Maximal Function Characterizations of Hardy Spaces Associated to Homogeneous Higher Order Elliptic Operators

Abstract

Let L be a homogeneous divergence form higher order elliptic operator with complex bounded measurable coefficients and (p-(L),\, p+(L)) be the maximal interval of exponents q∈[1,\,∞] such that the semigroup \e-tL\t>0 is bounded on Lq(Rn). In this article, the authors establish the non-tangential maximal function characterizations of the associated Hardy spaces HLp(Rn) for all p∈(0,\,p+(L)), which, when p=1, answers a question asked by Deng et al. in [J. Funct. Anal. 263 (2012), 604-674]. Moreover, the authors characterize HLp(Rn) via various versions of square functions and Lusin-area functions associated to the operator L.