A generalized variational principle and its application to equilibrium problems (Q1949583)

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scientific article; zbMATH DE number 6161544
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English
A generalized variational principle and its application to equilibrium problems
scientific article; zbMATH DE number 6161544

    Statements

    title
    A generalized variational principle and its application to equilibrium problems (English)
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    author
    Csaba Farkas
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    Andrea Éva Molnár
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    publication date
    8 May 2013
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    review text
    The authors prove an extended version of the Ekeland variational principle for nonlinear equilibrium problems (EPs) in complete metric spaces, which admits perturbation functions. The cost bi-function should satisfy a triangle type inequality. This allows them to obtain an existence result for EPs in Euclidean spaces without convexity assumptions and to derive localization bounds for approximate equilibrium points. Next, extensions of these results for EPs on Cartesian product sets are also presented.
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    zbMATH Keywords
    equilibrium problems
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    complete metric spaces
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    Ekeland-type variational principles
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    approximate solutions
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    Identifiers

    Mathematics Subject Classification ID
    90C33
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    58E30
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    47J30
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    49J40
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    47J20
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    zbMATH DE Number
    6161544
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    OpenAlex ID
    W2049812339
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