The Lp Teichm\"uller theory: Existence and regularity of critical points

Abstract

We study minimisers of the p-conformal energy functionals, \[ Ep(f):=∫ p(z,f)\,dz, f|=f0|, \] defined for self mappings f: with finite distortion and prescribed boundary values f0. Here \[ (z,f) = \|Df(z)\|2J(z,f) = 1+|μf(z)|21-|μf(z)|2\] is the pointwise distortion functional and μf(z) is the Beltrami coefficient of f. We show that for quasisymmetric boundary data the limiting regimes p∞ recover the classical Teichm\"uller theory of extremal quasiconformal mappings (in part a result of Ahlfors), and for p1 recovers the harmonic mapping theory. Critical points of Ep always satisfy the inner-variational distributional equation \[ 2p∫ p\;μf1+|μf|2 \; dz=∫ p \; z\; dz,∀∈ C0∞( ). \] We establish the existence of minimisers in the a priori regularity class W1,2pp+1() and show these minimisers have a pseudo-inverse - a continuous W1,2() surjection of with (h f)(z)=z almost everywhere. We then give a sufficient condition to ensure C∞() smoothness of solutions to the distributional equation. For instance (z,f)∈ Lrloc() for any r>p+1 is enough to imply the solutions to the distributional equation are local diffeomorphisms. Further (w,h)∈ L1() will imply h is a homeomorphism, and together these results yield a diffeomorphic minimiser. We show such higher regularity assumptions to be necessary for critical points of the inner variational equation.