Clara Antonucci, Massimo Gobbino, Matteo Migliorini, Nicola Picenni
Published 2018-01-14Version 1
We consider the family of non-local and non-convex functionals introduced by H. Brezis and H.-M. Nguyen in a recent paper. These functionals Gamma-converge to a multiple of the Sobolev norm or the total variation, depending on a summability exponent, but the exact values of the constants are unknown in many cases. We describe a new approach to the Gamma-convergence result that leads in some special cases to the exact value of the constants, and to the existence of smooth recovery families.
Comments: Compte-rendu that summarizes the strategy developed in ArXiv:1708.01231 and ArXiv:1712.04413
Optimal constants for a non-local approximation of Sobolev norms and total variation
On the gap between Gamma-limit and pointwise limit for a non-local approximation of the total variation
New estimates for a class of non-local approximations of the total variation
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