Hardy Space Decompositions of Lp(Rn) for 0<p<1 with Rational Approximation

Abstract

This paper aims to obtain decompositions of higher dimensional Lp(Rn) functions into sums of non-tangential boundary limits of the corresponding Hardy space functions on tubes for the index range 0<p<1. In the one-dimensional case, Deng and Qian DQ recently obtained such Hardy space decomposition result: for any function f∈ Lp(R),\ 0<p<1, there exist functions f1 and f2 such that f=f1+f2, where f1 and f2 are, respectively, the non-tangential boundary limits of some Hardy space functions in the upper-half and lower-half planes. In the present paper, we generalize the one-dimensional Hardy space decomposition result to the higher dimensions, and discuss the uniqueness issue of such decomposition.