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Global structure stability of impact-induced tensile waves in phase-transforming materials

Global structure stability of impact-induced tensile waves in phase-transforming materials
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摘要 The global structure stability of the impact-induced tensile waves mentioned by Huang (Huang, S. J. Impact-induced tensile waves in a kind of phase-transforming materials. IMA Journal of Applied Mathematics, 76, 847-858 (2011)) is considered. By introducing Riemann invariants, the governing equations of motion are reduced into a 2 ~ 2 diagonally strictly hyperbolic system. Then, with the aid of the theory on the typical free boundary problem and maximally dissipative kinetics, the global structure stability of the impact-induced tensile waves propagating in a phase-transforming material is proved. The global structure stability of the impact-induced tensile waves mentioned by Huang (Huang, S. J. Impact-induced tensile waves in a kind of phase-transforming materials. IMA Journal of Applied Mathematics, 76, 847-858 (2011)) is considered. By introducing Riemann invariants, the governing equations of motion are reduced into a 2 ~ 2 diagonally strictly hyperbolic system. Then, with the aid of the theory on the typical free boundary problem and maximally dissipative kinetics, the global structure stability of the impact-induced tensile waves propagating in a phase-transforming material is proved.
作者 黄守军 王静静
机构地区 Department of Mathematics
出处 《Applied Mathematics and Mechanics(English Edition)》 SCIE EI 2013年第9期1155-1166,共12页 应用数学和力学(英文版)
基金 supported by the National Natural Science Foundation of China(No.11101001) the Anhui Provincial University's Excellent Youth Scholars Foundation(No.2010SQRL025) the Anhui Provincial University's Natural Science Foundation(No.KJ2010A130)
关键词 global structure stability impact-induced tensile wave phase boundary shock wave rarefaction wave global structure stability, impact-induced tensile wave, phase boundary shock wave, rarefaction wave
分类号 O175.2 [理学—基础数学]
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参考文献12

  • 1Abeyaratne, R., Bhattacharya, K., and Knowles, J. K. Strain-energy functions with multiple local minima: modeling phase transformations using finite thermoelasticity. Nonlinear Elasticity: The- ory and Applications (eds. :, Y. B. and Ogden, R. W.), Cambridge University Press, Cambridge, 433-490 (2001).
  • 2Abeyaratne, R. and Knowles, J. K. Kinetic relations and the propagation of phase boundaries in solids. Archive for Rational Mechanics and Analysis, 114, 119-154 (1991).
  • 3Abeyaratne, R. and Knowles, J. K. Nucleation, kinetics and admissibility criteria for propagating phase boundaries. Shock Induced Transitions and Phase Structures in General Media (eds. Dunn, J. E., Fosdick, R., and Slemrod, M.), Springer, New York, 1-33 (1993).
  • 4Abeyaratne, R. and Knowles, J. K. On a shock-induced martensitic phase transition. Journal of Applied Physics, 87, 1123 1134 (2000).
  • 5Dai, H. H. Non-existence of one-dimensional stress problems in solid-solid phase transitions and uniqueness conditions for incompressible phase-transforming materials. Comptes Rendus de l'Acad:mie des Sciences, 338, 981-984 (2004).
  • 6Dai, H. H. and Kong, D. X. The propagation of impact-induced tensile waves in a kind of phase- transforming meterias. Journal of Computational and Applied Mathematics, 190, 57-73 (2006).
  • 7Dai, H. H. and Kong, D. X. Global structure stability of impact-induced tensile waves in a rub- berlike material. IMA Journal of Applied Mathematics, 71, 14-33 (2006).
  • 8Huang, S. J. Impact-induced tensile waves in a kind of phase-transforming materials. IMA Journal of Applied Mathematics, 76, 847-858 (2011).
  • 9Knowles, J. K. Impact-induced tensile waves in a rubberlike material. SIAM Journal on Applied Mathematics, 62, 1153 1175 (2002).
  • 10Kong, D. X. Global structure stability of Riemann solutions of quasilinear hyperbolic systems of conservation laws: shocks and contact discontinuities. Journal of Differential Equations, 188, 242-271 (2003).
Applied Mathematics and Mechanics(English Edition)
2013年 第9期

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