On local integrability of fundamental solutions

This paper presents a uni\_ed formulation of the various singular integral equations used in the boundary element methods "BEM# for the solution of linear\ quasi!static\ anisotropic poroelasticity[ In particular\ a derivation is provided that connects the {{direct method|| with the {{indirect method

It is well known that TimoshenkoÕs theory is a refined beam theory which takes shear deformation and rotatory inertia into account. Here, for the first time, an integral equation description for all relevant states, the deflection, the rotation, the bending moment, and the shear forces is derived. A

Some relationships between local differential geometry of surfaces and integrability of evolutionary partial differential equations are studied. It is proven that every second order formally integrable equation describes pseudo-spherical surfaces. A classification of integrable equations of Boussine