Hardy spaces for Bessel-Schr\"odinger operators

Abstract

Consider the Bessel operator with a potential on L2((0,infty), xa dx), namely Lf(x) = -f"(x) - a/x f'(x) + V(x)f(x). We assume that a>0 and V∈ L1loc((0,infty), xa dx) is a non-negative function. By definition, a function f∈ L1((0,infty), xa dx) belongs to the Hardy space H1(L) if supt>0 |e-tL f| ∈ L1((0,infty), xa dx). Under certain assumptions on V we characterize the space H1(L) in terms of atomic decompositions of local type. In the second part we prove that this characterization can be applied to L for a ∈ (0,1) with no additional assumptions on the potential V.