The Establishment of Boundary Integral Equations by Generalized Functions

By the theory of generalized functions this paper introduces a specific generalized function δθ_P, by which, together with its various derivatives, the boundary integral equations and its arbitrary derivatives of any sufficiently smooth function can be established. These equations have no non-integral singularities. For a problem defined by linear partial differential operators, the partial differential equations of the problem can always be converted into boundary integral equations so long as the relevant fundamental solutions exist.