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Main Author: Gould, Miles
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2412.06707
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author Gould, Miles
author_facet Gould, Miles
contents In 1946, Garrett Birkhoff proved that the $n\times n$ doubly stochastic matrices comprise the convex hull of the $n\times n$ permutation matrices, which in turn make up the extreme points of this polytope. He proposed his problem 111, which asks whether there exists a topology on infinite matrices for which this applies to the closed convex hull of the $\mathbb{N}\times\mathbb{N}$ permutation matrices. As Isbell showed in 1955, this equality is not achieved in the line-sum norm. In this paper, we use the domain of operator theory, and its many topologies, to improve on his negative result by showing that Birkhoff's problem is not solved in any of these topologies. In Kendall's 1960 paper on this problem, he gave an answer to the affirmative, as well as a topology for which closed convex hull comprises the doubly substochastic matrices. We also show that Kendall's secondary theorem also applies for all the locally convex Hausdorff topologies finer than than Kendall's (namely that of entry-wise convergence) which make the continuous dual of the matrix space no larger than the predual of the von Neumann algebra containing them. We then show that this is a theoretical upper limit topologies with this closure property. We also discuss the exposed points of this hull for these several topologies. Moreover, we show that, in these topologies, the closed affine hull of these permutation matrices comprise all operators with real-entry matrix coefficients.
format Preprint
id arxiv_https___arxiv_org_abs_2412_06707
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle An Operator Theoretic Approach to Birkhoff's Problem 111
Gould, Miles
Operator Algebras
Functional Analysis
Representation Theory
47L07 (Primary), 15A51 (Secondary)
In 1946, Garrett Birkhoff proved that the $n\times n$ doubly stochastic matrices comprise the convex hull of the $n\times n$ permutation matrices, which in turn make up the extreme points of this polytope. He proposed his problem 111, which asks whether there exists a topology on infinite matrices for which this applies to the closed convex hull of the $\mathbb{N}\times\mathbb{N}$ permutation matrices. As Isbell showed in 1955, this equality is not achieved in the line-sum norm. In this paper, we use the domain of operator theory, and its many topologies, to improve on his negative result by showing that Birkhoff's problem is not solved in any of these topologies. In Kendall's 1960 paper on this problem, he gave an answer to the affirmative, as well as a topology for which closed convex hull comprises the doubly substochastic matrices. We also show that Kendall's secondary theorem also applies for all the locally convex Hausdorff topologies finer than than Kendall's (namely that of entry-wise convergence) which make the continuous dual of the matrix space no larger than the predual of the von Neumann algebra containing them. We then show that this is a theoretical upper limit topologies with this closure property. We also discuss the exposed points of this hull for these several topologies. Moreover, we show that, in these topologies, the closed affine hull of these permutation matrices comprise all operators with real-entry matrix coefficients.
title An Operator Theoretic Approach to Birkhoff's Problem 111
topic Operator Algebras
Functional Analysis
Representation Theory
47L07 (Primary), 15A51 (Secondary)
url https://arxiv.org/abs/2412.06707