Universal conformal weights on Sobolev spaces

Abstract

The Riemann Mapping Theorem states existence of a conformal homeomorphism of a simply connected plane domain ⊂ C with non-empty boundary onto the unit disc D⊂ C. In the first part of the paper we study embeddings of Sobolev spaces Wp1() into weighted Lebesgue spaces Lq(,h) with an "universal" weight that is Jacobian of i.e. h(z):=J(z,)=| '(z)|2. Weighted Lebesgue spaces with such weights depend only on a conformal structure of . By this reason we call the weights h(z) conformal weights. In the second part of the paper we prove compactness of embeddings of Sobolev spaces W21() into Lq(,h) for any 1≤ q<∞. With the help of Brennan's conjecture we extend these results to Sobolev spaces Wp1(). In this case q is not arbitrary and depends on p and the summability exponent for Brennan's conjecture. Applications to elliptic boundary value problems are demonstrated in the last part of the paper.