Matrix-Weighted Besov Spaces Associated with Non-isotropic Dilations

Abstract

Let α∈R, p∈[1,∞), q∈(0,∞], W be a matrix weight, and A be an expansive dilation on Rd. In this paper, the authors firstly investigate and develop some aspects of homogeneous anisotropic Besov spaces Bα,qp,A(Rd,W) and inhomogeneous anisotropic Besov spaces Bα,qp,A(Rd,W) theory in the matrix weight setting. Moreover, we show that these spaces are characterized by the magnitude of the -transforms in appropriate sequence spaces. Notably, all these results remain novel even in the diagonal non-isotropic case (when A = diag(λ1, λ2, …, λd) with \λj\j=1d ⊂ C).

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