Abstract
Abstract Many of the early works on symplectic elasticity were published in Chinese and as a result, the early works have been unavailable and unknown to researchers worldwide. It is the main objective of this paper to highlight the contributions of researchers from this part of the world and to disseminate the technical knowledge and innovation of the symplectic approach in analytic elasticity and applied engineering mechanics. This paper begins with the history and background of the symplectic approach in theoretical physics and classical mechanics and subsequently discusses the many numerical and analytical works and papers in symplectic elasticity. This paper ends with a brief introduction of the symplectic methodology. A total of more than 150 technical papers since the middle of 1980s have been collected and discussed according to various criteria. In general, the symplectic elasticity approach is a new concept and solution methodology in elasticity and applied mechanics based on the Hamiltonian principle with Legendre’s transformation. The superiority of this symplectic approach with respect to the classical approach is at least threefold: (i) it alters the classical practice and solution technique using the semi-inverse approach with trial functions such as those of Navier, Lévy, and Timoshenko; (ii) it consolidates the many seemingly scattered and unrelated solutions of rigid body movement and elastic deformation by mapping with a series of zero and nonzero eigenvalues and their associated eigenvectors; and (iii) the Saint–Venant problems for plane elasticity and elastic cylinders can be described in a new system of equations and solved. A unique feature of this method is that bending of plate becomes an eigenvalue problem and vibration becomes a multiple eigenvalue problem.
Highlights
Symplecticity is a mathematical concept of geometry and it is an analog of “complex” in Greek first due to Weyl1,2͔
This paper presents a comprehensive review of the previous works on the theory and application of the symplectic methodology in applied mechanics and engineering
It begins with a description of Feng’s works on numerical symplectic algorithm in the middle 1980s, a discussion on Zhong’s works on analytic symplectic elasticity since the beginning of the 1900s, and the many other works using the approach for closed form or nearly closed form solutions to elasticity problems for which exact or closed formed solutions have been impossible based on the semi-inverse method of Navier, Lévy, and Timoshenko44–50͔
Summary
Symplecticity is a mathematical concept of geometry and it is an analog of “complex” in Greek first due to Weyl1,2͔. Based on the foundations of symplectic methods for plane elasticity, duality in Hamiltonian systems, symplectic orthogonality, and the solutions to Saint–Venant problems, the approach is applied to applied mechanics problems for beams. Subsequent research works include analysis of piezoelectric twodimensional transversely isotropic piezoelectric structures146,147,151͔, cantilever beams148,149͔, three-dimensional piezoelectric media150,152͔, boundary layer phenomena151͔, wedge body and crack singularity121,123͔, composite structures such as laminated and cantilever plate153,154͔, and statics and dynamics of functionally graded piezoelectric structures143,152͔. Electromagnetism bears many similarities with Hamiltonian systems and it can be solved using the symplectic methodology This crossdisciplinary subject was initiated by Zhong and co-workers who applied the approach and developed semi-analytical solutions to electromagnetic wave guides155–158͔. The statics and dynamics of functionally graded and layered magneto-electro-elastic plate/pipe141͔ and plane problems for materials having coupled functionally graded and magneto-electro-elastic effects144͔ were reported
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