Higher regularity and uniqueness for inner variational equations

Abstract

We study local minima of the p-conformal energy functionals, \[ E A(h):=∫ A((w,h)) \;J(w,h) \; dw, h|=h0|, \] defined for self mappings h: with finite distortion of the unit disk with prescribed boundary values h0. Here (w,h) = \|Dh(w)\|2J(w,h) is the pointwise distortion functional, and A:[1,∞) [1,∞) is convex and increasing with A(t)≈ tp for some p≥ 1, with additional minor technical conditions. Note A(t)=t is the Dirichlet energy functional. Critical points of E A satisfy the Ahlfors-Hopf inner-variational equation \[ A'((w,h)) hw h = \] where is a holomorphic function. Iwaniec, Kovalev and Onninen established the Lipschitz regularity of critical points. Here we give a sufficient condition to ensure that a local minimum is a diffeomorphic solution to this equation, and that it is unique. This condition is necessarily satisfied by any locally quasiconformal critical point, and is basically the assumption (w,h)∈ L1() Lrloc() for some r>1.