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Autore principale: Valent, Tullio
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2409.06574
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author Valent, Tullio
author_facet Valent, Tullio
contents The initial part of this paper is devoted to the notion of pseudo-seminorm on a vector space $E$. We prove that the topology of every topological vector space is defined by a family of pseudo-seminorms (and so, as it is known, it is uniformizable). Then we devote ourselves to the Lipschitz vector structures on $E$, that is those Lipschitz structures on $E$ for which the addition is a Lipschitz map, while the scalar multiplication is a locally Lipschitz map, and we prove that any topological vector structure on $E$ is associated to some Lipschitz vector structure. Afterwards, we attend to the bornological Lipschitz maps. The final part of the article is devoted to the Lipschitz vector structures compatible with locally convex topologies on $E$.
format Preprint
id arxiv_https___arxiv_org_abs_2409_06574
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Lipschitz vector spaces
Valent, Tullio
General Topology
15A03 (Primary) 46Axx (Secondary)
The initial part of this paper is devoted to the notion of pseudo-seminorm on a vector space $E$. We prove that the topology of every topological vector space is defined by a family of pseudo-seminorms (and so, as it is known, it is uniformizable). Then we devote ourselves to the Lipschitz vector structures on $E$, that is those Lipschitz structures on $E$ for which the addition is a Lipschitz map, while the scalar multiplication is a locally Lipschitz map, and we prove that any topological vector structure on $E$ is associated to some Lipschitz vector structure. Afterwards, we attend to the bornological Lipschitz maps. The final part of the article is devoted to the Lipschitz vector structures compatible with locally convex topologies on $E$.
title Lipschitz vector spaces
topic General Topology
15A03 (Primary) 46Axx (Secondary)
url https://arxiv.org/abs/2409.06574