The general boundary element method and its further generalizations

The generalized ÿnite element method (GFEM) was introduced in Reference [1] as a combination of the standard FEM and the partition of unity method. The standard mapped polynomial ÿnite element spaces are augmented by adding special functions which re ect the known information about the boundary valu

The presence of singularities in the integral operators of the boundary element methods requires that the density functions must satisfy certain continuity requirements if the displacements and stresses are to be bounded. Quite often the continuity conditions, particularly on the derivatives of the

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

In this paper a boundary problem is considered for which the boundary is to be determined as part of the solution. A time-dependent problem involving linear di usion in two spatial dimensions which results in a moving free boundary is posed. The fundamental solution is introduced and Green's Theorem

The scaled boundary ÿnite element method, alias the consistent inÿnitesimal ÿnite element cell method, is developed starting from the di usion equation. Only the boundary of the medium is discretized with surface ÿnite elements yielding a reduction of the spatial dimension by one. No fundamental sol