Introduction to Sofic and Hyperlinear groups and Connes' embedding conjecture

TL;DR

This paper introduces core concepts and recent progress in the study of sofic and hyperlinear groups, and the Connes embedding conjecture, highlighting their significance across various mathematical fields and open problems.

Contribution

It provides a clear, accessible overview of key results and open questions in the theory of sofic, hyperlinear groups, and the Connes embedding conjecture, including pedagogical explanations of ultrafilters and ultraproducts.

Findings

Several longstanding conjectures settled for sofic/hyperlinear groups

Open problems remain about existence of non-sofic groups

Connections established between group approximation properties and operator algebras

Abstract

Sofic and hyperlinear groups are the countable discrete groups that can be approximated in a suitable sense by finite symmetric groups and groups of unitary matrices. These notions turned out to be very deep and fruitful, and stimulated in the last 15 years an impressive amount of research touching several seemingly distant areas of mathematics including geometric group theory, operator algebras, dynamical systems, graph theory, and more recently even quantum information theory. Several longstanding conjectures that are still open for arbitrary groups were settled in the case of sofic or hyperlinear groups. These achievements aroused the interest of an increasing number of researchers into some fundamental questions about the nature of these approximation properties. Many of such problems are to this day still open such as, outstandingly: Is there any countable discrete group that is not sofic or hyperlinear? A similar pattern can be found in the study of II_1 factors. In this case the famous conjecture due to Connes (commonly known as the Connes embedding conjecture) that any II_1 factor can be approximated in a suitable sense by matrix algebras inspired several breakthroughs in the understanding of II_1 factors, and stands out today as one of the major open problems in the field. The aim of these notes is to present in a uniform and accessible way some cornerstone results in the study of sofic and hyperlinear groups and the Connes embedding conjecture. The presentation is nonetheless self contained and accessible to any student or researcher with a graduate level mathematical background. An appendix by V. Pestov provides a pedagogically new introduction to the concepts of ultrafilters, ultralimits, and ultraproducts for those mathematicians who are not familiar with them, and aiming to make these concepts appear very natural.