Maximal Function Characterizations of Variable Hardy Spaces Associated with Non-negative Self-adjoint Operators Satisfying Gaussian Estimates

Abstract

Let p(·):\ Rn(0,1] be a variable exponent function satisfying the globally -H\"older continuous condition and L a non-negative self-adjoint operator on L2( Rn) whose heat kernels satisfying the Gaussian upper bound estimates. Let HLp(·)( Rn) be the variable exponent Hardy space defined via the Lusin area function associated with the heat kernels \e-t2L\t∈ (0,∞). In this article, the authors first establish the atomic characterization of HLp(·)( Rn); using this, the authors then obtain its non-tangential maximal function characterization which, when p(·) is a constant in (0,1], coincides with a recent result by Song and Yan [Adv. Math. 287 (2016), 463-484] and further induces the radial maximal function characterization of HLp(·)( Rn) under an additional assumption that the heat kernels of L have the H\"older regularity.