The fundamental solution of mindlin plates resting on an elastic foundation in the Laplace domain and its applications
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Publication:833978
DOI10.1016/J.IJSOLSTR.2007.09.020zbMath1167.74490OpenAlexW2045699448MaRDI QIDQ833978
Publication date: 14 August 2009
Published in: International Journal of Solids and Structures (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.ijsolstr.2007.09.020
fundamental solutionsLaplace transformationmethod of fundamental solutionReissner/Mindlin platestatic and dynamic loads
Related Items (11)
Transient analysis of orthotropic, viscoelastic thick plates in the Laplace domain ⋮ An alternative BE-FE formulation for a raft resting on a finite soil layer ⋮ Boundary element method based vibration analysis of elastic bottom plates of fluid storage tanks resting on Pasternak foundation ⋮ Boundary element formulations for Mindlin plate on an elastic foundation with dynamic load ⋮ Bending of a fiber-reinforced viscoelastic composite plate resting on elastic foundations ⋮ Localized boundary knot method and its application to large-scale acoustic problems ⋮ The fundamental solution of Mindlin plates with damping in the Laplace domain and its applications ⋮ Reissner plates with plastic behavior: probability of failure ⋮ Numerical method of crack analysis in 2D finite magnetoelectroelastic media ⋮ Meshless analysis for cracked shallow shell ⋮ The fundamental solution of poroelastic plate saturated by fluid and its applications
Cites Work
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- The method of fundamental solutions for the Cauchy problem in two-dimensional linear elasticity
- Boundary element analysis of thick Reissner plates on two-parameter foundation
- A boundary element method for dynamic plate bending problems
- Heritage and early history of the boundary element method
- An integral equation formulation of plate bending problems
- The Boundary Integral Equation Method for Plates Resting on a Two-Parameter Foundation
- Boundary element frequency domain formulation for dynamic analysis of Mindlin plates
- Application of the boundary integral equation method to Reissner's plate model
- A boundary integral method applied to plates of arbitrary plan form
- The method of fundamental solutions and quasi-Monte-Carlo method for diffusion equations
- Numerical Inversion of Laplace Transforms: An Efficient Improvement to Dubner and Abate's Method
- A boundary element formulation for a Reissner plate on a Pasternak foundation
- Meshfree point collocation method for elasticity and crack problems
- The method of functional equations for the approximate solution of certain boundary value problems
- The influence of elastic waves on dynamic stress intensity factors (three-dimensional problems)
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