On planar sampling with Gaussian kernel in spaces of bandlimited functions

Abstract

Let I=(a,b)×(c,d)⊂ R+2 be an index set and let \Gα(x) \α ∈ I be a collection of Gaussian functions, i.e. Gα(x) = (-α1 x12 - α2 x22), where α = (α1, α2) ∈ I, \, x = (x1, x2) ∈ R2. We present a complete description of the uniformly discrete sets ⊂ R2 such that every bandlimited signal f admits a stable reconstruction from the samples \f Gα (λ)\λ ∈ .