Fenchel Duality and a Separation Theorem on Hadamard Manifolds
Peer reviewed, Journal article
Accepted version
Permanent lenke
https://hdl.handle.net/11250/3054449Utgivelsesdato
2022Metadata
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- Institutt for matematiske fag [2474]
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Sammendrag
In this paper, we introduce a definition of Fenchel conjugate and Fenchel biconjugate on Hadamard manifolds based on the tangent bundle. Our definition overcomes the inconvenience that the conjugate depends on the choice of a certain point on the manifold, as previous definitions required. On the other hand, this new definition still possesses properties known to hold in the Euclidean case. It even yields a broader interpretation of the Fenchel conjugate in the Euclidean case itself. Most prominently, our definition of the Fenchel conjugate provides a Fenchel--Moreau theorem for geodesically convex, proper, lower semicontinuous functions. In addition, this framework allows us to develop a theory of separation of convex sets on Hadamard manifolds, and a strict separation theorem is obtained.