Potential trace inequalities via a Calderón-type theorem

Abstract

In this paper we develop a general theoretical tool for the establishment of the boundedness of notoriously difficult operators (such as potentials) on certain specific types of rearrangement-invariant function spaces from analogous properties of operators that are easier to handle (such as fractional maximal operators). A principal example of the new results one obtains by our analysis is the following inequality, which generalizes a result of Korobkov and Kristensen (who had treated the case μ=Ln, the Lebesgue measure on Rn): There exists a constant C>0 such that \[∫Rn |Iαμf|p dν≤ C \|f\|Lp,1(Rn,μ)p\] for all f in the Lorentz space Lp,1(Rn,μ), where μ, ν are Radon measures such that \[Q μ(Q)l(Q)d < ∞ and μ(Q)>0 ν(Q)μ(Q)1-αpd < ∞,\] and Iαμ is the Riesz potential defined with respect to μ of order α∈ (0,d). More broadly, we obtain inequalities in this spirit in the context of rearrangement-invariant spaces through a result of independent interest, an extension of an interpolation theorem of Calderón where the target space in one endpoint is a space of bounded functions.

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