Lipschitz regularity of energy-minimal mappings between doubly connected Riemann surfaces

Abstract

Let M and N be doubly connected Riemann surfaces with C1,α boundaries and with nonvanishing conformal metrics σ and respectively, and assume that is a smooth metric with bounded Gauss curvature K and finite area. Assume that (M, N) is the class of all W1,2 bomeomorphisms between M and N and assume that E: (M, N) R is the Dirichlet-energy functional, where (M, N) is the closure of (M, N) in W1,2(M,N). By using a result of Iwaniec, Kovalev and Onninen in duke that the minimizer, is locally Lipschitz, we prove that the minimizer, of the energy functional E, which is not a diffeomorphism in general, is a globally Lipschitz mapping of M onto N.