Range of certain convolution operators and reconstruction from local averages

Abstract

For a compactly supported absolutely continuous measure μ on R2 having a density function equal to a finite linear combination of indicator functions of rectangles [ai, bi]× [ci, di], we analyse the range of the convolution operator Cμ:C(R2)→ C(R2) defined by Cμ(f)=fμ, where (f μ)(x,y)=∫R2f(x-s,y-t)dμ. It is shown that Cμ maps the space of all continuous functions C(R2) onto the space C2*(R2)=\f:R2→ C:∂2 f∂ x ∂ y,∂2 f∂ y ∂ x∈ C(R2)\ provided the density function of μ satisfies certain conditions.