Alessandro Linzi scite author profile

Alessandro Linzi

4Publications

23Citation Statements Received

56Citation Statements Given

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Affiliations

University of Nova Gorica, University of Szczecin, Institute of Mathematics

Publications

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Caristi–Kirk and Oettli–Théra ball spaces and applications

Błaszkiewicz

Ćmiel

Linzi

et al. 2019

J. Fixed Point Theory Appl.

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Based on the theory of ball spaces introduced by Kuhlmann and Kuhlmann we introduce and study Caristi-Kirk and Oettli-Théra ball spaces. We show that if the underlying metric space is complete, then these have a very strong property: every ball contains a singleton ball. This fact provides quick proofs for several results which are equivalent to the Caristi-Kirk Fixed Point Theorem, namely Ekeland's Variational Principles, the Oettli-Théra Theorem, Takahashi's Theorem and the Flower Petal Theorem.2010 Mathematics Subject Classification. Primary 54H25; Secondary 47H09, 47H10.

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Orderings and valuations in hyperfields

Kuhlmann¹,

Linzi²,

Stojałowska³

2021

Preprint

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Orderings and valuations in hyperfields

2022

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Characteristic, C-Characteristic and Positive Cones in Hyperfields

2023

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We study the notions of the positive cone, characteristic and C-characteristic in (Krasner) hyperfields. We demonstrate how these interact in order to produce interesting results in the theory of hyperfields. For instance, we provide a criterion for deciding whether certain hyperfields cannot be obtained via Krasner’s quotient construction. We prove that any positive integer (larger than 1) can be realized as the characteristic of some infinite hyperfield and an analogous result for the C-characteristic. Finally, we study the (directed) graph associated with the strict partial order induced by a positive cone in a hyperfield in various examples.

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