A convex-analytical approach to extension results for \(n\)-cyclically monotone operators
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Publication:2460927
DOI10.1007/s11228-006-0029-1zbMath1133.47037OpenAlexW2072061258MaRDI QIDQ2460927
Heinz H. Bauschke, Shawn Xianfu Wang
Publication date: 19 November 2007
Published in: Set-Valued Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11228-006-0029-1
Related Items (5)
A class of non-associated materials: \(n\)-monotone materials -- Hooke's law of elasticity revisited ⋮ Autoconjugate representers for linear monotone operators ⋮ On cyclic and \(n\)-cyclic monotonicity of bifunctions ⋮ An explicit example of a maximal 3-cyclically monotone operator with bizarre properties ⋮ On extension results for \(n\)-cyclically monotone operators in reflexive Banach spaces
Cites Work
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- The relevance of convex analysis for the study of monotonicity
- Ein Erweiterungssatz für monotone Mengen
- Techniques of variational analysis
- Fenchel duality, Fitzpatrick functions and the extension of firmly nonexpansive mappings
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- Fenchel duality, Fitzpatrick functions and the Kirszbraun–Valentine extension theorem
- Maximal monotonicity, conjugation and the duality product
- A new proof for Rockafellar’s characterization of maximal monotone operators
- Convex Analysis
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