- Email: [email protected]
First principle calculations of solid nitrobenzene under high pressure
Accepted Manuscript First principle calculations of solid nitrobenzene under high pressure Wen-Peng Wang, Fu-Sheng Liu, Qi-Jun Liu, Zheng-Tang Liu PII: DOI: Reference:
S2210-271X(15)00413-2 http://dx.doi.org/10.1016/j.comptc.2015.10.014 COMPTC 1961
To appear in:
Computational & Theoretical Chemistry
Received Date: Revised Date: Accepted Date:
31 July 2015 10 October 2015 13 October 2015
Please cite this article as: W-P. Wang, F-S. Liu, Q-J. Liu, Z-T. Liu, First principle calculations of solid nitrobenzene under high pressure, Computational & Theoretical Chemistry (2015), doi: http://dx.doi.org/10.1016/j.comptc. 2015.10.014
This is a PDF file of an unedited manuscript that has been accepted for publication. As a service to our customers we are providing this early version of the manuscript. The manuscript will undergo copyediting, typesetting, and review of the resulting proof before it is published in its final form. 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.
First principle calculations of solid nitrobenzene under high pressure Wen-Peng Wang a, b, Fu-Sheng Liu a, b, , Qi-Jun Liu a, b, Zheng-Tang Liu c a
School of Physical Science and Technology, Southwest Jiaotong University, Key
Laboratory of Advanced Technologies of Materials, Ministry of Education of China, Chengdu 610031, People’s Republic of China b
Sichuan Provincial Key Laboratory (for Universities) of High Pressure Science and
Technology, Southwest Jiaotong University, Chengdu 610031, People’s Republic of China c
State Key Laboratory of Solidification Processing, School of Materials Science and
Engineering, Northwestern Polytechnical University, Xi’an 710072, PR China
Corresponding author at : Institute of High Temperature and High Pressure Physics, Southwest Jiaotong University, Key Laboratory of Advanced Technologies of Materials, Ministry of Education, Chengdu 610031, PR China. Tel.: +86 02887601758. E-mail address: [email protected] 1
Abstract The dispersion corrected density functional theory (DFT-D) calculations were performed to study the structural and vibrational properties of solid nitrobenzene at ambient pressure. Assignments of the calculated vibrational modes were provided. Moreover, using the norm-conserving pseudopotential plus GGA-PBE function, the unit cell parameters, geometries and vibrational frequencies of nitrobenzene were examined under hydrostatic pressure from 0 to 10 GPa. The calculated pressure dependence of lattice parameters and volume were found to be close to the experimental results, but a distinct change in the bond lengths and bond angles was found around 7 GPa. According to the phonon calculations, the pressure-induced changes of the vibrational frequencies were also observed around 7 GPa. These calculated results all suggest a possible structural transformation in the crystalline nitrobenzene.
Key words: nitrobenzene, DFT, high pressure
1. Introduction Nitrobenzene (NB) is widely known as a prototype energetic material, it has the simplest structure of aromatic nitro compounds. Over the past few decades, many teams of researchers have studied its physical and chemical properties. In particular, the molecular structure has been widely investigated by microwave [1], gas-phase electron diffraction [2], and X-ray diffraction technique [3, 4] as well as some
2
theoretical efforts [5, 6]. Moreover, extensive studies of its decomposition mechanisms and processes [7-9] have been proposed. The structural properties of energetic materials are known to be pressure dependence, thus one should expect noticeable differences between the isolated molecules and condensed phase [10-15]. The crystalline structure of NB at zero pressure has been determined by Boese [3] and Trotter [4]. As shown in Figure 1, the structure of NB crystal is a monoclinic lattice with space group P21/c, which includes four molecules per unit cell. The dimer was formed through intermolecular hydrogen bonds C-H1…O2 [3,10]. Because of the limited of empirical studies, there was no more studies examined the crystal phase under high-pressure except Kozu [16]. The first principles calculation based on density functional theory (DFT) has become one of the most powerful tools to study energetic materials, and some accurate and interesting calculated results have been obtained [17-22]. Compared with the standard DFT, the DFT-D as parameterized by Grimme [23] provides significant improvements for describing intermolecular interactions in molecular crystals [24]. To the best of our knowledge, there are no theoretical reports available on solid NB. Thus, present work may expect to conduct and further get much more valuable information on NB through the DFT calculations.
2. Computational details DFT calculations were performed with Cambridge Sequential Total Energy Package (CASTEP) code [25, 26]. Pseudo atomic calculations were performed for
3
H1s1, C2s22p2, N2s22p3 and O2s22p4. The generalized gradient approximation (GGA) with the PBE parameterization [27] and plane-wave basis set with norm-conserving pseudopotentials [28] and energy cutoff of 830 eV was used. The empirical dispersion correction by Grimme [23] was used to take into account weak interactions. The Broyden, Fletcher, Goldfrab, and Shannon (BFGS) algorithm [29] was utilized to optimize the unit cell parameters and atomic coordinates, while constraining the space group of NB. Structural optimizations were achieved by setting the convergence criteria for maximum total energies of 5×10-6 eV/atom, maximum force of 0.01 eV/ Å,maximum stress of 0.02 GPa and maximum displacement of 5×10-4 Å. The Brillouin zone sampling was obtained using constant Monkhorst−Pack [30] grid of 4×1×1 points. As starting input for the calculations, we adopted the experimental crystal structure of solid NB [3], its cell parameters were a = 3.801 Å, b = 11.615 Å, c = 12.984 Å and V = 571.4 Å3. Following the full optimization of the lattice parameters at ambient pressure, we simulated the gradual loading of hydrostatic pressure up to 10 GPa. Crystalline vibrations were obtained by computing phonon frequencies at Gamma point using the finite displacement method [31].
3. Results and discussion 3.1 Crystal and molecular structure at ambient pressure The calculated structural parameters of solid NB compared with the experimental data [3, 4] are presented in Table 1. The results show that the optimized atomic coordinates are in good agreement with the experimental data. Also, the calculated
4
equilibrium lattice parameter c is overestimated by 0.79%; a and b are underestimated by 2.9% and 1.1% respectively. Moreover, our simulations predict that the unit cell volume is smaller than experimental results, namely the value of the V is underestimated by 4.6%. It may be a substantial thermal expansion of the crystal lattices at room temperature [21]. In contrast, the standard GGA calculations overestimate a, b, c and V by 34.3%, 1.8%, 7.8% and 44.9%, respectively; while LDA calculations underestimate by 4.6%, 3.8%, 3.9% and 11.6%, respectively, which confirmed that the DFT-D approach can correctly describe the solid NB at ambient pressure. The geometric parameters of NB molecule in the crystal at ambient pressure are listed in Table 2. The calculated bond lengths of C1-C2, C2-C3, and C3-C4 are found to be 1.396 Å, 1.389 Å and 1.396 Å respectively. Compared with the corrected experimental results, our calculated mean error is 0.16%. The bond lengths of C-N and N-O are 1.455 Å and 1.261 Å. Both the 6-31G and 6-31G* methods [5] underestimated the C-N bond compared with experimental values [3]. Moreover, the theoretical C-N-O and O-N-O bond angles are in good agreement with the experimental results. The calculated results indicated that DFT-D approach able to be used in describing the intramolecular geometry. 3.2 Vibrational properties at ambient pressure Vibrational spectroscopy is a valuable tool for probing molecular changes on the atomic or molecular level [9-11, 32]. Based on the optimized structures, we have calculated the vibrational modes of crystal NB using the finite displacement method
5
[31]. There are 56 atoms in the unit cell of solid NB. For space group P21/C, a group theoretical analysis classifies the vibrational modes into 42Au + 42Bu + 42Ag + 42Bg. They include internal and lattice vibrations, where Au and Bu are IR active, Ag and Bg are Raman active. The previous PBE-D work calculated the similar molecular crystal [33, 34], where the calculated vibrational modes were in good agreement with experiments. The computed vibrations and mode assignments of solid NB are listed in Table 3. For simplicity, we only present the internal vibrations of the Raman modes with frequency higher than 390 cm-1. Because of the lack of experimental data about solid NB, we only compare with previous liquid results [6]. The lower frequency modes, from 390 to 600 cm-1, correspond to the modes of the C-C-C out (in) of plane bending and NO2 bending. The modes of C-H out of plane bending are found around 670-970 cm-1. The vibrations between 1000 and 1300 cm-1 combine with C-H in of plane bending, C-C-C triangle bending and C-N stretching. The modes of NO2 stretching and ring stretching are located at the frequency range from 1350 to 1600 cm-1. In the high-frequency region, 3100-3150 cm-1 correspond to C-H stretch modes, which are higher than the liquid experimental results [6]. The difference is possibly associated with intermolecular interaction [35]. 3.3 High-Pressure Behavior of Solid NB. 3.3.1. The pressure effects on the lattice parameters. The pressure effects on the lattice parameters of the crystal NB are shown in Figure 2. The results are compared with previous X-ray diffraction data [16]. Overall, the trends of the calculated cell parameters with the increasing pressure are in
6
accordance with experiment. However, it is seen that a change of the lattice parameters occurs around 7 GPa. The compressibility along a-axis orientation is higher than that along the b and c orientations due to the vdW interactions between the layers. After comparing calculated results with experiments, we can conclude that the norm-conserving pseudopotentials method provide reasonable results. In Figure 3, we plot the unit cell volume as a function of pressure, together with previous experiments. It was shown that the volume decreases monotonically with pressure. The difference between theoretical and experimental volumes decreases from 4.6% at 0 GPa to 2.3% at 5 GPa. This result implies that the PBE-D simulation performed under high-pressure might be more reliable due to the enhanced intermolecular interaction [19]. According to the unit cell volume as a function of pressure for the NB, we fitted the bulk modulus B0 and its first pressure derivative B´ using the Murnaghan equation of state [36]. The fitted values of B0 and B´are found to be 10.4 GPa and 7.1, and the experimental [16] B0 and B´are found to be 9.2 GPa and 6.2. We also calculated the bulk modulus by the Voigt-Reuss-Hill approximations [37], the calculated value of B0 is 10.1 GPa. From these results, it indicates that the calculated bulk modulus is reasonable. 3.3.2. Vibrational properties under high-pressure To gain insight on the high-pressure behavior of solid NB, the phonon calculations were employed in this work. Here, the vibrational modes were implemented by the finite displacements approach [31]. Figure 4 shows the pressure-induced frequency shifts of selected internal modes as follows: a) C-H
7
bending (800~1000 cm-1), b) C-C-C triangle bending plus C-H bending(1000-1200 cm-1), c) NO2 stretching and its combination with ring stretching modes (~1400- 1600 cm-1) and d) C-H stretching modes (~3100-3150 cm-1). It is seen that the value of the blue shifted C-H stretching is about 60 cm-1 when the pressure goes up to 6 GPa, whereas in dynamic compressed experiments [38] the maximum value is about 45 cm-1. It is noticed that the temperature of the dynamic experiments is higher than that of static compression, leading to the difference under the same pressure conditions. Similarly to the previous experiments [39], the NO2 stretching showed smaller blue shifts than C-H stretching modes due to intermolecular interactions between the NB molecules. As seen in Figure 4d, the C-H vibrational modes display a red shift due to the strengthening of C-H…O hydrogen bonds [40-42]. Especially, the Raman shift trends with pressure of the C-H stretching, C-H bending, NO2 stretching and its combination with ring stretching modes have a distinct change around 7 GPa. 3.3.3 Pressure effects on the calculated geometries. A more detailed analysis of the effects of pressure on the geometries of NB highlighted some interesting pressure-induced structural changes. Figure 5 shows the effects of pressure on the calculated C-N, N-O, C-H bond lengths and O-N-C bond angles. Like previous studies of molecular crystals such as NM [19], TATB [40] and FOX-7 [41], the C-N bonds in NB crystal were more compressible to pressure, where the length decreased smoothly by 2.5% up to 10 GPa. Also, the N-O bond lengths decreased 0.17%. It is possible to know that the NO2 stretching showing smaller blue shift which corresponds to the slightly varied bond length. Although the C-H bond
8
lengths decreases with the pressure in Figure 5a, an obvious break appears at 7 GPa in the pressure dependence of C2-H1, C5-H4 and C6-H5 bonds. Moreover, there are also evident changes noted at 7 GPa in the pressure-induced variation of bond angles O-N-C. The significant changes in the lattice parameters, vibrational frequencies and geometries of the crystal NB provided evidence for a possible pressure-induced structural transformation. We expected that, with rising pressure, the hydrogen bonding and van der Waals interactions were enhanced [42]. And then, the structure could not afford the increased intermolecular interactions with further compression [43], which resulted in the nitro groups start to become distorted to keep a balance. Consequently, above 7 GPa, the reconstruction of the C-H…O hydrogen bonds may have contributed to the structural transformation [44].
4. Conclusion Density functional theory including the dispersion correction has been employed to investigate the structural properties of solid NB at ambient pressure. The Raman vibrations of NB were reproduced by the finite displacement method and the assignments of vibrational modes about internal molecular were provided. Also, the hydrostatic pressure effects on the vibrational frequencies, lattice parameters and geometries were discussed. The present calculations suggest a possible structural transformation around 7 GPa. This work demonstrates that the DFT-D calculated results are good complement to the experiments, thus helping to understand the
9
behavior of energetic molecular crystal NB under high pressure.
Acknowledgments We thank Dr. Ismail A. M. Harran for the linguistic assistance on this manuscript. This work was supported by the National Natural Science Foundation of China (Grant No. 11574254), the National Basic Research Program of China (Grant No. 2011CB808201), the Fundamental Research Fund for the Central Universities, China (Grant Nos. 2682014ZT30 and 2682014ZT31), and the fund of the State Key Laboratory of Solidification Processing in NWPU (Grant No. SKLSP201511).
References [1] N.W. Larsen, Internal rotation potential and relaxation of structure in nitrobenzene studied by microwave spectroscopy supported by quantum chemistry, J. Mol. Struct. 963 (2010) 100-105. [2] K.B. Borisenko, I. Hargittai, Barrier to internal rotation of the nitro group in ortho-nitrophenols from gas-phase electron diffraction, J. Mol. Struct. 382 (1996) 171-176. [3] R. Boese, D. Blaser, M. Nussbaumer, Low temperature crystal and molecular structure of nitrobenzene, Struct. Chem. 3 (1992) 363-368. [4] J. Trotter, The crystal structure of nitrobenzene at -30℃,Acta. Cryst. 12 (1959) 884-888. [5] A. Domenicano, G. Schultz, I. Hargittai, M. Colapietro, G. Portalone, P. George,
10
C.W. Bock, Molecular structure of nitrobenzene in the planar and orthogonal conformations, Struct. Chem. 1 (1990) 107-122. [6] J. Clarkson, W.E. Smith, A DFT analysis of the vibrational spectra of nitrobenzene, J. Mol. Struct. 655 (2003) 413-422. [7] C.J.M. Pruitt, D.J. Goebbert, The C–N dissociation energies of nitrobenzene and nitrotoluene radical anions and neutrals, Chem. Phys. Lett. 580 (2013) 21-27. [8] V. G. Matveev, Kinetics of radical reactions involved in the gas-phase thermal decomposition of nitrobenzene, Russian J. Phys. Chem. B. 4 (2010) 13-19. [9] B.C. Pein, Y.X. Sun, D.D. Dlott, Unidirectional vibrational energy flow in nitrobenzene, J. Phys. Chem. A. 117 (2013) 6066-6072. [10] F. Chen, H. Zhang, F. Zhao, Q.L. Li, J.Y. Qu, A first-principles investigation on the hydrogen bond interaction in DATB, J. Mol. Struc-Theochem. 864 (2008) 89-92. [11] J.M. Winey, Y.M. Gupta, Shock-induced chemical changes in neat nitromethane: Use of time-resolved Raman spectroscopy, J. Phys. Chem. B. 101 (1997) 10733-10743. [12] J. Chang, P. Lian, D.Q. Wei, X.R. Chen, Q.M. Zhang, Z.Z. Gong, Thermal decomposition of the solid phase of nitromethane: Ab initio molecular dynamics simulations, Phys. Rev. Lett. 105 (2010) 188302. [13] M. Citroni, R. Bini, M. Pagliai, G. Cardini, V. Schettino, Nitromethane decompostion under high static pressure, J. Phys. Chem. B. 114 (2010) 9420-9428. [14] G. Fayet, L. Joubert, P. Rotureau, C. Adamo, Theoretical study of the decomposition reaction in substituted nitrobenzenes, J. Phys. Chem. A. 112 (2008)
11
4054-4059. [15] M.R. Manaa, E.J. Reed, L.E. Fried, G. Galli, F. Gygi, Early chemistry in hot and dense nitromethane: Molecular dynamics simulations, J. Chem. Phys. 120 (2015) 10146-10153. [16] N. Kozu, M. Arai, M. Tamura, H. Fujihisha, K. Aoki, M. Yoshida, Shock and static compression of nitrobenzene, Jpn. J. Appl. Phys. 39 (2000) 4875-4880. [17] G.P. Khanal, R. Parajuli, E. Arunan, S. Yamabe, K. Hiraoka, E. Torikai, Study of structures, energies and vibrational frequencies of (O2)n+(n=2-5) clusters by GGA and meta-GGA density functional methods, Comput. Theor. Chem. 1056 (2015) 24-36. [18] W.P. Lai, P. Lian, T. Yun, H.B. Chang, Y.Q. Xue, Design and density functional theoretical study of three novel pyrazine-based high-energy density compounds, Comput. Theor. Chem. 963 (2011) 221-226. [19] H. Liu, J.J. Zhao, D.Q. Wei, Z.Z. Gong, Structural and vibrational properties of solid nitromethane under high pressure by density functional theory, J. Chem. Phys. 124 (2006) 124501. [20] M.W. Conroy, I.I. Oleynik, S.V. Zybin, C.T. White, Density functional theory calculations of solid nitromethane under hydrostatic and uniaxial compressions with empirical van der Waals correction, J. Phys. Chem. A. 113 (2009) 3610-3614. [21] Z.A. Dreger, Y. Tao, Y.M. Gupta, Polymorphs of 1,1-diamino-2,2-dinitroethene (FOX-7): Isothermal compression versus isobaric heating, Chem. Phys. Lett. 584 (2013) 83-87. [22] Q.J. Liu, W. Zeng, F.S. Liu, Z.T. Liu, First-principles study of hydronitrogen
12
compounds: Molecular crystalline NH4N3 and N2H5N3, Comput. Theor. Chem. 1014 (2013) 37-42. [23] S. Grimme, Semiempirical GGA-type density functional constructed with a long-rang dispersion correction. J. Comput. Chem. 27 (2006) 1787-1799. [24] S. Appalakondaiah, G. Vaitheeswaran, S. Lebegue, A DFT study structural, vibrational properties, and quasiparticle band structure of solid nitromethane, J. Chem. Phys. 138 (2013) 184705. [25] M.D. Segall, P.J.D. Lindan, M.J. Probert, C.J. Pickard, P.J. Hasnip, S.J. Clark, M.C. Payne, First-principles simulation: ideas, illustrations and the CASTEP code, J. Phys.: Condens. Matter 14 (2002) 2717–2714. [26] E.R. McNellis, J. Meyer, K. Reuter, Azobenzene at coinage metal surfaces: Role of dispersive van der Waals interactions, Phys. Rev. B. 80 (2009) 205414. [27] J.P. Perdew, K.Burke, M. Ernzerhof, Generalized gradient approximation made simple, Phys. Rev. Lett. 77 (1996) 3865-3868. [28] D.R. Hamann, M. Schluter, C. Chiang, Norm-conserving pseudopotentials, Phys. Rev. Lett. 43 (1979) 1494-1497. [29] T.H. Fischer, J. Almlof, General methods for geometry and wave function optimization, J. Phys. Chem. 96 (1992) 9768−9774. [30] H.J. Monkhorst, J.D. Pack, Special points for Brillouin-zone integrations. Phys. Rev. B. 13 (1976) 5188−5192. [31] K. Refson, S.J. Clark, P.R. Tulip, Variational density functional perturbation theory for dielectrics and lattice dynamics ,Phys. Rev. B 73 (2006) 155114.
13
[32] S.S. Stoyanov, D.Y. Ysncheva, B.A. Stamboliyska, DFT study on IR spectral and structural changes caused by the conversion of substituted benzophenones into ketyl radicals, Comput. Theor. Chem. 1046 (2014) 57-63. [33] S. Huter, T. Sutinen, S.F. Parker, C.A. Morrison, D.M. Williamson, S. Thompson, P.J. Gould, C.R. Pulham, Experimental and DFT-D studies of molecular organic energetic material RDX, J. Phys. Chem. C. 117 (2013) 8062-8071. [34] B.B. Averkiev, Z.A. Dreger, S. Chaudhuri, Density functional theory calculations of
pressure
effects
on
the
structure
and
vibrations
of
1,1-Diamino-2,2-dinitroethene(FOX-7), J. Phys. Chem. A, 118 (2014) 10002-10010. [35] H. Liu, J.J. Zhao, G.F. Ji, D.Q. Wei, Z.Z. Gong, Vibrational properties of molecular and crystal of TATB: A comparative density functional study, Phys. Lett. A. 358 (2006) 63-69. [36] F.D. Murnaghan, Finite deformations of an elastic solid, Am. J. Math. 59 (1937) 235-260. [37] R. Hill, The elastic behaviour of a crystalline aggregate, Proc. Phys. Soc. Section A, 65 (1952) 349-354. [38] T. Kobayashi, T. Sekine, In situ Raman spectroscopy of shock-compressed benzene and its derivatives, Phys. Rev. B. 62 (2000) 5281-5284. [39] N. Kozu, T. Kadono, R.I. Hiyoshi, J. Nakamura, M. Arai, M. Tamura, M. Yoshida, Raman spectroscopy of laser-shocked nitrobenzene, Prop. Exp. Pyro. 27 (2002) 336-339. [40] H. Liu, J.J. Zhao, J.G. Du, Z.Z. Gong, G.F. Ji, D.Q. Wei, High-pressure behavior
14
of TATB crystal by density functional theory, Phys. Lett. A. 367 (2007) 383-388. [41] J.J. Zhao, H. Liu, High-pressure behavior of crystalline FOX-7 by density functional theory calculations, Comp. Mat. Sci. 42 (2008) 698-703. [42] T.T. Yan, K. Wang, X. Tan, J. Liu, B.B. Liu, B. Zou, Exploration of hydrogen-bonded energetic material carbohydrazide at high pressures, J. Phys. Chem. C. 118 (2014) 22960-22967. [43] B.B. Sharma, C. Murli, S.M. Sharma, Hydrogen bonds and polymerization in acrylamide under pressure, J. Ram. Spec. 44 (2013) 785-790. [44] T.T. Yan, K. Wang, X. Tan, K. Yang, B.B. Liu, B. Zou, Pressure-induced phase transition in N-H…O hydrogen-bonded molecular crystal biurea: Combined Raman scattering and X-ray diffraction study, J. Phys. Chem. C. 118 (2014) 15162-15168.
15
Figure 1. (a) Molecule with labeled atoms to assist with the bonding designation. (b) Crystal structure of NB; dot lines show hydrogen bonds.
16
Figure 2. Pressure dependence of lattice parameters for NB. Square denote theoretical results, circle denote experimental results from ref 16.
17
Figure 3. Unit cell volume of NB as function of hydrostatic pressure, fitted with the Murnaghan equation of state. Square denote this work, circle denote experimental data from ref 16.
18
Figure 4. Pressure induced Raman shift of selected modes: (a) C-H bending modes, (b) C-C-C triangle bending plus C-H bending modes, (c) NO2 stretching and its combination with ring stretching modes, and (d) C-H stretching modes under pressure.
19
Figure 5. Pressure-induced changes in: (a) C-H bond lengths, (b) N-O bond lengths, (c) C-N bond lengths and (d) O-N-C bond angles of NB.
20
Table 1. Calculated and experimental unit cell parameters and atomic coordinates of solid NB at ambient pressure Experimenta Experimentb
LDA
GGA
GGA
CA-PZ
PBE
PBE-D
a(Å)
3.628
5.106
3.687
3.801
3.86
b(Å)
11.172
11.822
11.486
11.615
11.65
c(Å)
12.478
14.002
12.881
12.984
13.24
V(Å3)
505.125
828.097
544.92
571.4
592.9
β(deg)
93.05
101.59
92.68
94.98
95.58
Fractional coordinates of atoms (x, y, z) Experimenta
Theory O1 O2 N C1 C2 C3 C4 C5 C6 H1 H2 H3 H4 H5 a
(0.4795, (0.5574, (0.5922, (0.7768, (0.8873, (1.0643, (1.1264, (1.0096, (0.8318, (0.8303, (1.1557, (1.2665, (1.0557, (0.7346,
0.8896, 1.0093, 0.9121, 0.8191, 0.8414, 0.7534, 0.6454, 0.6244, 0.7113, 0.9251, 0.7689, 0.5775, 0.5399, 0.6959,
0.2184) 0.3503) 0.3089) 0.3697) 0.4731) 0.5300) 0.4838) 0.3806) 0.3224) 0.5081) 0.6104) 0.5291) 0.3452) 0.2426)
(0.4818, (0.5464, (0.5887, (0.7768, (0.8862, (1.0645, (1.1285, (1.0125, (0.8340, (0.8380, (1.1594, (1.2555, (1.0469, (0.7533,
0.8896, 1.0033, 0.9101, 0.8188, 0.8401, 0.7537, 0.6489, 0.6292, 0.7145, 0.9085, 0.7679, 0.5907, 0.5579, 0.7001,
0.2205) 0.3521) 0.3102) 0.3702) 0.4730) 0.5291) 0.4828) 0.3801) 0.3224) 0.5019) 0.6048) 0.5224) 0.3473) 0.2539)
ref 3 (results obtained at 103K). bref 4 (results obtained at 243K).
21
Table 2 Geometric parameters of NB molecule in the crystal at ambient pressurea Experiment[3]
Corrected
6-31G[5]
6-31G*[5]
values
a
This work
C1-C2
1.389
1.393
1.388
1.386
1.396
C2-C3
1.386
1.389
1.384
1.383
1.389
C3-C4
1.387
1.392
1.385
1.383
1.396
C-N
1.467
1.477
1.448
1.458
1.455
N-O
1.227
1.229
1.226
1.193
1.261
C-N-O
118.4
-
118.2
117.6
118.6
O-N-O
123.2
-
123.4
124.6
122.7
Bonds length in Å and angles in degrees.
22
Table 3. Calculated vibrational modes compared with results from previous experiment. Ag
Bg
Experiment[6]
Assignment
393
390
392
Ring in of plane bend+CN stretch
407
416
C-C-C out of plane bend
431
438
C-C-C out of plane bend
513
511
529
NO2 bend +C-H in of plane bend
607
604
671
672
679
676
611
C-C-C in of plane bend C-H out of plane bend
681
C-H out of plane bend+ NO2 wag
702
706
703
C-H out of plane bend +NO2 wag
792
797
793
C-H out of plane bend +NO2 wag
830
826
C-H out of plane bend
841
829
C-H out of plane bend +NO2 stretch
947
947
C-H out of plane bend
970
976
C-H out of plane bend
988
991
Ring breath
1005
1001
1003
C-C-C triangle bend
1009
1012
1021
C-H out of plane bend
1069
1073
1074
C-H in of plane bend
1075
1080
C-C-C triangle bend +C-N
23
stretch 1152
1150
C-H in of plane bend
1156
1162
1255
1271
NO2 stretch+ C-H bend
1292
1289
C-H in of plane bend
1352
1354
Ring stretch
1418
1420
NO2 Stretch +C-H in of
1162
C-H in of plane bend
plane bend 1453
1455
Ring stretch
1456
1467
NO2 stretch+ Ring stretch
1571
1570
Ring stretch
1585
1584
1588
Ring stretch
3113
3113
3049
C-H stretch
3127
3127
3130
3130
3143
3144
C-H stretch
3148
3148
C-H stretch
C-H stretch 3082
C-H stretch
24
Graphical abstract
25
Highlights * The structural properties of NB were investigated using the DFT calculations. * Assignments of the vibrational modes were provided. * Pressure effects on the geometries and unit cell parameters were examined. * The calculated Raman spectra indicated a structural transformation around 7 GPa.
26
S2210-271X(15)00413-2 http://dx.doi.org/10.1016/j.comptc.2015.10.014 COMPTC 1961
To appear in:
Computational & Theoretical Chemistry
Received Date: Revised Date: Accepted Date:
31 July 2015 10 October 2015 13 October 2015
Please cite this article as: W-P. Wang, F-S. Liu, Q-J. Liu, Z-T. Liu, First principle calculations of solid nitrobenzene under high pressure, Computational & Theoretical Chemistry (2015), doi: http://dx.doi.org/10.1016/j.comptc. 2015.10.014
This is a PDF file of an unedited manuscript that has been accepted for publication. As a service to our customers we are providing this early version of the manuscript. The manuscript will undergo copyediting, typesetting, and review of the resulting proof before it is published in its final form. 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.
First principle calculations of solid nitrobenzene under high pressure Wen-Peng Wang a, b, Fu-Sheng Liu a, b, , Qi-Jun Liu a, b, Zheng-Tang Liu c a
School of Physical Science and Technology, Southwest Jiaotong University, Key
Laboratory of Advanced Technologies of Materials, Ministry of Education of China, Chengdu 610031, People’s Republic of China b
Sichuan Provincial Key Laboratory (for Universities) of High Pressure Science and
Technology, Southwest Jiaotong University, Chengdu 610031, People’s Republic of China c
State Key Laboratory of Solidification Processing, School of Materials Science and
Engineering, Northwestern Polytechnical University, Xi’an 710072, PR China
Corresponding author at : Institute of High Temperature and High Pressure Physics, Southwest Jiaotong University, Key Laboratory of Advanced Technologies of Materials, Ministry of Education, Chengdu 610031, PR China. Tel.: +86 02887601758. E-mail address: [email protected] 1
Abstract The dispersion corrected density functional theory (DFT-D) calculations were performed to study the structural and vibrational properties of solid nitrobenzene at ambient pressure. Assignments of the calculated vibrational modes were provided. Moreover, using the norm-conserving pseudopotential plus GGA-PBE function, the unit cell parameters, geometries and vibrational frequencies of nitrobenzene were examined under hydrostatic pressure from 0 to 10 GPa. The calculated pressure dependence of lattice parameters and volume were found to be close to the experimental results, but a distinct change in the bond lengths and bond angles was found around 7 GPa. According to the phonon calculations, the pressure-induced changes of the vibrational frequencies were also observed around 7 GPa. These calculated results all suggest a possible structural transformation in the crystalline nitrobenzene.
Key words: nitrobenzene, DFT, high pressure
1. Introduction Nitrobenzene (NB) is widely known as a prototype energetic material, it has the simplest structure of aromatic nitro compounds. Over the past few decades, many teams of researchers have studied its physical and chemical properties. In particular, the molecular structure has been widely investigated by microwave [1], gas-phase electron diffraction [2], and X-ray diffraction technique [3, 4] as well as some
2
theoretical efforts [5, 6]. Moreover, extensive studies of its decomposition mechanisms and processes [7-9] have been proposed. The structural properties of energetic materials are known to be pressure dependence, thus one should expect noticeable differences between the isolated molecules and condensed phase [10-15]. The crystalline structure of NB at zero pressure has been determined by Boese [3] and Trotter [4]. As shown in Figure 1, the structure of NB crystal is a monoclinic lattice with space group P21/c, which includes four molecules per unit cell. The dimer was formed through intermolecular hydrogen bonds C-H1…O2 [3,10]. Because of the limited of empirical studies, there was no more studies examined the crystal phase under high-pressure except Kozu [16]. The first principles calculation based on density functional theory (DFT) has become one of the most powerful tools to study energetic materials, and some accurate and interesting calculated results have been obtained [17-22]. Compared with the standard DFT, the DFT-D as parameterized by Grimme [23] provides significant improvements for describing intermolecular interactions in molecular crystals [24]. To the best of our knowledge, there are no theoretical reports available on solid NB. Thus, present work may expect to conduct and further get much more valuable information on NB through the DFT calculations.
2. Computational details DFT calculations were performed with Cambridge Sequential Total Energy Package (CASTEP) code [25, 26]. Pseudo atomic calculations were performed for
3
H1s1, C2s22p2, N2s22p3 and O2s22p4. The generalized gradient approximation (GGA) with the PBE parameterization [27] and plane-wave basis set with norm-conserving pseudopotentials [28] and energy cutoff of 830 eV was used. The empirical dispersion correction by Grimme [23] was used to take into account weak interactions. The Broyden, Fletcher, Goldfrab, and Shannon (BFGS) algorithm [29] was utilized to optimize the unit cell parameters and atomic coordinates, while constraining the space group of NB. Structural optimizations were achieved by setting the convergence criteria for maximum total energies of 5×10-6 eV/atom, maximum force of 0.01 eV/ Å,maximum stress of 0.02 GPa and maximum displacement of 5×10-4 Å. The Brillouin zone sampling was obtained using constant Monkhorst−Pack [30] grid of 4×1×1 points. As starting input for the calculations, we adopted the experimental crystal structure of solid NB [3], its cell parameters were a = 3.801 Å, b = 11.615 Å, c = 12.984 Å and V = 571.4 Å3. Following the full optimization of the lattice parameters at ambient pressure, we simulated the gradual loading of hydrostatic pressure up to 10 GPa. Crystalline vibrations were obtained by computing phonon frequencies at Gamma point using the finite displacement method [31].
3. Results and discussion 3.1 Crystal and molecular structure at ambient pressure The calculated structural parameters of solid NB compared with the experimental data [3, 4] are presented in Table 1. The results show that the optimized atomic coordinates are in good agreement with the experimental data. Also, the calculated
4
equilibrium lattice parameter c is overestimated by 0.79%; a and b are underestimated by 2.9% and 1.1% respectively. Moreover, our simulations predict that the unit cell volume is smaller than experimental results, namely the value of the V is underestimated by 4.6%. It may be a substantial thermal expansion of the crystal lattices at room temperature [21]. In contrast, the standard GGA calculations overestimate a, b, c and V by 34.3%, 1.8%, 7.8% and 44.9%, respectively; while LDA calculations underestimate by 4.6%, 3.8%, 3.9% and 11.6%, respectively, which confirmed that the DFT-D approach can correctly describe the solid NB at ambient pressure. The geometric parameters of NB molecule in the crystal at ambient pressure are listed in Table 2. The calculated bond lengths of C1-C2, C2-C3, and C3-C4 are found to be 1.396 Å, 1.389 Å and 1.396 Å respectively. Compared with the corrected experimental results, our calculated mean error is 0.16%. The bond lengths of C-N and N-O are 1.455 Å and 1.261 Å. Both the 6-31G and 6-31G* methods [5] underestimated the C-N bond compared with experimental values [3]. Moreover, the theoretical C-N-O and O-N-O bond angles are in good agreement with the experimental results. The calculated results indicated that DFT-D approach able to be used in describing the intramolecular geometry. 3.2 Vibrational properties at ambient pressure Vibrational spectroscopy is a valuable tool for probing molecular changes on the atomic or molecular level [9-11, 32]. Based on the optimized structures, we have calculated the vibrational modes of crystal NB using the finite displacement method
5
[31]. There are 56 atoms in the unit cell of solid NB. For space group P21/C, a group theoretical analysis classifies the vibrational modes into 42Au + 42Bu + 42Ag + 42Bg. They include internal and lattice vibrations, where Au and Bu are IR active, Ag and Bg are Raman active. The previous PBE-D work calculated the similar molecular crystal [33, 34], where the calculated vibrational modes were in good agreement with experiments. The computed vibrations and mode assignments of solid NB are listed in Table 3. For simplicity, we only present the internal vibrations of the Raman modes with frequency higher than 390 cm-1. Because of the lack of experimental data about solid NB, we only compare with previous liquid results [6]. The lower frequency modes, from 390 to 600 cm-1, correspond to the modes of the C-C-C out (in) of plane bending and NO2 bending. The modes of C-H out of plane bending are found around 670-970 cm-1. The vibrations between 1000 and 1300 cm-1 combine with C-H in of plane bending, C-C-C triangle bending and C-N stretching. The modes of NO2 stretching and ring stretching are located at the frequency range from 1350 to 1600 cm-1. In the high-frequency region, 3100-3150 cm-1 correspond to C-H stretch modes, which are higher than the liquid experimental results [6]. The difference is possibly associated with intermolecular interaction [35]. 3.3 High-Pressure Behavior of Solid NB. 3.3.1. The pressure effects on the lattice parameters. The pressure effects on the lattice parameters of the crystal NB are shown in Figure 2. The results are compared with previous X-ray diffraction data [16]. Overall, the trends of the calculated cell parameters with the increasing pressure are in
6
accordance with experiment. However, it is seen that a change of the lattice parameters occurs around 7 GPa. The compressibility along a-axis orientation is higher than that along the b and c orientations due to the vdW interactions between the layers. After comparing calculated results with experiments, we can conclude that the norm-conserving pseudopotentials method provide reasonable results. In Figure 3, we plot the unit cell volume as a function of pressure, together with previous experiments. It was shown that the volume decreases monotonically with pressure. The difference between theoretical and experimental volumes decreases from 4.6% at 0 GPa to 2.3% at 5 GPa. This result implies that the PBE-D simulation performed under high-pressure might be more reliable due to the enhanced intermolecular interaction [19]. According to the unit cell volume as a function of pressure for the NB, we fitted the bulk modulus B0 and its first pressure derivative B´ using the Murnaghan equation of state [36]. The fitted values of B0 and B´are found to be 10.4 GPa and 7.1, and the experimental [16] B0 and B´are found to be 9.2 GPa and 6.2. We also calculated the bulk modulus by the Voigt-Reuss-Hill approximations [37], the calculated value of B0 is 10.1 GPa. From these results, it indicates that the calculated bulk modulus is reasonable. 3.3.2. Vibrational properties under high-pressure To gain insight on the high-pressure behavior of solid NB, the phonon calculations were employed in this work. Here, the vibrational modes were implemented by the finite displacements approach [31]. Figure 4 shows the pressure-induced frequency shifts of selected internal modes as follows: a) C-H
7
bending (800~1000 cm-1), b) C-C-C triangle bending plus C-H bending(1000-1200 cm-1), c) NO2 stretching and its combination with ring stretching modes (~1400- 1600 cm-1) and d) C-H stretching modes (~3100-3150 cm-1). It is seen that the value of the blue shifted C-H stretching is about 60 cm-1 when the pressure goes up to 6 GPa, whereas in dynamic compressed experiments [38] the maximum value is about 45 cm-1. It is noticed that the temperature of the dynamic experiments is higher than that of static compression, leading to the difference under the same pressure conditions. Similarly to the previous experiments [39], the NO2 stretching showed smaller blue shifts than C-H stretching modes due to intermolecular interactions between the NB molecules. As seen in Figure 4d, the C-H vibrational modes display a red shift due to the strengthening of C-H…O hydrogen bonds [40-42]. Especially, the Raman shift trends with pressure of the C-H stretching, C-H bending, NO2 stretching and its combination with ring stretching modes have a distinct change around 7 GPa. 3.3.3 Pressure effects on the calculated geometries. A more detailed analysis of the effects of pressure on the geometries of NB highlighted some interesting pressure-induced structural changes. Figure 5 shows the effects of pressure on the calculated C-N, N-O, C-H bond lengths and O-N-C bond angles. Like previous studies of molecular crystals such as NM [19], TATB [40] and FOX-7 [41], the C-N bonds in NB crystal were more compressible to pressure, where the length decreased smoothly by 2.5% up to 10 GPa. Also, the N-O bond lengths decreased 0.17%. It is possible to know that the NO2 stretching showing smaller blue shift which corresponds to the slightly varied bond length. Although the C-H bond
8
lengths decreases with the pressure in Figure 5a, an obvious break appears at 7 GPa in the pressure dependence of C2-H1, C5-H4 and C6-H5 bonds. Moreover, there are also evident changes noted at 7 GPa in the pressure-induced variation of bond angles O-N-C. The significant changes in the lattice parameters, vibrational frequencies and geometries of the crystal NB provided evidence for a possible pressure-induced structural transformation. We expected that, with rising pressure, the hydrogen bonding and van der Waals interactions were enhanced [42]. And then, the structure could not afford the increased intermolecular interactions with further compression [43], which resulted in the nitro groups start to become distorted to keep a balance. Consequently, above 7 GPa, the reconstruction of the C-H…O hydrogen bonds may have contributed to the structural transformation [44].
4. Conclusion Density functional theory including the dispersion correction has been employed to investigate the structural properties of solid NB at ambient pressure. The Raman vibrations of NB were reproduced by the finite displacement method and the assignments of vibrational modes about internal molecular were provided. Also, the hydrostatic pressure effects on the vibrational frequencies, lattice parameters and geometries were discussed. The present calculations suggest a possible structural transformation around 7 GPa. This work demonstrates that the DFT-D calculated results are good complement to the experiments, thus helping to understand the
9
behavior of energetic molecular crystal NB under high pressure.
Acknowledgments We thank Dr. Ismail A. M. Harran for the linguistic assistance on this manuscript. This work was supported by the National Natural Science Foundation of China (Grant No. 11574254), the National Basic Research Program of China (Grant No. 2011CB808201), the Fundamental Research Fund for the Central Universities, China (Grant Nos. 2682014ZT30 and 2682014ZT31), and the fund of the State Key Laboratory of Solidification Processing in NWPU (Grant No. SKLSP201511).
References [1] N.W. Larsen, Internal rotation potential and relaxation of structure in nitrobenzene studied by microwave spectroscopy supported by quantum chemistry, J. Mol. Struct. 963 (2010) 100-105. [2] K.B. Borisenko, I. Hargittai, Barrier to internal rotation of the nitro group in ortho-nitrophenols from gas-phase electron diffraction, J. Mol. Struct. 382 (1996) 171-176. [3] R. Boese, D. Blaser, M. Nussbaumer, Low temperature crystal and molecular structure of nitrobenzene, Struct. Chem. 3 (1992) 363-368. [4] J. Trotter, The crystal structure of nitrobenzene at -30℃,Acta. Cryst. 12 (1959) 884-888. [5] A. Domenicano, G. Schultz, I. Hargittai, M. Colapietro, G. Portalone, P. George,
10
C.W. Bock, Molecular structure of nitrobenzene in the planar and orthogonal conformations, Struct. Chem. 1 (1990) 107-122. [6] J. Clarkson, W.E. Smith, A DFT analysis of the vibrational spectra of nitrobenzene, J. Mol. Struct. 655 (2003) 413-422. [7] C.J.M. Pruitt, D.J. Goebbert, The C–N dissociation energies of nitrobenzene and nitrotoluene radical anions and neutrals, Chem. Phys. Lett. 580 (2013) 21-27. [8] V. G. Matveev, Kinetics of radical reactions involved in the gas-phase thermal decomposition of nitrobenzene, Russian J. Phys. Chem. B. 4 (2010) 13-19. [9] B.C. Pein, Y.X. Sun, D.D. Dlott, Unidirectional vibrational energy flow in nitrobenzene, J. Phys. Chem. A. 117 (2013) 6066-6072. [10] F. Chen, H. Zhang, F. Zhao, Q.L. Li, J.Y. Qu, A first-principles investigation on the hydrogen bond interaction in DATB, J. Mol. Struc-Theochem. 864 (2008) 89-92. [11] J.M. Winey, Y.M. Gupta, Shock-induced chemical changes in neat nitromethane: Use of time-resolved Raman spectroscopy, J. Phys. Chem. B. 101 (1997) 10733-10743. [12] J. Chang, P. Lian, D.Q. Wei, X.R. Chen, Q.M. Zhang, Z.Z. Gong, Thermal decomposition of the solid phase of nitromethane: Ab initio molecular dynamics simulations, Phys. Rev. Lett. 105 (2010) 188302. [13] M. Citroni, R. Bini, M. Pagliai, G. Cardini, V. Schettino, Nitromethane decompostion under high static pressure, J. Phys. Chem. B. 114 (2010) 9420-9428. [14] G. Fayet, L. Joubert, P. Rotureau, C. Adamo, Theoretical study of the decomposition reaction in substituted nitrobenzenes, J. Phys. Chem. A. 112 (2008)
11
4054-4059. [15] M.R. Manaa, E.J. Reed, L.E. Fried, G. Galli, F. Gygi, Early chemistry in hot and dense nitromethane: Molecular dynamics simulations, J. Chem. Phys. 120 (2015) 10146-10153. [16] N. Kozu, M. Arai, M. Tamura, H. Fujihisha, K. Aoki, M. Yoshida, Shock and static compression of nitrobenzene, Jpn. J. Appl. Phys. 39 (2000) 4875-4880. [17] G.P. Khanal, R. Parajuli, E. Arunan, S. Yamabe, K. Hiraoka, E. Torikai, Study of structures, energies and vibrational frequencies of (O2)n+(n=2-5) clusters by GGA and meta-GGA density functional methods, Comput. Theor. Chem. 1056 (2015) 24-36. [18] W.P. Lai, P. Lian, T. Yun, H.B. Chang, Y.Q. Xue, Design and density functional theoretical study of three novel pyrazine-based high-energy density compounds, Comput. Theor. Chem. 963 (2011) 221-226. [19] H. Liu, J.J. Zhao, D.Q. Wei, Z.Z. Gong, Structural and vibrational properties of solid nitromethane under high pressure by density functional theory, J. Chem. Phys. 124 (2006) 124501. [20] M.W. Conroy, I.I. Oleynik, S.V. Zybin, C.T. White, Density functional theory calculations of solid nitromethane under hydrostatic and uniaxial compressions with empirical van der Waals correction, J. Phys. Chem. A. 113 (2009) 3610-3614. [21] Z.A. Dreger, Y. Tao, Y.M. Gupta, Polymorphs of 1,1-diamino-2,2-dinitroethene (FOX-7): Isothermal compression versus isobaric heating, Chem. Phys. Lett. 584 (2013) 83-87. [22] Q.J. Liu, W. Zeng, F.S. Liu, Z.T. Liu, First-principles study of hydronitrogen
12
compounds: Molecular crystalline NH4N3 and N2H5N3, Comput. Theor. Chem. 1014 (2013) 37-42. [23] S. Grimme, Semiempirical GGA-type density functional constructed with a long-rang dispersion correction. J. Comput. Chem. 27 (2006) 1787-1799. [24] S. Appalakondaiah, G. Vaitheeswaran, S. Lebegue, A DFT study structural, vibrational properties, and quasiparticle band structure of solid nitromethane, J. Chem. Phys. 138 (2013) 184705. [25] M.D. Segall, P.J.D. Lindan, M.J. Probert, C.J. Pickard, P.J. Hasnip, S.J. Clark, M.C. Payne, First-principles simulation: ideas, illustrations and the CASTEP code, J. Phys.: Condens. Matter 14 (2002) 2717–2714. [26] E.R. McNellis, J. Meyer, K. Reuter, Azobenzene at coinage metal surfaces: Role of dispersive van der Waals interactions, Phys. Rev. B. 80 (2009) 205414. [27] J.P. Perdew, K.Burke, M. Ernzerhof, Generalized gradient approximation made simple, Phys. Rev. Lett. 77 (1996) 3865-3868. [28] D.R. Hamann, M. Schluter, C. Chiang, Norm-conserving pseudopotentials, Phys. Rev. Lett. 43 (1979) 1494-1497. [29] T.H. Fischer, J. Almlof, General methods for geometry and wave function optimization, J. Phys. Chem. 96 (1992) 9768−9774. [30] H.J. Monkhorst, J.D. Pack, Special points for Brillouin-zone integrations. Phys. Rev. B. 13 (1976) 5188−5192. [31] K. Refson, S.J. Clark, P.R. Tulip, Variational density functional perturbation theory for dielectrics and lattice dynamics ,Phys. Rev. B 73 (2006) 155114.
13
[32] S.S. Stoyanov, D.Y. Ysncheva, B.A. Stamboliyska, DFT study on IR spectral and structural changes caused by the conversion of substituted benzophenones into ketyl radicals, Comput. Theor. Chem. 1046 (2014) 57-63. [33] S. Huter, T. Sutinen, S.F. Parker, C.A. Morrison, D.M. Williamson, S. Thompson, P.J. Gould, C.R. Pulham, Experimental and DFT-D studies of molecular organic energetic material RDX, J. Phys. Chem. C. 117 (2013) 8062-8071. [34] B.B. Averkiev, Z.A. Dreger, S. Chaudhuri, Density functional theory calculations of
pressure
effects
on
the
structure
and
vibrations
of
1,1-Diamino-2,2-dinitroethene(FOX-7), J. Phys. Chem. A, 118 (2014) 10002-10010. [35] H. Liu, J.J. Zhao, G.F. Ji, D.Q. Wei, Z.Z. Gong, Vibrational properties of molecular and crystal of TATB: A comparative density functional study, Phys. Lett. A. 358 (2006) 63-69. [36] F.D. Murnaghan, Finite deformations of an elastic solid, Am. J. Math. 59 (1937) 235-260. [37] R. Hill, The elastic behaviour of a crystalline aggregate, Proc. Phys. Soc. Section A, 65 (1952) 349-354. [38] T. Kobayashi, T. Sekine, In situ Raman spectroscopy of shock-compressed benzene and its derivatives, Phys. Rev. B. 62 (2000) 5281-5284. [39] N. Kozu, T. Kadono, R.I. Hiyoshi, J. Nakamura, M. Arai, M. Tamura, M. Yoshida, Raman spectroscopy of laser-shocked nitrobenzene, Prop. Exp. Pyro. 27 (2002) 336-339. [40] H. Liu, J.J. Zhao, J.G. Du, Z.Z. Gong, G.F. Ji, D.Q. Wei, High-pressure behavior
14
of TATB crystal by density functional theory, Phys. Lett. A. 367 (2007) 383-388. [41] J.J. Zhao, H. Liu, High-pressure behavior of crystalline FOX-7 by density functional theory calculations, Comp. Mat. Sci. 42 (2008) 698-703. [42] T.T. Yan, K. Wang, X. Tan, J. Liu, B.B. Liu, B. Zou, Exploration of hydrogen-bonded energetic material carbohydrazide at high pressures, J. Phys. Chem. C. 118 (2014) 22960-22967. [43] B.B. Sharma, C. Murli, S.M. Sharma, Hydrogen bonds and polymerization in acrylamide under pressure, J. Ram. Spec. 44 (2013) 785-790. [44] T.T. Yan, K. Wang, X. Tan, K. Yang, B.B. Liu, B. Zou, Pressure-induced phase transition in N-H…O hydrogen-bonded molecular crystal biurea: Combined Raman scattering and X-ray diffraction study, J. Phys. Chem. C. 118 (2014) 15162-15168.
15
Figure 1. (a) Molecule with labeled atoms to assist with the bonding designation. (b) Crystal structure of NB; dot lines show hydrogen bonds.
16
Figure 2. Pressure dependence of lattice parameters for NB. Square denote theoretical results, circle denote experimental results from ref 16.
17
Figure 3. Unit cell volume of NB as function of hydrostatic pressure, fitted with the Murnaghan equation of state. Square denote this work, circle denote experimental data from ref 16.
18
Figure 4. Pressure induced Raman shift of selected modes: (a) C-H bending modes, (b) C-C-C triangle bending plus C-H bending modes, (c) NO2 stretching and its combination with ring stretching modes, and (d) C-H stretching modes under pressure.
19
Figure 5. Pressure-induced changes in: (a) C-H bond lengths, (b) N-O bond lengths, (c) C-N bond lengths and (d) O-N-C bond angles of NB.
20
Table 1. Calculated and experimental unit cell parameters and atomic coordinates of solid NB at ambient pressure Experimenta Experimentb
LDA
GGA
GGA
CA-PZ
PBE
PBE-D
a(Å)
3.628
5.106
3.687
3.801
3.86
b(Å)
11.172
11.822
11.486
11.615
11.65
c(Å)
12.478
14.002
12.881
12.984
13.24
V(Å3)
505.125
828.097
544.92
571.4
592.9
β(deg)
93.05
101.59
92.68
94.98
95.58
Fractional coordinates of atoms (x, y, z) Experimenta
Theory O1 O2 N C1 C2 C3 C4 C5 C6 H1 H2 H3 H4 H5 a
(0.4795, (0.5574, (0.5922, (0.7768, (0.8873, (1.0643, (1.1264, (1.0096, (0.8318, (0.8303, (1.1557, (1.2665, (1.0557, (0.7346,
0.8896, 1.0093, 0.9121, 0.8191, 0.8414, 0.7534, 0.6454, 0.6244, 0.7113, 0.9251, 0.7689, 0.5775, 0.5399, 0.6959,
0.2184) 0.3503) 0.3089) 0.3697) 0.4731) 0.5300) 0.4838) 0.3806) 0.3224) 0.5081) 0.6104) 0.5291) 0.3452) 0.2426)
(0.4818, (0.5464, (0.5887, (0.7768, (0.8862, (1.0645, (1.1285, (1.0125, (0.8340, (0.8380, (1.1594, (1.2555, (1.0469, (0.7533,
0.8896, 1.0033, 0.9101, 0.8188, 0.8401, 0.7537, 0.6489, 0.6292, 0.7145, 0.9085, 0.7679, 0.5907, 0.5579, 0.7001,
0.2205) 0.3521) 0.3102) 0.3702) 0.4730) 0.5291) 0.4828) 0.3801) 0.3224) 0.5019) 0.6048) 0.5224) 0.3473) 0.2539)
ref 3 (results obtained at 103K). bref 4 (results obtained at 243K).
21
Table 2 Geometric parameters of NB molecule in the crystal at ambient pressurea Experiment[3]
Corrected
6-31G[5]
6-31G*[5]
values
a
This work
C1-C2
1.389
1.393
1.388
1.386
1.396
C2-C3
1.386
1.389
1.384
1.383
1.389
C3-C4
1.387
1.392
1.385
1.383
1.396
C-N
1.467
1.477
1.448
1.458
1.455
N-O
1.227
1.229
1.226
1.193
1.261
C-N-O
118.4
-
118.2
117.6
118.6
O-N-O
123.2
-
123.4
124.6
122.7
Bonds length in Å and angles in degrees.
22
Table 3. Calculated vibrational modes compared with results from previous experiment. Ag
Bg
Experiment[6]
Assignment
393
390
392
Ring in of plane bend+CN stretch
407
416
C-C-C out of plane bend
431
438
C-C-C out of plane bend
513
511
529
NO2 bend +C-H in of plane bend
607
604
671
672
679
676
611
C-C-C in of plane bend C-H out of plane bend
681
C-H out of plane bend+ NO2 wag
702
706
703
C-H out of plane bend +NO2 wag
792
797
793
C-H out of plane bend +NO2 wag
830
826
C-H out of plane bend
841
829
C-H out of plane bend +NO2 stretch
947
947
C-H out of plane bend
970
976
C-H out of plane bend
988
991
Ring breath
1005
1001
1003
C-C-C triangle bend
1009
1012
1021
C-H out of plane bend
1069
1073
1074
C-H in of plane bend
1075
1080
C-C-C triangle bend +C-N
23
stretch 1152
1150
C-H in of plane bend
1156
1162
1255
1271
NO2 stretch+ C-H bend
1292
1289
C-H in of plane bend
1352
1354
Ring stretch
1418
1420
NO2 Stretch +C-H in of
1162
C-H in of plane bend
plane bend 1453
1455
Ring stretch
1456
1467
NO2 stretch+ Ring stretch
1571
1570
Ring stretch
1585
1584
1588
Ring stretch
3113
3113
3049
C-H stretch
3127
3127
3130
3130
3143
3144
C-H stretch
3148
3148
C-H stretch
C-H stretch 3082
C-H stretch
24
Graphical abstract
25
Highlights * The structural properties of NB were investigated using the DFT calculations. * Assignments of the vibrational modes were provided. * Pressure effects on the geometries and unit cell parameters were examined. * The calculated Raman spectra indicated a structural transformation around 7 GPa.
26