Tight decomposition of factors and the single generation problem

Sorin Popa

arXiv:1910.14653·math.OA·June 18, 2020

Tight decomposition of factors and the single generation problem

Sorin Popa

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TL;DR

This paper explores the stable single generation property of II$_1$ factors, proposing a conjecture that such factors admit a tight decomposition involving hyperfinite subfactors, and discusses related theoretical results.

Contribution

It introduces a conjecture linking stable single generation to tight decompositions with hyperfinite subfactors and discusses potential approaches and related results.

Findings

01

Proposed a conjecture connecting SSG property with tight decompositions.

02

Discussed potential methods to prove the conjecture.

03

Proved some related theoretical results.

Abstract

A II $_{1}$ factor $M$ has the {\it stable single generation} ({\it SSG}) property if any amplification $M^{t}$ , $t > 0$ , can be generated as a von Neumann algebra by a single element. We discuss a conjecture stating that if $M$ is SSG, then $M$ has a {\it tight} decomposition, i.e., there exists a pair of hyperfinite II $_{1}$ subfactors $R_{0}, R_{1} \subset M$ such that $R_{0} \lor R_{1}^{o p} = \Cal B (L^{2} M)$ . We explain why this conjecture is interesting and discuss possible approaches to prove it. We also prove some related results.

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Taxonomy

TopicsAdvanced Operator Algebra Research