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Main Authors: Günther, Matthias, Klotz, Lutz
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.22488
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author Günther, Matthias
Klotz, Lutz
author_facet Günther, Matthias
Klotz, Lutz
contents The notions of infimum and maximal lower bounds of a set $\mathfrak M$ of bounded self-adjoint operators were mainly studied for a set $\mathfrak M$ of two elements. The present paper deals with more general sets $\mathfrak M$, where it is required that $\mathfrak M$ is nonempty and bounded from below. Kadison's theorem on the existence of the infimum of a two-element set is proved for a countable and weak-operator compact set $\mathfrak M$. Stott's recent results on the structure of the set of maximal lower bounds of a finite set of Hermitian matrices are discussed and partially generalized. We are also concerned with the greatest lower bound and maximal lower bounds under certain restrictions. It is shown that the set of all lower bounds of $\mathfrak M$ commuting with all elements of $\mathfrak M$ possesses the greatest element if $\mathfrak M$ is a set of pairwise commuting operators. The theorem of Moreland and Gudder on the existence of the greatest positive lower bound of a set of two positive matrices is extended to an arbitrary finite set of positive matrices.
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publishDate 2026
record_format arxiv
spellingShingle Remarks on infimum and maximal lower bounds of a set of bounded self-adjoint operators
Günther, Matthias
Klotz, Lutz
Functional Analysis
47A63 (Primary) 06F30 47A07 47A64 47B60 81Q10 (Secondary)
The notions of infimum and maximal lower bounds of a set $\mathfrak M$ of bounded self-adjoint operators were mainly studied for a set $\mathfrak M$ of two elements. The present paper deals with more general sets $\mathfrak M$, where it is required that $\mathfrak M$ is nonempty and bounded from below. Kadison's theorem on the existence of the infimum of a two-element set is proved for a countable and weak-operator compact set $\mathfrak M$. Stott's recent results on the structure of the set of maximal lower bounds of a finite set of Hermitian matrices are discussed and partially generalized. We are also concerned with the greatest lower bound and maximal lower bounds under certain restrictions. It is shown that the set of all lower bounds of $\mathfrak M$ commuting with all elements of $\mathfrak M$ possesses the greatest element if $\mathfrak M$ is a set of pairwise commuting operators. The theorem of Moreland and Gudder on the existence of the greatest positive lower bound of a set of two positive matrices is extended to an arbitrary finite set of positive matrices.
title Remarks on infimum and maximal lower bounds of a set of bounded self-adjoint operators
topic Functional Analysis
47A63 (Primary) 06F30 47A07 47A64 47B60 81Q10 (Secondary)
url https://arxiv.org/abs/2604.22488