p-regularity and weights for operators between Lp-spaces

Abstract

We explore the connection between p-regular operators on Banach function spaces and weighted p-estimates. In particular, our results focus on the following problem. Given finite measure spaces μ and , let T be an operator defined from a Banach function space X() and taking values on Lp (v d μ) for v in certain family of weights V⊂ L1(μ)+: we analyze the existence of a bounded family of weights W⊂ L1()+ such that for every v∈ V there is w ∈ W in such a way that T:Lp(w d ) Lp(v d μ) is continuous uniformly on V. A condition for the existence of such a family is given in terms of p-regularity of the integration map associated to a certain vector measure induced by the operator T.