Analysis of the Plancherel weight and factoriality of the group von Neumann algebras of non-unimodular almost unimodular groups

TL;DR

This paper investigates when the Plancherel weight on group von Neumann algebras is semifinite on subalgebras and characterizes factoriality for non-unimodular almost unimodular groups, providing explicit formulas and conditions.

Contribution

It offers a complete characterization of the semifiniteness of the Plancherel weight on subalgebras and criteria for factoriality of group von Neumann algebras in the non-unimodular setting.

Findings

Complete answer to when the Plancherel weight restriction is semifinite

Criteria for the von Neumann algebra to be a factor in almost unimodular groups

Explicit formula for the S-invariant when the algebra is a factor

Abstract

Let $G$ be a locally compact group, $L(G)$ be its group von Neumann algebra equipped with the Plancherel weight $\varphi_G$. In this paper, we consider the following two questions. (1) When is the restriction of $\varphi_G$ to the subalgebra generated by a closed subgroup $H$ semifinite? If so, is it equal (up to a constant) to $\varphi_H$? (2) When is $L(G)$ a factor? We give a complete answer to (1), and when $G$ is second countable, $G_1 := \text{ker}\Delta_G$ is open in $G$ (called almost unimodular) and admits a sufficiently large non-unimodular part, we provide an answer to (2). When $L(G)$ is a factor, we also provide the formula of the S-invariant of $L(G)$.