Characterizations of Variable Exponent Hardy Spaces via Riesz Transforms

Abstract

Let p(·):\ Rn(0,∞) be a variable exponent function satisfying that there exists a constant p0∈(0,p-), where p-:= ess\,infx∈ Rnp(x), such that the Hardy-Littlewood maximal operator is bounded on the variable exponent Lebesgue space Lp(·)/p0( Rn). In this article, via investigating relations between boundary valued of harmonic functions on the upper half space and elements of variable exponent Hardy spaces Hp(·)( Rn) introduced by E. Nakai and Y. Sawano and, independently, by D. Cruz-Uribe and L.-A. D. Wang, the authors characterize Hp(·)( Rn) via the first order Riesz transforms when p-∈ (n-1n,∞), and via compositions of all the first order Riesz transforms when p-∈(0,n-1n).