 0; eh ¼

w ; r

cxh ¼ 0; crh ¼ 0; cxr ¼

@w : @x

ðA2Þ

The first subscript indicates the face. The second one indicates the direction. The corresponding stresses can be determined via the Hook’s law as following:

rx 3 2 c11 6 r 7 6c 6 h 7 6 12 7 6 6 6 rr 7 6 c12 7 6 6 6s 7 ¼ 6 0 6 xh 7 6 7 6 6 4 srh 5 4 0 2

sxr

c12 c11

c12 c12

c12 0

0

0 0

0 0

0 0

c11

0

0

0

0

ðc11  c12 Þ=2

0

0

32

ex 3

0

0

0

ðc11  c12 Þ=2

0

76 eh 7 76 7 76 7 76 er 7 76 7 76 c 7; 76 xh 7 76 7 54 crh 5

0

0

0

0

ðc11  c12 Þ=2

cxr

ðA3Þ

Eð1mÞ Em E where c11 ¼ ð12 mÞð1þmÞ, c12 ¼ ð12mÞð1þmÞ and ðc 11  c 12 Þ=2 ¼ 2ð1þmÞ ¼ G. Moreover, the relations among the forces, the

moments, the strain and the curvatures are [16]

ðNx ; Q x ; Nxh Þ ¼

Z

Ro

Ri

¼

Z

Ro

Ri

r ðrx ; sxr ; shx Þ dr; R

ðNh ; Nhx ; Q h Þ ¼

r ðrx ; sxr ; sxh Þ ðr  RÞdr; R

Mh ¼

Z

Z

Ro

ðrh ; shx ; shr Þdr;

ðMx ; M xr ; Mxh Þ

Ri Ro

rh zdz:

ðA4Þ

Ri

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References [1] W.R. Milnor, Hemodynamics, second ed., William & Wilkins, 1989. [2] S.M. Lin, S.Y. Lee, C.C. Tsai, C.W. Chen, W.R. Wang, J.F. Lee, Wave modes of an elastic tube conveying blood, CMES Comput. Model. Eng. Sci. 34 (1) (2008) 33–54. [3] D.J. Korteweg, Uber die Fortpflanzungsges-chwindigkeit des Schalles in elastischen Rohren. Ann. Phys. Chem. (NS) 5, 525. [4] W. Harvey, Movement of the Heart and Blood in Animals, William Fitzer, Frankurt, 1628. [5] S. Hales, Statical Essays: Containing Haemastaticks, 1733. [6] H. Demiray, Wave in initially stressed fluid-filled thick tubes, J. Biomech. 30 (3) (1997) 273–276. [7] A.P. Fishman, D.W. Richards, Circulation of the Blood. Men and Ideas, Oxford University Press, New York, 1964. [8] D.H. Bergel, The dynamic elastic properties of the arterial wall, J. Physiol. 156 (1961) 458–469. [9] W. Klip, P. Van Loon, D.A. Klip, Formulas for phase velocity and damping of axial waves in thick-walled viscous tubes, J. Appl. Phys. 38 (1968) 3745– 3755. [10] J.R. Womersley, Oscillatory motion of a viscous liquid in a thin-walled elastic tube. I. The linear approximation for long waves, Philos. Mag. 46 (1955) 199–221. [11] S. Tsangaris, D. Drikakis, Pulsating blood flow in an initially stressed, anisotropic elastic tube: linear approximation of pressure waves, Med. Biol. Eng. Comput. 27 (1) (1989) 82–88. [12] Y.Y.L. Wang, C.C. Chang, J.C. Chen, H. Hsiu, W.K. Wang, Pressure wave propagation in a distensible tube arterial model with radial dilation, IEEE Eng. Med. Biol. Mag. 16 (1997) 51–56. [13] Y.Y.L. Wang, W.C. Lia, H. Hsiu, M.Y. Jan, W.K. Wang, Effect of length on the fundamental resonance frequency of arterial models having radial dilatation, IEEE Trans. Biomed. Eng. 47 (3) (2000) 313–318. [14] S. Hodis, M. Zamir, Mechanical events within the arterial wall: the dynamic context for elastin fatigue, J. Biomech. 42 (2009) 1010–1016. [15] S. Hodis, M. Zamir, Mechanical events within the arterial wall under the forces of pulsatile flow: a review, J. Mech. Behavior Biomed. Mater. 4 (8) (2011) 1595–1602. [16] David N. Ku, Blood flow in arteries, Annu. Rev. Fluid Mech. 9 (1997) 399–434. [17] R.H. Cox, Wave propagation through a Newtonian fluid contained within a thick-walled viscoelastic tube: the influence of wall compressibility, Biophys. J. 3 (1970) 317–355. [18] I. Mirsky, Wave propagation in a viscous fluid contained in an orthotropic elastic tube, Biophys. J. 7 (1968) 165–186. [19] I. Mirsky, Vibrations of orthotropic, thick, cylindrical shells, J. Acoust. Soc. Am. 36 (1) (1964) 41–51.

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