Variable Hardy Spaces Associated with Operators Satisfying Davies-Gaffney Estimates

Abstract

Let L be a one-to-one operator of type ω in L2(Rn), with ω∈[0,\,π/2), which has a bounded holomorphic functional calculus and satisfies the Davies-Gaffney estimates. Let 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 Hardy space Hp(·)L(Rn) associated with L. By means of variable tent spaces, the authors establish the molecular characterization of Hp(·)L(Rn). Then the authors show that the dual space of Hp(·)L(Rn) is the BMO-type space BMOp(·),\,L(Rn), where L denotes the adjoint operator of L. In particular, when L is the second order divergence form elliptic operator with complex bounded measurable coefficients, the authors obtain the non-tangential maximal function characterization of Hp(·)L(Rn) and show that the fractional integral L-α for α∈(0,\,12] is bounded from HLp(·)(Rn) to HLq(·)(Rn) with 1p(·)-1q(·)=2αn and the Riesz transform ∇ L-1/2 is bounded from Hp(·)L(Rn) to the variable Hardy space Hp(·)(Rn).