Matrix-Weighted Campanato Spaces: Duality and Calder\'on--Zygmund Operators

Abstract

Let p∈(0,∞), q∈[1,∞), s∈ Z+, and W be an Ap-matrix weight, which in the scalar case is exactly a Muckenhoupt A\1,p\ weight. In this article, by using the reducing operators of W, we introduce matrix-weighted Campanato spaces Lp,q,s,W. When p∈(0,1], applying the atomic and the finite atomic characterizations of the matrix-weighted Hardy space HpW, we prove that the dual space of HpW is precisely Lp,q,s,W, which further induces several equivalent characterizations of Lp,q,s,W. In addition, we obtain a necessary and sufficient condition for the boundedness of modified Calder\'on--Zygmund operators on Lp,q,s,W with p∈(0,∞), which, combined with the duality, further gives a necessary and sufficient condition for the boundedness of Calder\'on--Zygmund operators on HpW with p∈(0,1].