Surjectivity of Convolution Operators on Noncompact Symmetric Spaces

Abstract

Let μ be a K-invariant compactly supported distribution on a noncompact Riemannian symmetric space X=G/K. If the spherical Fourier transform μ(λ) is slowly decreasing, it is known that the right convolution operator cμ f f*μ maps E(X) onto E(X). In this paper, we prove the converse of this result. We also prove that cμ has a fundamental solution if and only if μ(λ) is slowly decreasing.