English

Variable Matrix-Weighted Besov Spaces

Functional Analysis 2026-02-13 v2 Analysis of PDEs Classical Analysis and ODEs

Abstract

In this article, using variable matrix Ap(),{\mathscr{A}}_{p(\cdot),\infty} weights, we introduce the matrix-weighted variable Besov space Bp(),q()s()(W)B^{s(\cdot)}_{p(\cdot),q(\cdot)}(W) and the corresponding averaging variable Besov space Bp(),q()s()(A)B^{s(\cdot)}_{p(\cdot),q(\cdot)}(\mathbb{A}) and prove that they are equivalent. Applying this, we establish the φ\varphi-transform characterization of Bp(),q()s()(W)B^{s(\cdot)}_{p(\cdot),q(\cdot)}(W). By this and via first establishing the boundedness of α\alpha-convexification η\eta-type operators on variable Lebesgue spaces, we obtain the boundedness of almost diagonal operators on the sequence space bp(),q()s()(W)b^{s(\cdot)}_{p(\cdot),q(\cdot)}(W) related to Bp(),q()s()(W)B^{s(\cdot)}_{p(\cdot),q(\cdot)}(W), which is further used to establish various decomposition characterizations of Bp(),q()s()(W)B^{s(\cdot)}_{p(\cdot),q(\cdot)}(W), respectively, in terms of molecules, wavelets, and atoms. Applying the wavelet decomposition of Bp(),q()s()(W)B^{s(\cdot)}_{p(\cdot),q(\cdot)}(W), we obtain the trace theorem and the extension properties of Bp(),q()s()(W)B^{s(\cdot)}_{p(\cdot),q(\cdot)}(W), and, applying the molecular characterization, we obtain the boundedness of Calder\'on--Zygmund operators on Bp(),q()s()(W)B^{s(\cdot)}_{p(\cdot),q(\cdot)}(W).

Keywords

Cite

@article{arxiv.2509.07786,
  title  = {Variable Matrix-Weighted Besov Spaces},
  author = {Dachun Yang and Wen Yuan and Zongze Zeng},
  journal= {arXiv preprint arXiv:2509.07786},
  year   = {2026}
}

Comments

68 pages; Submitted

R2 v1 2026-07-01T05:28:30.397Z