Modular inequalities for the maximal operator in variable Lebesgue spaces

Abstract

A now classical result in the theory of variable Lebesgue spaces due to Lerner [A. K. Lerner, On modular inequalities in variable Lp spaces, Archiv der Math. 85 (2005), no. 6, 538-543] is that a modular inequality for the Hardy-Littlewood maximal function in Lp(·)(Rn) holds if and only if the exponent is constant. We generalize this result and give a new and simpler proof. We then find necessary and sufficient conditions for the validity of the weaker modular inequality \[ ∫ Mf(x)p(x)\,dx \ ≤ c1 ∫ |f(x)|q(x)\,dx + c2, \] where c1,\,c2 are non-negative constants and is any measurable subset of Rn. As a corollary we get sufficient conditions for the modular inequality \[ ∫ |Tf(x)|p(x)\,dx \ ≤ c1 ∫ |f(x)|q(x)\,dx + c2, \] where T is any operator that is bounded on Lp(), 1<p<∞.