Random Sampling in reproducing kernel subspaces of Lp( Rn)

Abstract

In this paper, we study random sampling on reproducing kernel space V, which is a range of an idempotent integral operator. Under certain decay condition on the integral kernel, we show that any element in V can be approximated by an element in a finite-dimensional subspace of V. Moreover, we prove with overwhelming probability that random points uniformly distributed over a cube C is stable sample for the set of functions concentrated on C