On the boundary integral formulation of the plane theory of elasticity with applications (analytical aspects)
From MaRDI portal
Publication:1301792
DOI10.1016/S0377-0427(99)00052-7zbMath0943.74004MaRDI QIDQ1301792
A. F. Ghaleb, Moustafa S. Abou-Dina
Publication date: 5 September 2000
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
ellipsecirclelinear elasticityplane strain problemboundary integral methodharmonic functionreal functionsarbitrary constants
Related Items
Boundary integral method applied to the propagation of non-linear gravity waves generated by a moving bottom, Deformation of a long thermoelastic rod of rectangular normal cross-section under mixed boundary conditions by boundary integrals, A variant of Trefftz's method by boundary Fourier expansion for solving regular and singular plane boundary-value problems, Solution for a problem of linear plane elasticity with mixed boundary conditions on an ellipse by the method of boundary integrals, Stress analysis for long thermoelastic rods with mixed boundary conditions, On the boundary integral formulation of the plane theory of elasticity (computational aspects)., Solution of a problem linear plane elasticity with mixed boundary conditions by the method of boundary integrals, A plane problem of uncoupled thermomagnetoelasticity for an infinite, elliptical cylinder carrying a steady axial current by a boundary integral method, Differential-algebraic approach to coupled problems of dynamic thermoelasticity, Green's functions and boundary element method for transversely isotropic piezoelectric materials, Boundary integral method applied to the transient, nonlinear wave propagation in a fluid with initial free surface elevation, Implementation of Trefftz method for the solution of some elliptic boundary value problems, On stability of approximation methods for the Muskhelishvili equation
Cites Work
- Unnamed Item
- Electroelastic Green's functions for transversely isotropic piezoelectric media and their application to the solution of inclusion and inhomogeneity problems
- A boundary integral formulation and 2D fundamental solution for piezoelastic media
- Fundamental solutions for plane problem of piezoelectric materials
- Fundamental solutions for transversely isotropic piezoelectric media
- The Boundary Integral Equation Method in Plane Elasticity
