Higher regularity and uniqueness for inner variational equations

TL;DR

This paper investigates the regularity and uniqueness of local minima of p-conformal energy functionals for mappings with finite distortion, establishing conditions under which these minima are diffeomorphic solutions to the associated inner-variational equations.

Contribution

It provides a sufficient condition ensuring that local minima are diffeomorphic solutions and unique, extending previous regularity results for critical points of these energy functionals.

Findings

Local minima are diffeomorphic solutions under certain integrability conditions.

The paper establishes uniqueness of these solutions.

It generalizes regularity results for critical points of p-conformal energy functionals.

Abstract

We study local minima of the $p$-conformal energy functionals, \[ \mathsf{E}_{\cal A}^\ast(h):=\int_\ID {\cal A}(\IK(w,h)) \;J(w,h) \; dw,\quad h|_\IS=h_0|_\IS, \] defined for self mappings $h:\ID\to\ID$ with finite distortion of the unit disk with prescribed boundary values $h_0$. Here $\IK(w,h) = \frac{\|Dh(w)\|^2}{J(w,h)} $ is the pointwise distortion functional, and ${\cal A}:[1,\infty)\to [1,\infty)$ is convex and increasing with ${\cal A}(t)\approx t^p$ for some $p\geq 1$, with additional minor technical conditions. Note ${\cal A}(t)=t$ is the Dirichlet energy functional. Critical points of $\mathsf{E}_{\cal A}^\ast$ satisfy the Ahlfors-Hopf inner-variational equation \[ {\cal A}'(\IK(w,h)) h_w \overline{h_\wbar} = \Phi \] where $\Phi$ 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 $\IK(w,h)\in L^1(\ID)\cap L^r_{loc}(\ID)$ for some $r>1$.