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Main Author: Aoyama, Takanobu
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2303.11383
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author Aoyama, Takanobu
author_facet Aoyama, Takanobu
contents A vector topology on a vector space over a topological field is a (not necessarily Hausdorff) topology by which the addition and scalar multiplication are continuous. We prove that, if an isomorphism between the lattice of topologies of two vector spaces preserves vector topologies, then the isomorphism is induced by a translation, a semilinear isomorphism and the complement map. As a consequence, if such an isomorphism exists, the coefficient fields are isomorphic as topological fields and these vector spaces have the same dimension. We also prove a similar rigidity result for an isomorphism between the lattice of vector topologies which preserves Hausdorff vector topologies. These results are obtained by using the fundamental theorems of affine and projective geometries.
format Preprint
id arxiv_https___arxiv_org_abs_2303_11383
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle On Rigidity of Lattice of Topologies Containing Vector Topologies on Vector Spaces
Aoyama, Takanobu
General Topology
Primary 54A10, Secondary 57N17, 51A10
A vector topology on a vector space over a topological field is a (not necessarily Hausdorff) topology by which the addition and scalar multiplication are continuous. We prove that, if an isomorphism between the lattice of topologies of two vector spaces preserves vector topologies, then the isomorphism is induced by a translation, a semilinear isomorphism and the complement map. As a consequence, if such an isomorphism exists, the coefficient fields are isomorphic as topological fields and these vector spaces have the same dimension. We also prove a similar rigidity result for an isomorphism between the lattice of vector topologies which preserves Hausdorff vector topologies. These results are obtained by using the fundamental theorems of affine and projective geometries.
title On Rigidity of Lattice of Topologies Containing Vector Topologies on Vector Spaces
topic General Topology
Primary 54A10, Secondary 57N17, 51A10
url https://arxiv.org/abs/2303.11383