Berge's theorem for noncompact image sets

Eugene A. Feinberg; Pavlo O. Kasyanov; Nina V. Zadoianchuk

doi:10.1016/j.jmaa.2012.07.051

Berge's theorem for noncompact image sets

Eugene A. Feinberg
, Pavlo O. Kasyanov
, Nina V. Zadoianchuk

Applied Mathematics and Statistics

National Technical University of Ukraine "Igor Sikorsky Kyiv Polytechnic Institute"

Research output: Contribution to journal › Article › peer-review

47 Scopus citations

Abstract

For an upper semi-continuous set-valued mapping from one topological space to another and for a lower semi-continuous function defined on the product of these spaces, Berge's theorem states lower semi-continuity of the minimum of this function taken over the image sets. It assumes that the image sets are compact. For Hausdorff topological spaces, this paper extends Berge's theorem to set-valued mappings with possible noncompact image sets and studies relevant properties of minima.

Original language	English
Pages (from-to)	255-259
Number of pages	5
Journal	Journal of Mathematical Analysis and Applications
Volume	397
Issue number	1
DOIs	https://doi.org/10.1016/j.jmaa.2012.07.051
State	Published - Jan 1 2013

Keywords

Berge's theorem
Continuity
Set-valued mapping

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10.1016/j.jmaa.2012.07.051

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abstract = "For an upper semi-continuous set-valued mapping from one topological space to another and for a lower semi-continuous function defined on the product of these spaces, Berge's theorem states lower semi-continuity of the minimum of this function taken over the image sets. It assumes that the image sets are compact. For Hausdorff topological spaces, this paper extends Berge's theorem to set-valued mappings with possible noncompact image sets and studies relevant properties of minima.",

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N2 - For an upper semi-continuous set-valued mapping from one topological space to another and for a lower semi-continuous function defined on the product of these spaces, Berge's theorem states lower semi-continuity of the minimum of this function taken over the image sets. It assumes that the image sets are compact. For Hausdorff topological spaces, this paper extends Berge's theorem to set-valued mappings with possible noncompact image sets and studies relevant properties of minima.

AB - For an upper semi-continuous set-valued mapping from one topological space to another and for a lower semi-continuous function defined on the product of these spaces, Berge's theorem states lower semi-continuity of the minimum of this function taken over the image sets. It assumes that the image sets are compact. For Hausdorff topological spaces, this paper extends Berge's theorem to set-valued mappings with possible noncompact image sets and studies relevant properties of minima.

KW - Berge's theorem

KW - Continuity

KW - Set-valued mapping

UR - https://www.scopus.com/pages/publications/84866291194

U2 - 10.1016/j.jmaa.2012.07.051

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JO - Journal of Mathematical Analysis and Applications

JF - Journal of Mathematical Analysis and Applications

IS - 1

ER -

Berge's theorem for noncompact image sets

Abstract

Keywords

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