The duality about function set and Fefferman-Stein Decomposition

Abstract

Let D∈N, q∈[2,∞) and (RD,|·|,dx) be the Euclidean space equipped with the D-dimensional Lebesgue measure. In this article, the authors establish the Fefferman-Stein decomposition of Triebel-Lizorkin spaces F0∞,\,q'(RD) on basis of the dual on function set which has special topological structure. The function in Triebel-Lizorkin spaces F0∞,\,q'(RD) can be written as the certain combination of D+1 functions in F0∞,\,q'(RD) L∞(RD). To get such decomposition, (i), The authors introduce some auxiliary function space WE1,\,q( RD) and WE∞,\,q'(RD) defined via wavelet expansions. The authors proved F01,q ⊂neqq L1 F01,q⊂ WE1,\,q⊂ L1 + F01,q and WE∞,\,q'(RD) is strictly contained in F0∞,\,q'(RD). (ii), The authors establish the Riesz transform characterization of Triebel-Lizorkin spaces F01,\,q(RD) by function set WE1,\,q( RD). (iii), We also consider the dual of WE1,\,q( RD). As a consequence of the above results, the authors get also Riesz transform characterization of Triebel-Lizorkin spaces F01,\,q(RD) by Banach space L1 + F01,q. Although Fefferman-Stein type decomposition when D=1 was obtained by C.-C. Lin et al. [Michigan Math. J. 62 (2013), 691-703], as was pointed out by C.-C. Lin et al., the approach used in the case D=1 can not be applied to the cases D2, which needs some new methodology.