Wavelet resolution and Sobolev regularity of Calder\'on-Zygmund operators on domains

Abstract

Given a uniform domain ⊂ Rd, we resolve each element of a suitably defined class of Calder\`on-Zygmund (CZ) singular integrals on as the linear combination of Triebel wavelet operators and paraproduct terms. Our resolution formula entails a testing type characterization, loosely in the vein of the David-Journ\'e theorem, of weighted Sobolev space bounds in terms of Triebel-Lizorkin and tree Carleson measure norms of the paraproduct symbols, which is new already in the case = Rd with Lebesgue measure. Our characterization covers the case of compressions to of global CZ operators, extending and sharpening past results of Prats and Tolsa for the convolution case. The weighted estimates we obtain, particularized to the Beurling operator on a Lipschitz domain with normal to the boundary in the corresponding sharp Besov class, may be used to deduce quantitative estimates for quasiregular mappings with dilatation in the Sobolev space W1,p(), p>2.