Frame decomposition and radial maximal semigroup characterization of Hardy spaces associated to operators

Abstract

Let L be the generator of an analytic semigroup whose kernels satisfy Gaussian upper bounds and H\"older's continuity. Also assume that L has a bounded holomorphic functional calculus on L2(Rn). In this paper, we construct a frame decomposition for the functions belonging to the Hardy space HL1(Rn) associated to L, and for functions in the Lebesgue spaces Lp, 1<p<∞. We then show that the corresponding HL1(Rn)-norm (resp. Lp(Rn)-norm) of a function f in terms of the frame coefficients is equivalent to the HL1(Rn)-norm (resp. Lp(Rn)-norm) of f. As an application of the frame decomposition, we establish the radial maximal semigroup characterization of the Hardy space HL1(Rn) under the extra condition of Gaussian upper bounds on the gradient of the heat kernels of L.