Minimal diffeomorphisms with L1 Hopf differentials

Abstract

We prove that for any two Riemannian metrics σ1, σ2 on the unit disk, a homeomorphism ∂D∂D extends to at most one quasiconformal minimal diffeomorphism (D,σ1) (D,σ2) with L1 Hopf differential. For minimal Lagrangian diffeomorphisms between hyperbolic disks, the result is known, but this is the first proof that does not use anti-de Sitter geometry. We show that the result fails without the L1 assumption in variable curvature. The key input for our proof is the uniqueness of solutions for a certain Plateau problem in a product of trees.

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