Liang Song, Lixin Yan
Published 2015-03-12Version 1
Let $L$ be a nonnegative, self-adjoint operator satisfying Gaussian estimates on $L^2(\RR^n)$. In this article we give an atomic decomposition for the Hardy spaces $ H^p_{L,max}(\R)$ in terms of the nontangential maximal functions associated with the heat semigroup of $L$, and this leads eventually to characterizations of Hardy spaces associated to $L$, via atomic decomposition or the nontangential maximal functions. The proofs are based on a modification of technique due to A. Calder\'on \cite{C}.
Characterizations of Hardy spaces for Fourier integral operators
Maximal function characterizations for Hardy spaces associated to nonnegative self-adjoint operators on spaces of homogeneous type
Corrigendum to "Hardy Spaces $H_{\mathcal L}^1({\mathbb R}^n)$ Associated to Schrödinger Type Operators $(-Δ)^2+V^2$" [Houston J. Math 36 (4) (2010), 1067-1095]
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