Atomic Characterization and Its Applications of Matrix-Weighted Variable Hardy Spaces

Abstract

In this article, by means of the matrix-weighted grand maximal function we first introduce the variable Hardy space Hp(·)W on Rn with the Ap(·),∞ matrix weight W and with the variable exponent p(·) having globally log-Hölder continuity, and then via using several different convex body valued maximal functions we establish its various maximal function equivalent characterizations. Combining a refined Whitney decomposition with both the convex body valued maximal function and its corresponding convex-body reducing operator, we obtain the atomic characterization of Hp(·)W. As applications, we give its dual space and establish the boundedness of Calderón--Zygmund operators from Hp(·)W to the matrix-weighted variable Lebesgue space Lp(·)W and to itself. This approach to establishing atomic characterization differs from all previous ones.