AbstractThis paper presents a bridging research between a modeling methodology in quantum mechanics/relativity and elasticity. Using the symplectic method commonly applied in quantum mechanics and relativity, a new symplectic elasticity approach is developed for deriving exact analytical solutions to some basic problems in solid mechanics and elasticity which have long been bottlenecks in the history of elasticity. In specific, it is applied to bending of rectangular thin plates where exact solutions are hitherto unavailable. It employs the Hamiltonian principle with Legendre’s transformation. Analytical bending solutions could be obtained by eigenvalue analysis and expansion of eigenfunctions. Here, bending analysis requires the solving of...
This paper addresses the fascinating long history of the classical problem of bending of a thin rect...
The present article will give a Fadle eigenfunction analysis of rectangular plates in flexure by mea...
[[abstract]]Conventionally, only three components of stress, i.e., the membrane stresses (1σxx, 1σyy...
AbstractThis paper presents a bridging research between a modeling methodology in quantum mechanics/...
AbstractThe symplectic geometry method is introduced for exact bending solutions of moderately thick...
In the classical approach, it has been common to treat free vibration of rectangular Kirchhoff or th...
This paper deals with a classic but very difficult type of problems, i.e., pursuing analytic bucklin...
In this paper, the analytical solutions for an elastic rectangular thin plate with opposite boundary...
AbstractThe eigenvalue problem for the Hamiltonian operator associated with the mathematical model f...
Abstract: On the example of the boundary value problem of bending of a thin elastic semi-i...
The exact bending solutions of moderately thick rectangular plates with two opposite sides simply in...
Analytical solutions for bending, buckling, and vibration analyses of thick rectangular plates with ...
The symplectic method for a thin piezoelectric plate problem is developed. The Hamiltonian canonical...
This article aims at analytically solving the free vibration problem of rectangular thin plates with...
Seeking analytic free vibration solutions of rectangular thick plates without two parallel simply su...
This paper addresses the fascinating long history of the classical problem of bending of a thin rect...
The present article will give a Fadle eigenfunction analysis of rectangular plates in flexure by mea...
[[abstract]]Conventionally, only three components of stress, i.e., the membrane stresses (1σxx, 1σyy...
AbstractThis paper presents a bridging research between a modeling methodology in quantum mechanics/...
AbstractThe symplectic geometry method is introduced for exact bending solutions of moderately thick...
In the classical approach, it has been common to treat free vibration of rectangular Kirchhoff or th...
This paper deals with a classic but very difficult type of problems, i.e., pursuing analytic bucklin...
In this paper, the analytical solutions for an elastic rectangular thin plate with opposite boundary...
AbstractThe eigenvalue problem for the Hamiltonian operator associated with the mathematical model f...
Abstract: On the example of the boundary value problem of bending of a thin elastic semi-i...
The exact bending solutions of moderately thick rectangular plates with two opposite sides simply in...
Analytical solutions for bending, buckling, and vibration analyses of thick rectangular plates with ...
The symplectic method for a thin piezoelectric plate problem is developed. The Hamiltonian canonical...
This article aims at analytically solving the free vibration problem of rectangular thin plates with...
Seeking analytic free vibration solutions of rectangular thick plates without two parallel simply su...
This paper addresses the fascinating long history of the classical problem of bending of a thin rect...
The present article will give a Fadle eigenfunction analysis of rectangular plates in flexure by mea...
[[abstract]]Conventionally, only three components of stress, i.e., the membrane stresses (1σxx, 1σyy...