Beltrami equations with coefficient in the fractional Sobolev space Wθ, 2θ

Abstract

In this paper, we look at quasiconformal solutions φ:C of Beltrami equations ∂z φ(z)=μ(z)\,∂z φ (z). where μ∈ L∞(C) is compactly supported on D, \|μ\|∞<1 and belongs to the fractional Sobolev space Wα, 2α(C). Our main result states that ∂zφ ∈ Wα, 2α(C) whenever α>12. Our method relies on an n-dimensional result, which asserts the compactness of the commutator [b,(-)β2]:Lnpn-β p(Rn) Lp(Rn) between the fractional laplacian (-)β2 and any symbol b∈ Wβ,nβ(Rn), provided that 1<p<nβ.