Invertibles in topological rings: a new approach

García-Pacheco, Francisco Javier; Miralles, Alejandro; Murillo‐Arcila, Marina

doi:10.1007/s13398-021-01183-4

RACSAM

2021

DOI: 10.1007/s13398-021-01183-4

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Invertibles in topological rings: a new approach

Francisco Javier García-Pacheco

Alejandro Miralles

Marina Murillo‐Arcila

Abstract: Every element in the boundary of the group of invertibles of a Banach algebra is a topological zero divisor. We extend this result to the scope of topological rings. In particular, we define a new class of semi-normed rings, called almost absolutely semi-normed rings, which strictly includes the class of absolutely semi-valued rings, and prove that every element in the boundary of the group of invertibles of a complete almost absolutely semi-normed ring is a topological zero divisor. To achieve all these, we h… Show more

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Cited by 2 publications

References 19 publications

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Pareto vectors of continuous linear operators

García-Pacheco

2023

J Inequal Appl

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The intersection of all zero-neighborhoods in a topological module over a topological ring is a bounded and closed submodule whose inherited topology is the trivial topology. In this manuscript, we prove that this is the smallest closed submodule and thus replaces the null submodule in the Hausdorff setting. This fact motivates to introduce a new notion in operator theory called topological kernel. Another new concept is also defined that of Pareto optimal element for a family of continuous linear operators between topological modules. It is then proved that topological kernels have a strong influence on the existence of Pareto optimal elements. This work is strongly motivated by the ongoing search for a consistent operator theory on topological modules over general topological rings.

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Pareto vectors of continuous linear operators

García-Pacheco

2023

J Inequal Appl

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On absolutely invertibles

García-Pacheco,

de los Ángeles Moreno-Frías,

Murillo-Arcila

2024

era

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<p>In this manuscript, the notion of absolutely invertible was extended consistently from semi-normed rings to the class of general topological rings. Then, the closure of the absolutely invertibles multiplied by a certain element was proved to be contained in the set of topological divisors of the element. Also, a sufficient condition for the closed unit ball of a complete unital normed ring to become a closed unit neighborhood of zero was found. Finally, two applications to classical operator theory were provided, i.e., every Banach space of dimension of at least $ 2 $ could be equivalently re-normed in such a way that the group of surjective linear isometries was not a normal subgroup of the group of isomorphisms, and every infinite-dimensional Banach space, containing a proper complemented subspace isomorphic to it, could be equivalently re-normed so that the set of surjective linear operators was not dense in the Banach algebra of bounded linear operators.</p>

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Invertibles in topological rings: a new approach

Cited by 2 publications

References 19 publications

Pareto vectors of continuous linear operators

Pareto vectors of continuous linear operators

On absolutely invertibles

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