On the embedding between the variable Lebesgue space Lp(·)() and the Orlicz space L( L)α()

Abstract

We give a sharp sufficient condition on the distribution function, |\x∈ :\,p(x)≤ 1+λ\|, λ>0, of the exponent function p(·): [1,∞) that implies the embedding of the variable Lebesgue space Lp(·)() into the Orlicz space L( L)α(), α>0, where is an open set with finite Lebesgue measure. As applications of our results, we first give conditions that imply the strong differentiation of integrals of functions in Lp(·)((0,1)n), n>1. We then consider the integrability of the maximal function on variable Lebesgue spaces, where the exponent function p(·) approaches 1 in value on some part of the domain. This result is an improvement of the result in~CUF2.