A computational approach to the Thompson group $F$

TL;DR

This paper uses extensive numerical computations to estimate the norms related to the Thompson group F, providing insights into its long-standing open problem of amenability.

Contribution

The paper introduces a computational approach to estimate operator norms in the group ring of F, offering new numerical bounds relevant to its amenability.

Findings

Estimated ||I+A+B|| approximately 2.95

Estimated ||A+A^{-1}+B+B^{-1}|| approximately 3.87

Provided spectral distribution estimates for key operators

Abstract

Let $F$ denote the Thompson group with standard generators $A=x_0$, $B=x_1$. It is a long standing open problem whether $F$ is an amenable group. By a result of Kesten from 1959, amenability of $F$ is equivalent to $$(i)\qquad ||I+A+B||=3$$ and to $$(ii)\qquad ||A+A^{-1}+B+B^{-1}||=4,$$ where in both cases the norm of an element in the group ring $\mathbb{C} F$ is computed in $B(\ell^2(F))$ via the regular representation of $F$. By extensive numerical computations, we obtain precise lower bounds for the norms in $(i)$ and $(ii)$, as well as good estimates of the spectral distributions of $(I+A+B)^*(I+A+B)$ and of $A+A^{-1}+B+B^{-1}$ with respect to the tracial state $\tau$ on the group von Neumann Algebra $L(F)$. Our computational results suggest, that $$||I+A+B||\approx 2.95 \qquad ||A+A^{-1}+B+B^{-1}||\approx 3.87.$$ It is however hard to obtain precise upper bounds for the norms, and our methods cannot be used to prove non-amenability of $F$.