Littlewood-Paley Theory for Matrix-Weighted Function Spaces

Abstract

We define the vector-valued, matrix-weighted function spaces Fα qp(W) (homogeneous) and Fα qp(W) (inhomogeneous) on Rn, for α ∈ R, 0<p<∞, 0<q ≤ ∞, with the matrix weight W belonging to the Ap class. For 1<p<∞, we show that Lp(W) = F0 2p(W), and, for k ∈ N, that Fk 2p(W) coincides with the matrix-weighted Sobolev space Lpk(W), thereby obtaining Littlewood-Paley characterizations of Lp(W) and Lpk (W). We show that a vector-valued function belongs to Fα qp(W) if and only if its wavelet or -transform coefficients belong to an associated sequence space fα qp(W). We also characterize these spaces in terms of reducing operators associated to W.