Dual Spaces of Anisotropic Mixed-Norm Hardy Spaces

Abstract

Let a:=(a1,…,an)∈[1,∞)n, p:=(p1,…,pn)∈(0,∞)n and Hap(Rn) be the anisotropic mixed-norm Hardy space associated with a defined via the non-tangential grand maximal function. In this article, the authors give the dual space of Hap(Rn), which was asked by Cleanthous et al. in [J. Geom. Anal. 27 (2017), 2758-2787]. More precisely, via first introducing the anisotropic mixed-norm Campanato space Lp,\,q,\,sa(Rn) with q∈[1,∞] and s∈Z+:=\0,1,…\, and applying the known atomic and finite atomic characterizations of Hap(Rn), the authors prove that the dual space of Hap(Rn) is the space Lp,\,r',\,sa(Rn) with p∈(0,1]n, r∈(1,∞], 1/r+1/r'=1 and s∈[a-(1p--1) ,∞)+, where :=a1+·s+an, a-:=\a1,…,an\, p-:=\p1,…,pn\ and, for any t∈ R, t denotes the largest integer not greater than t. This duality result is new even for the isotropic mixed-norm Hardy spaces on Rn.