The Teichm\"uller problem for Lp-means of distortion

Abstract

Teichm\"uller's problem from 1944 is this: Given x∈ [0,1) find and describe the extremal quasiconformal map f:, f|∂ =identity and f(0)=-x≤ 0. We consider this problem in the setting of minimisers of Lp-mean distortion. The classical result is that there is an extremal map of Teichm\"uller type with associated holomorphic quadratic differential having a pole of order one at x, if x≠ 0. For the Lp-norm, when p=1 it is known that there can be no locally quasiconformal minimiser unless x=0. Here we show that for 1≤ p<∞ there is a minimiser in a weak class and an associated Ahlfors-Hopf holomorphic quadratic differential with a pole of order 1 at f(0)=r. However, this minimiser cannot be in W1,2loc() unless r=0 and f=identity. Hence there is no locally quasiconformal minimiser. A similar statement holds for minimsers of the exponential norm of distortion. We also use our earlier work to show that as p∞, the weak Lp-minimisers converge locally uniformly in to the extremal quasiconformal mapping, and that as p 1 the weak Lp-minimisers converge locally uniformly in to the identity.