КФУ. Карточка публикации. An Inexact Penalty Method for Non Stationary Generalized Variational Inequalities

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AN INEXACT PENALTY METHOD FOR NON STATIONARY GENERALIZED VARIATIONAL INEQUALITIES

Форма представления

Статьи в зарубежных журналах и сборниках

Год публикации

2015

Язык

английский

Авторы, сотрудники КФУ

Коннов Игорь Васильевич, автор

Библиографическое описание на языке оригинала

Konnov I.V. An Inexact Penalty Method for Non Stationary Generalized Variational Inequalities//Set-Valued and Variational Analysis. - 2015. - V.23, No 2. - P. 239-248.

Аннотация

We consider a set-valued (generalized) variational inequality problem in a finite-dimensional setting, where only approximation sequences are known instead of exact values of the cost mapping and feasible set. We suggest to apply a sequence of inexact solutions of auxiliary problems involving general penalty functions. Its convergence is attained without concordance of penalty, accuracy, and approximation parameters under certain coercivity type conditions.

Ключевые слова

Variational inequality, non-stationarity, non-monotone mappings, set-valued mappinngs

Название журнала

SET-VALUED AND VARIATIONAL ANALYSIS

URL

http://link.springer.com/article/10.1007%2Fs11228-014-0293-4

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https://repository.kpfu.ru/?p_id=120050

Полная запись метаданных

Поле DC	Значение	Язык
dc.contributor.author	Коннов Игорь Васильевич	ru_RU
dc.date.accessioned	2015-01-01T00:00:00Z	ru_RU
dc.date.available	2015-01-01T00:00:00Z	ru_RU
dc.date.issued	2015	ru_RU
dc.identifier.citation	Konnov I.V. An Inexact Penalty Method for Non Stationary Generalized Variational Inequalities//Set-Valued and Variational Analysis. - 2015. - V.23, No 2. - P. 239-248.	ru_RU
dc.identifier.uri	https://repository.kpfu.ru/?p_id=120050	ru_RU
dc.description.abstract	SET-VALUED AND VARIATIONAL ANALYSIS	ru_RU
dc.description.abstract	We consider a set-valued (generalized) variational inequality problem in a finite-dimensional setting, where only approximation sequences are known instead of exact values of the cost mapping and feasible set. We suggest to apply a sequence of inexact solutions of auxiliary problems involving general penalty functions. Its convergence is attained without concordance of penalty, accuracy, and approximation parameters under certain coercivity type conditions.	ru_RU
dc.language.iso	ru	ru_RU
dc.subject	Variational inequality	ru_RU
dc.subject	non-stationarity	ru_RU
dc.subject	non-monotone mappings	ru_RU
dc.subject	set-valued mappinngs	ru_RU
dc.title	An Inexact Penalty Method for Non Stationary Generalized Variational Inequalities	ru_RU
dc.type	Статьи в зарубежных журналах и сборниках	ru_RU