Xiang MU, Xiaoyu FU, Liangliang ZHANG, Zhaowei ZHU, Jinming ZHANG, Yang GAO . Fundamental solutions of critical wedge angles for one-dimensional piezoelectric quasicrystal wedge[J]. Applied Mathematics and Mechanics, 2022 , 43(5) : 709 -728 . DOI: 10.1007/s10483-022-2847-6

[1] LEVINE, D. and STEINHARDT, P. J. Quasicrystals:a new class of ordered structures. Physical Review Letters, 53, 2477-2480(1984)
[2] HARGITTAI, I. Structures beyond crystals. Journal of Molecular Structure, 976, 81-86(2010)
[3] YE, H. Q., WANG, D. N., and KUO, K. H. Fivefold symmetry in real andreciprocal spaces. Ultramicroscopy, 17, 184-184(1985)
[4] ZHANG, Z., YE, H. Q., and KUO, K. H. A new icosahedral phase with m35 symmetry. Philosophical Magazine A, 52, L49-L52(1985)
[5] SHECHTMAN, D. G., BLECH, I. A., GRATIAS, D., and CAHN, J. W. Metallic phase with longrange orientational order and no translational symmetry. Physical Review Letters, 53, 1951-1953(1984)
[6] JARIC, M. V. and NELSON, D. R. Introduction to quasicrystals. Physics Today, 43, 77-79(1990)
[7] STADNIK, Z. M. Physical Properties of Quasicrystals, Springer, Berlin, Heidelberg (1999)
[8] BIGGS, B. D., LI, Y., and POON, S. J. Electronic properties of icosahedral, approximant, and amorphous phases of an Al-Cu-Fe alloy. Physical Review B, 43, 8747-8750(1991)
[9] PIERCE, F. S., GUO, Q., and POON, S. J. Enhanced insulator like electron transport behavior of thermally tuned quasicrystalline states of Al-Pd-Re alloys. Physical Review Letters, 73, 2220-2223(1994)
[10] LINDQVIST, P., BERGER, C., KLEIN, T., LANCO, P., and CALVAYRAC, Y. Role of Fe and sign reversal of the hall coe-cient in quasicrystalline Al-Cu-Fe. Physical Review B, 48, 630-633(1993)
[11] JARIC, M. V. and NELSON, D. R. Introduction to quasicrystals. Physics Today, 43, 77-79(1990)
[12] ZHAO, X. F. and LI, X. Scattering of SH wave by a linear symmetric crack at one-dimensional piezoelectric hexagonal quasicrystals. Chinese Journal of Computational Mechanics, 33, 369-376(2016)
[13] JIANG, L. J. and LIU, G. T. Anti-plane analytic solutions of problem about a parabolic crack in piezoelectricity of one-dimensional hexagonal quasicrystals. Journal of Inner Mongolia Normal University, 46, 161-165(2017)
[14] HUANG, Y. Z., YANG, L. Z., ZHANG, L. L., and GAO, Y. Dynamic analysis of a multilayered piezoelectric two-dimensional quasicrystal cylindrical shell filled with compressible fluid using the state-space approach. Acta Mechanica, 231, 1-18(2020)
[15] ZHOU, Y. B., LIU, G. T., and LI, L. H. Effect of T-stress on the fracture in an infinite one-dimensional hexagonal piezoelectric quasicrystal with a Gri-th crack. European Journal of Mechanics-A=Solids, 86, 104184(2021)
[16] LI, L. H. and LIU, G. T. Study on a straight dislocation in an icosahedral quasicrystal with piezoelectric effects. Applied Mathematics and Mechanics (English Edition), 39(9), 1259-1266(2018) https://doi.org/10.1007/s10483-018-2363-9
[17] LI, Y., YANG, L. Z., ZHANG, L. L., and GAO, Y. Nonlocal free and forced vibration of multilayered two-dimensional quasicrystal nanoplates. Mechanics of Advanced Materials&Structures, 28, 1216-1226(2021)
[18] TIMOSHENKO, S. P. and GOODIER, J. N. Theory of Elasticity, McGraw-Hill, New York (1970)
[19] TING, T. C. T. The critical angle of the anisotropic elastic wedge subject to uniform tractions. Journal of Elasticity, 20, 113-130(1988)
[20] TING, T. C. T. The anisotropic elastic wedge under a concentrated couple. Quarterly Journal of Mechanics and Applied Mathematics, 41, 563-578(1988)
[21] HWU, C. B. and TING, T. C. T. Solutions for the anisotropic elastic wedge at critical wedge angles. Journal of Elasticity, 24, 1-20(1990)
[22] CHUE, C. H., WEI, W. B., and LIU, J. C. The antiplane electro-mechanical field of a piezoelectric wedge under a pair of concentrated forces and free charges. Journal of the Chinese Institute of Engineers, 26, 575-583(2003)
[23] TING, T. C. T. Symmetric representation of stress and strain in the Stroh formalism and physical meaning of the tensors L, S, L (θ) and S (θ). Journal of Elasticity, 50, 91-96(1998)
[24] CHUNG, M. Y. and TING, T. C. T. Line force, charge and dislocation in anisotropic piezoelectric composite wedges and spaces. Journal of Applied Mechanics, 62, 423-428(1995)
[25] TANUMA, K. Stroh formalism and rayleigh waves. Journal of Elasticity, 89, 5-154(2007)
[26] ZHANG, L. L., WU, D., XU, W. S., YANG, L. Z., and RICOEUR, A. Green's functions of onedimensional quasicrystal bi-material with piezoelectric effect. Physics Letters A, 380, 3222-3228(2016)
[27] TING, T. C. T. Anisotropic Elasticity:Theory and Applications, Oxford University, Oxford (1996)
[28] HWU, C. Anisotropic Elastic Plates, Springer, New York (2010)
[29] HUANG, Y. Z., LI, Y., YANG, L. Z., and GAO, Y. Static response of functionally graded multilayered one-dimensional hexagonal piezoelectric quasicrystal plates using the state vector approach. Journal of Zhejiang University-Science A, 20, 133-147(2019)
[30] LEE, J. S. and JIANG, L. Z. Exact electroelastic analysis of piezoelectric laminae via state space approach. International Journal of SolidsStructures, 33, 977-990(1996)
[31] WU, D., YANG, L. Z., ZHANG, L. L., and GAO, Y. Electroelastic Green's function of onedimensional piezoelectric quasicrystals subjected to multi-physics loads. Journal of Intelligent Material Systems and Structures, 28, 1651-1661(2017)