On the Convergence of critical points of the Ambrosio-Tortorelli functional

Abstract

This work is devoted to study the asymptotic behavior of critical points \(u,v)\>0 of the Ambrosio-Tortorelli functional. Under a uniform energy bound assumption, the usual -convergence theory ensures that (u,v) converges in the L2-sense to some (u*,1) as 0, where u* is a special function of bounded variation. Assuming further the Ambrosio-Tortorelli energy of (u,v) to converge to the Mumford-Shah energy of u*, the later is shown to be a critical point with respect to inner variations of the Mumford-Shah functional. As a byproduct, the second inner variation is also shown to pass to the limit. To establish these convergence results, interior (C∞) regularity and boundary regularity for Dirichlet boundary conditions are first obtained for a fixed parameter >0. The asymptotic analysis is then performed by means of varifold theory in the spirit of scalar phase transition problems.