On the expansion of solutions of Laplace-like equations into traces of separable higher dimensional functions

Abstract

This paper deals with the equation - u+μ u=f on high-dimensional spaces Rm where μ is a positive constant. If the right-hand side f is a rapidly converging series of separable functions, the solution u can be represented in the same way. These constructions are based on approximations of the function 1/r by sums of exponential functions. The aim of this paper is to prove results of similar kind for more general right-hand sides f(x)=F(Tx) that are composed of a separable function on a space of a dimension n greater than m and a linear mapping given by a matrix T of full rank. These results are based on the observation that in the high-dimensional case, for ω in most of the Rn, the euclidian norm of the vector Ttω in the lower dimensional space Rm behaves like the euclidian norm of ω.