Description of the Space of Riesz Potentials of Functions in a Grand Lebesgue Space on ℝn

Abstract

The Riesz potentials Laf, 0 0, on Rn with grandizers a ∈ L1(ℝn), which are understood in the case α ≥ n/p in terms of distributions on test functions in the Lizorkin space. The images under Iα of functions in a subspace of the grand space which satisfy the so-called vanishing condition is studied. Under certain assumptions on the grandizer, this image is described in terms of the convergence of truncated hypersingular integrals of order α in this subspace.