A weak type (p,a) criterion for operators, and applications

Abstract

Let (X, d, μ) be a space of homogeneous type and Ω an open subset of X. Given a bounded operator T: Lp(Ω) Lq(Ω) for some 1 p q < ∞, we give a criterion for T to be of weak type (p0, a) for p0 and a such that 1p0 - 1a = 1p-1q. These results are illustrated by several applications including estimates of weak type (p0, a) for Riesz potentials L-α2 or for Riesz transform type operators ∇ Δ-α2 as well as Lp-Lq boundedness of spectral multipliers F(L) when the heat kernel of L satisfies a Gaussian upper bound or an off-diagonal bound. We also prove boundedness of these operators from the Hardy space H1L associated with L into La(X). By duality this gives boundedness from La'(X) into BMOL.