Numerical implementation of the symmetric Galerkin boundary element method in 2D elastodynamics

## Abstract The boundary integral equations in 3‐d elastodynamics contain convolution integrals with respect to the time. They can be performed analytically or with the convolution quadrature method. The latter time‐stepping procedure's benefit is the usage of the Laplace‐transformed fundamental so

## Abstract The symmetric Galerkin boundary element method is used to solve boundary value problems by keeping the symmetric nature of the matrix obtained after discretization. The matrix elements are obtained from a double integral involving the double derivative of Green's operator, which is high

The paper investigates the accuracy and numerical stability of a class of wavelet Galerkin formulations on irregular domains. The method of numerical boundary measures is based upon a domain embedding strategy in which the irregular domain of interest is embedded in a larger domain having regular ge

A time-convolutive variational hypersingular integral formulation of transient heat conduction over a 2-D homogeneous domain is considered. The adopted discretization leads to a linear equation system, whose coe cient matrix is symmetric, and is generated by double integrations in space and time. As

The integrals required in the computation of in¯uence coecient matrices of the boundary element method (BEM) depend on the distance rxY x H from the collocation point or ®eld point x to the source or load point x H . As a consequence, a distinction must be made between the case where the collocation