A Sobolev gradient flow for the area-normalised Dirichlet energy of H1 maps
Abstract
In this article we study the H1(du)-gradient flow for the energy E[X] = Q[X]/A[X] where Q[X] is the Dirichlet energy of X, A[X] is the signedenclosed area of X, and X:S→R2 is a H1(du) map. We prove that solutions with initially positive signed enclosed area exist eternally, and converge as t→∞ to a (possibly multiply-covered) circle. In this way we recover a parametrised isoperimetric inequality for H1(du) maps.
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