About: Γ-convergence and relaxations for gradient flows in metric spaces: a minimizing movement approach

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Attributs	Valeurs
type	work Article
Is Part Of	http://hub.abes.fr/edp/periodical/cocv/2019/volume_25/issue_2019/w
Subject	Nonlinear parabolic equations Abstract parabolic equations Iterative procedures Variational methods Discrete approximations curves of maximal slope minimizing movements Γ-convergence Gradient flows relaxation
Title	Γ-convergence and relaxations for gradient flows in metric spaces: a minimizing movement approach
Date	2019-01-01(xsd:dateTime)
has manifestation of work	http://hub.abes.fr/edp/periodical/cocv/2019/volume_25/issue_2019/cocv160036/m/print http://hub.abes.fr/edp/periodical/cocv/2019/volume_25/issue_2019/cocv160036/m/web
related by	http://hub.abes.fr/edp/periodical/cocv/2019/volume_25/issue_2019/cocv160036/authorship/1
Author	Fleißner, Florentine Catharina
Abstract	We present new abstract results on the interrelation between the minimizing movement scheme for gradient flows along a sequence of Γ-converging functionals and the gradient flow motion for the corresponding limit functional, in a general metric space. We are able to allow a relaxed form of minimization in each step of the scheme, and so we present new relaxation results too.
article type	research-article
publisher identifier	cocv160036
Date Copyrighted	2019-01-01(xsd:dateTime)
Rights	© EDP Sciences, SMAI 2019
Rights Holder	EDP Sciences, SMAI
is part of this journal	ESAIM: Control, Optimisation and Calculus of Variations
is primary topic of	http://hub.abes.fr/edp/periodical/cocv/2019/volume_25/issue_2019/cocv160036/w/record

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