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Documents 49Q20 4 results

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Isoperimetry with density - Morgan, Frank (Author of the conference) | CIRM H

Multi angle

In 2015 Chambers proved the Log-convex Density Conjecture, which says that for a radial density f on $R^n$, spheres about the origin are isoperimetric if and only if log f is convex (the stability condition). We discuss recent progress and open questions for other densities, unequal perimeter and volume densities, and other metrics.

49Q20 ; 53C17 ; 49N60

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Parametrizing with Guy - Toro, Tatiana (Author of the conference) | CIRM H

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Over the past 20 years we have been interested in finding good parameterizations for sets that are well approximated by nice sets. In this talk we will discuss the meanings of good and nice. We will recall some the results from the past and present new results concerning the regularity of sets that can be well approximated by Lipschitz graphs.

28A75 ; 49Q05 ; 49Q20 ; 49Kxx

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I will review several relaxations of the classical Monge Optimal Transport problem using a dynamic “time” extension and discuss the corresponding available numerical methods. They also apply to some instances of variational mean field games.

49Q20 ; 49M25 ; 35J70 ; 65M60 ; 35J96

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In this work in collaboration with Vincent Millot and Rémy Rodiac, we address the question of the convergence of critical points of the Ambrosio-Tortorelli functional, in the sense of inner variations, to those of the Mumford-Shah ones. We extend earlier results by Francfort, Le and Serfaty in the 1-dimensional case to any arbitrary dimension upon the additional assumption of the convergence of the energies. As a byproduct, we also obtain the convergence of the second inner variation, which implies the convergence of stable critical points. The proof rests on elliptic PDE and geometric measure theoretic arguments. Thanks to elliptic regularity estimates, we derive the first inner variations of the Ambrosio-Tortorelli functional which have a varifold structure. Then, we characterize the limit varifold as the rectifiable varifold associated to the jump set.[-]
In this work in collaboration with Vincent Millot and Rémy Rodiac, we address the question of the convergence of critical points of the Ambrosio-Tortorelli functional, in the sense of inner variations, to those of the Mumford-Shah ones. We extend earlier results by Francfort, Le and Serfaty in the 1-dimensional case to any arbitrary dimension upon the additional assumption of the convergence of the energies. As a byproduct, we also obtain the ...[+]

49Q20 ; 35B38 ; 35J60

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