Subdifferential calculus rules for possibly nonconvex integral functions

Repositorio Académico UOH

dc.contributor.author	Correa, R
dc.contributor.author	Hantoute, A
dc.contributor.author	Pérez-Aros, P
dc.date.accessioned	2024-01-17T15:55:48Z
dc.date.available	2024-01-17T15:55:48Z
dc.date.issued	2020
dc.identifier.uri	https://repositorio.uoh.cl/handle/611/872
dc.description.abstract	We are concerned with the subdifferentials of integral functionals and functions given in the form E-f(x) = f(T) f (t, x)d mu, for a possibly nonconvex normal integrand f defined on a separable Banach with separable dual and a nonnegative sigma-finite measure mu. We establish some limit-based estimates for the Frechet and the limiting subdifferentials of E-f, covering the cases of Lipschitz and non-Lipschitz integrands.
dc.description.sponsorship	CONICYT grants Fondecyt Regular
dc.description.sponsorship	MICIU of Spain
dc.description.sponsorship	Universidad de Alicante
dc.description.sponsorship	CONICYT-PCHA/doctorado Nacional
dc.relation.uri	http://dx.doi.org/10.1137/18M1176476
dc.subject	integral functions and functionals
dc.subject	normal integrands
dc.subject	subdifferential calculus
dc.title	Subdifferential calculus rules for possibly nonconvex integral functions
dc.type	Artículo
uoh.revista	SIAM JOURNAL ON CONTROL AND OPTIMIZATION
dc.identifier.doi	10.1137/18M1176476
dc.citation.volume	58
dc.citation.issue	1
dc.identifier.orcid	Perez-Aros, Pedro/0000-0002-8756-3011
uoh.indizacion	Web of Science