English

Higher regularity and uniqueness for inner variational equations

Complex Variables 2020-07-31 v1

Abstract

We study local minima of the pp-conformal energy functionals, EA(h):=\IDA(\IK(w,h))  J(w,h)  dw,h\IS=h0\IS, \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\IDh:\ID\to\ID with finite distortion of the unit disk with prescribed boundary values h0h_0. Here \IK(w,h)=Dh(w)2J(w,h)\IK(w,h) = \frac{\|Dh(w)\|^2}{J(w,h)} is the pointwise distortion functional, and A:[1,)[1,){\cal A}:[1,\infty)\to [1,\infty) is convex and increasing with A(t)tp{\cal A}(t)\approx t^p for some p1p\geq 1, with additional minor technical conditions. Note A(t)=t{\cal A}(t)=t is the Dirichlet energy functional. Critical points of EA\mathsf{E}_{\cal A}^\ast satisfy the Ahlfors-Hopf inner-variational equation A(\IK(w,h))hwh\wbar=Φ {\cal A}'(\IK(w,h)) h_w \overline{h_\wbar} = \Phi where Φ\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)L1(\ID)Llocr(\ID)\IK(w,h)\in L^1(\ID)\cap L^r_{loc}(\ID) for some r>1r>1.

Keywords

Cite

@article{arxiv.2007.15150,
  title  = {Higher regularity and uniqueness for inner variational equations},
  author = {Gaven Martin and Cong Yao},
  journal= {arXiv preprint arXiv:2007.15150},
  year   = {2020}
}
R2 v1 2026-06-23T17:30:35.017Z