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<OAI-PMH schemaLocation=http://www.openarchives.org/OAI/2.0/ http://www.openarchives.org/OAI/2.0/OAI-PMH.xsd> <responseDate>2018-01-17T12:03:10Z</responseDate> <request identifier=oai:HAL:hal-01630560v1 verb=GetRecord metadataPrefix=oai_dc>http://api.archives-ouvertes.fr/oai/hal/</request> <GetRecord> <record> <header> <identifier>oai:HAL:hal-01630560v1</identifier> <datestamp>2017-12-21</datestamp> <setSpec>type:ART</setSpec> <setSpec>subject:math</setSpec> <setSpec>collection:UNIV-AG</setSpec> <setSpec>collection:INSMI</setSpec> <setSpec>collection:BNRMI</setSpec> </header> <metadata><dc> <publisher>HAL CCSD</publisher> <title lang=en>Exact and inexact Hummel-Seebeck method for variational inclusions</title> <creator>Burnet, Steve</creator> <creator>Jean-Alexis, Célia</creator> <creator>Piétrus, Alain</creator> <contributor>Laboratoire de Mathématiques Informatique et Applications (LAMIA) ; Université des Antilles et de la Guyane (UAG)</contributor> <description>International audience</description> <source>ISSN: 2518-3680</source> <source>advances in analysis</source> <identifier>hal-01630560</identifier> <identifier>https://hal.archives-ouvertes.fr/hal-01630560</identifier> <source>https://hal.archives-ouvertes.fr/hal-01630560</source> <source>advances in analysis, 2017, 2 (4), pp.257-266. 〈10.22606〉</source> <identifier>DOI : 10.22606</identifier> <relation>info:eu-repo/semantics/altIdentifier/doi/10.22606</relation> <language>en</language> <subject lang=en>Set-valued mapping</subject> <subject lang=en> generalized equations</subject> <subject lang=en> semistability</subject> <subject lang=en> superquadratic convergence</subject> <subject lang=en> cubic convergence.</subject> <subject>[MATH] Mathematics [math]</subject> <type>info:eu-repo/semantics/article</type> <type>Journal articles</type> <description lang=en>We deal with a perturbed version of a Hummel-Seebeck type method to approximate a solution of variational inclusions of the form : 0 ∈ Φ(z) + F(z) where Φ is a single-valued function twice continuously Fréchet differentiable and F is a set-valued map from Rn to the closed subsets of Rn. This framework is convenient to treat in a unified way standard sequential quadratic programming, its stabilized version, sequential quadratically constrained quadratic programming, and linearly constrained Lagrangian methods (see [1]). We obtain, thanks to some semistability and another property (which is close to the hemistability) of the solution z ̄ of the previous inclusion, the local existence of a sequence that is superquadratically or cubically convergent.</description> <date>2017</date> </dc> </metadata> </record> </GetRecord> </OAI-PMH>