Well-Localized Operators on Matrix Weighted $L^2$ Spaces
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Publication:2828639
zbMath1356.47039arXiv1407.3819MaRDI QIDQ2828639
Publication date: 26 October 2016
Full work available at URL: https://arxiv.org/abs/1407.3819
matrix \(A_2\) weightswell-localized operatorsT(1) theoremsweighted Carleson embedding theoremweighted Haar basis
Spaces of vector- and operator-valued functions (46E40) Dilations, extensions, compressions of linear operators (47A20) Linear operators on function spaces (general) (47B38) Conjugate functions, conjugate series, singular integrals (42A50) Quasitriangular and nonquasitriangular, quasidiagonal and nonquasidiagonal linear operators (47A66)
Related Items (5)
Characterizations of \(A_{2}\) matrix power weights ⋮ Two‐weight Tb theorems for well‐localized operators ⋮ Real-variable characterizations and their applications of matrix-weighted Triebel-Lizorkin spaces ⋮ A study of the matrix Carleson embedding theorem with applications to sparse operators ⋮ Two weight estimates with matrix measures for well localized operators
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