[1] Hertz, H. On the contact of elastic solids(in German). Journal für die Reine und Angewandte Mathematik, 92, 156-171(1881)
[2] Love, A. E. H. A Treatise on the Mathematical Theory of Elasticity, Cambridge University Press, London(1927)
[3] Galin, L. A. Contact Problems in the Classical Theory of Elasticity, Gostekhizdat, Gostekhizdat, Moscow/Leningrad(1953)
[4] Gladwell, G. M. L. Contact Problems in the Classical Elasticity Theory, Beijing Institute of Technology Press, Beijing(1991)
[5] Bagault, C., Nelias, D., and Baietto, M. C. Contact analyses for anisotropic halfspace:effect of the anisotropy on the pressure distribution and contact area. Journal of Tribology, 134, 1-8(2012)
[6] Bagault, C., Nelias, D., Baietto, M. C., and Ovaert, T. C. Contact analyses for an isotropic halfspace coated with an anisotropic layer:effect of the anisotropy on the pressure distribution and contact area. International Journal of Solids and Structures, 50, 43-54(2013)
[7] Mehmet, A. G. Closed-form solution of the two-dimensional sliding frictional contact problem for an orthotropic medium. International Journal of Mechnaical Sciences, 87, 72-88(2014)
[8] Alinia, Y., Guler, M. A., and Adibnazari, S. On the contact mechanics of a rolling cylinder on a graded coating, part 1:analytical formulation. Mechanics of Materials, 68, 207-216(2014)
[9] Chidlow, S. J., Chong, W. W. F., and Teodorescu, M. On the two-dimensional solution of both adhesive and non-adhesive contact problems involving functionally graded materials. European Journal of Mechanics, A:Solids, 39, 86-103(2013)
[10] Peric, D. and Owen, D. R. J. Computational model for 3D contact problems with friction based on the penalty method. International Journal for Numerical Methods in Engineering, 35, 1289-1309(1992)
[11] Shao, S. B., Gang, X. Y., Li, S., and Chai, S. A reduced quadratic programming method for elastic contact problems(in Chinese). Mechanics and Practice, 36, 604-610(2014)
[12] Yan, X. M., Guo, X. P., Sun, T. S., and Xu, K. J. The linear spread loci of SMS4(in Chinese). Journal of Qingdao University(Natural Science Edition), 27, 1-8(2014)
[13] Migorski, S. Hemivariational inequality for a frictional contact problem in elasto-piezoelectricity. Discrete and Continuous Dynamical Systems, Series B, 6, 1339-1356(2006)
[14] Liu, Z. and Migorski, S. Noncoercive damping in dynamic hemivariational inequality with application to problem of piezoelectricity. Discrete and Continuous Dynamical Systems, Series B, 9, 129-143(2008)
[15] Migorski, S., Ochal, A., and Sofonea, M. Weak solvability of a piezoelectric contact problem. European Journal of Applied Mathematics, 20, 145-167(2009)
[16] Migorski, S., Ochal, A., and Sofonea, M. A dynamic frictional contact problem for piezoelectric materials. Journal of Mathematical Analysis and Applications, 361, 161-176(2010)
[17] Mikae, B. and Mirceal, S. Solvability of a dynamic contact problem between a piezoelectric body and a conductive foundation. Applied Mathematics and Computation, 215, 2978-2991(2009)
[18] Matei, A. and Ciurcea, R. Weak solvability for a class of contact problems. Annals of the Academy of Romanian Scientists Series on Mathematics and Its Applications, 2, 25-44(2010)
[19] Shechtman, D., Blech, I., Gratias, D., and Cahn, J. W. Metallic phase with long-range orientational order and no translational symmetry. Physical Review Letters, 53, 1951-1953(1984)
[20] Fan, T. Y. Mathematical Theory of Elasticity of Quasicrystals and Its Applications, Science Press, Beijing(2010)
[21] Peng, Y. Z. and Fan, T. Y. Crack and indentation problems for one-dimensional hexagonal quasicrystals. The European Physical Journal B, 21, 39-44(2001)
[22] Guo, J. H., Jing, Y., and Riguleng, S. A semi-inverse method of a Griffith crack in one-dimensional hexagonal quasicrystals. Applied Mathematics and Computation, 219, 7445-7449(2013)
[23] Yang, L. Z., Gao, Y., Ernian, P., and Natalie, W. An exact solution for a multilayered twodimensional decagonal quasicrystal plate. International Journal of Solids and Structures, 51, 1737-1749(2014)
[24] Fan, T. Y. and Guo, L. H. The final governing equation and fundamental solution of plane elasticity of icosahedral quasicrystals. Physics Letters A, 341, 235-239(2005)
[25] Zhou, W. M. and Song, Y. H. Moving screw dislocation in cubic quasicrystal. Applied Mathematics and Mechanics(English Edition), 26(12), 1611-1614(2005) DOI 10.1007/BF03246270
[26] Li, L. H. and Fan, T. Y. Final governing equation of plane elasticity of icosahedral quasicrystals and general solution based on stress potential function. Chinese Physics Letters, 9, 2519-2521(2006)
[27] Li, L. H. and Fan, T. Y. Complex variable method for plane elasticity of icosahedral quasicrystals and elliptic notch problem. Science in China, Series G:Physics, Mechanics and Astronomy, 51, 773-780(2008)
[28] Azhazha, V. M., Borisova, S. S., Dub, S. N., Malykhin, S. V., Pugachov, A. T., Merisov, B. A., and Khadzhay, G. Y. Mechanical behavior of Ti-Zr-Ni quasicrystals during nanoindentayion. Physics of the Solid State, 47, 2262-2267(2005)
[29] Mukhopadhyay, N. K., Belger, A., and Paufler, R. Nanomechanical characterization of Al-Co-Ni decagonal quasicrystals. Philosophical Magazine, 86, 999-1005(2006)
[30] Peng, Y. Z. and Fan, T. Y. Crack and indentation problems for one-dimensional hexagonal quasicrystals. The European Physical Journal B, 21, 39-44(2001)
[31] Zhou, W. M. Contact problem in decagonal two-dimensional quasicrystal. Journal of Beijing Institute of Technology, 10, 51-55(2001)
[32] Yin, S. Y., Zhou, W. M., and Fan, T. Y. Contact problem in octagonal two-dimensional quasierystalline material(in Chinese). Chinese Quarterly of Mechanics, 23, 255-259(2002)
[33] Wu, Y. F. Indentation Analysis of Piezoelectric Materials and Quasicrystals(in Chinese), Ph. D. dissertation, Zhejiang University, Hangzhou, 97-148(2012)
[34] Gao, Y. and Ricoeur, A. Three-dimensional Green's function for two-dimensional quasicrystal bimaterials. Proceedings of the Royal Society of London, Series A:Mathematical and Physical, 467, 2622-2642(2011)
[35] Wang, X., Zhang, J. Q., and Guo, X. M. Two kinds of contact problems in decagonal quasicrystalline materials of point group 10 mm(in Chinese). ACTA Mechanica Sinica, 37, 169-174(2005)
[36] Zhou, W. M., Fan, T. Y., and Yin, S. Y. Axisymmetric contact problem of cubic quasicrystalline materials(in Chinese). Acta Mechanica Solidarity Sinica, 15, 68-74(2002)
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