Marcinkiewicz-Zygmund inequalities in variable Lebesgue spaces

Abstract

We study r-valued extensions of linear operators defined on Lebesgue spaces with variable exponent. Under some natural (and usual) conditions on the exponents, we characterize 1≤ r≤ ∞ such that every bounded linear operator T Lq(·)(2, μ) Lp(·)(1, ) has a bounded r-valued extension. We consider both non-atomic measures and measures with atoms and show the differences that can arise. We present some applications of our results to weighted norm inequalities of linear operators and vector-valued extensions of fractional operators with rough kernel.