Maximal function characterizations for Hardy spaces associated to nonnegative self-adjoint operators on spaces of homogeneous type

Abstract

Let X be a metric measure space with a doubling measure and L be a nonnegative self-adjoint operator acting on L2(X). Assume that L generates an analytic semigroup e-tL whose kernels pt(x,y) satisfy Gaussian upper bounds but without any assumptions on the regularity of space variables x and y. In this article we continue a study in SY to give an atomic decomposition for the Hardy spaces HpL,max(X) in terms of the nontangential maximal function associated with the heat semigroup of L, and hence we establish characterizations of Hardy spaces associated to an operator L, via an atomic decomposition or the nontangential maximal function. We also obtain an equivalence of HpL, max(X) in terms of the radial maximal function.