On a sampling expansion with partial derivatives for functions of several variables

Abstract

Let Bpσ, 1 p<∞, σ>0, denote the space of all f∈ Lp(R) such that the Fourier transform of f (in the sense of distributions) vanishes outside [-σ,σ]. The classical sampling theorem states that each f∈ Bpσ may be reconstructed exactly from its sample values at equispaced sampling points \π m/σ\m∈Z spaced by π /σ. Reconstruction is also possible from sample values at sampling points \π θ m/σ\m with certain 1< θ 2 if we know f(θπ m/σ) and f'(θπ m/σ), m∈Z. In this paper we present sampling series for functions of several variables. These series involves samples of functions and their partial derivatives.