Molecular Characterizations and Dualities of Variable Exponent Hardy Spaces Associated with Operators

Abstract

Let L be a linear operator on L2( Rn) generating an analytic semigroup \e-tL\t0 with kernels having pointwise upper bounds and p(·):\ Rn(0,1] be a variable exponent function satisfying the globally log-H\"older continuous condition. In this article, the authors introduce the variable exponent Hardy space associated with the operator L, denoted by HLp(·)( Rn), and the BMO-type space BMOp(·),L( Rn). By means of tent spaces with variable exponents, the authors then establish the molecular characterization of HLp(·)( Rn) and a duality theorem between such a Hardy space and a BMO-type space. As applications, the authors study the boundedness of the fractional integral on these Hardy spaces and the coincidence between HLp(·)( Rn) and the variable exponent Hardy spaces Hp(·)( Rn).