Intrinsic Structures of Certain Musielak-Orlicz Hardy Spaces

Abstract

For any p∈(0,\,1], let Hp(Rn) be the Musielak-Orlicz Hardy space associated with the Musielak-Orlicz growth function p, defined by setting, for any x∈Rn and t∈[0,\,∞), p(x,\,t):= cases t(e+t)+[t(1+|x|)n]1-p & when n(1/p-1) N \0\; \\ t(e+t)+[t(1+|x|)n]1-p[(e+|x|)]p & when n(1/p-1)∈ N\0\,\\ cases which is the sharp target space of the bilinear decomposition of the product of the Hardy space Hp(Rn) and its dual. Moreover, H1(Rn) is the prototype appearing in the real-variable theory of general Musielak-Orlicz Hardy spaces. In this article, the authors find a new structure of the space Hp(Rn) by showing that, for any p∈(0,\,1], Hp(Rn)=Hφ0(Rn) +HWpp(Rn) and, for any p∈(0,\,1), Hp(Rn)=H1(Rn) +HWpp(Rn), where H1(Rn) denotes the classical real Hardy space, Hφ0(Rn) the Orlicz-Hardy space associated with the Orlicz function φ0(t):=t/(e+t) for any t∈ [0,∞) and HWpp(Rn) the weighted Hardy space associated with certain weight function Wp(x) that is comparable to p(x,1) for any x∈Rn. As an application, the authors further establish an interpolation theorem of quasilinear operators based on this new structure.