A generalized Stoilow decomposition for pairs of mappings of integrable dilatation

Abstract

We prove a rigidity result for pairs of mappings of integrable dilatation whose gradients pointwise deform the unit ball to similar ellipses. Our result implies as corollaries a version of the generalized Stoilow decomposition provided by Theorem 5.5.1 of a recent monograph of Astala-Iwaniec-Martin and the two dimensional rigidity result of our previous paper for mappings whose symmetric part of gradient agrees. Specifically let u,v∈ W1,2(,R2) where (Du)>0, (Dv)>0 a.e. and u is a mapping of integrable dilatation. Suppose for a.e. z∈ we have Du(z)T Du(z)=λ Dv(z)T Dv(z) for some λ>0. Then there exists a meromorphic function and a homeomorphism w∈ W1,1(:R2) such that Du(z)=P((w(z)))Dv(z) where P(a+ib)=(smallmatrix a & -b \\ b & a smallmatrix). We show by example that this result is sharp in the sense that there can be no continuous relation between the gradients of Du and Dv on a dense open connected subset of unless one of the mappings is of integrable dilatation.