Mechanics of Solids (about journal) Mechanics of Solids
A Journal of Russian Academy of Sciences
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IssuesArchive of Issues2023-9pp.3263-3275

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Tongtong An, Zhiqiang Sun, Guolin Hou, and Yanfen Qiao, "Symplectic Elasticity Approach for the Anti-Plane Problem of One-Dimensional Hexagonal Piezoelectric Quasicrystal Plates," Mech. Solids. 58 (9), 3263-3275 (2023)
Year 2023 Volume 58 Number 9 Pages 3263-3275
DOI 10.3103/S0025654423601684
Title Symplectic Elasticity Approach for the Anti-Plane Problem of One-Dimensional Hexagonal Piezoelectric Quasicrystal Plates
Author(s) Tongtong An (School of Mathematical Sciences, Inner Mongolia University, Hohhot, 010021 China)
Zhiqiang Sun (School of Mathematical Sciences, Inner Mongolia University, Hohhot, 010021 China)
Guolin Hou (School of Mathematical Sciences, Inner Mongolia University, Hohhot, 010021 China, smshgl@imu.edu.cn)
Yanfen Qiao (School of Mathematical Sciences, Inner Mongolia University, Hohhot, 010021 China, yanfenqiao@mail.imu.edu.cn)
Abstract This paper presents the analytical solutions for the anti-plane problem in one-dimensional hexagonal piezoelectric quasicrystal plates using the symplectic elasticity approach. The equilibrium equations with body forces are transformed into the Hamiltonian system using the variational principle, and then the corresponding Hamiltonian operator matrix is derived. Furthermore, the completeness of the eigenfunction system of the operator is proved, and the general solutions to the problem are given by utilizing the symplectic orthogonality. As an application, the numerical results are obtained for the rectangular plates under the lateral concentrated load.
Keywords symplectic elasticity approach, quasicrystals, Hamiltonian operator, finite integral transform
Received 01 September 2023Revised 07 November 2023Accepted 13 November 2023
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