Variable Matrix-Weighted Besov Spaces

Abstract

In this article, using variable matrix Ap(·),∞ weights, we introduce the matrix-weighted variable Besov space Bs(·)p(·),q(·)(W) and the corresponding averaging variable Besov space Bs(·)p(·),q(·)(A) and prove that they are equivalent. Applying this, we establish the -transform characterization of Bs(·)p(·),q(·)(W). By this and via first establishing the boundedness of α-convexification η-type operators on variable Lebesgue spaces, we obtain the boundedness of almost diagonal operators on the sequence space bs(·)p(·),q(·)(W) related to Bs(·)p(·),q(·)(W), which is further used to establish various decomposition characterizations of Bs(·)p(·),q(·)(W), respectively, in terms of molecules, wavelets, and atoms. Applying the wavelet decomposition of Bs(·)p(·),q(·)(W), we obtain the trace theorem and the extension properties of Bs(·)p(·),q(·)(W), and, applying the molecular characterization, we obtain the boundedness of Calder\'on--Zygmund operators on Bs(·)p(·),q(·)(W).