# Banach space actions and $L^2$-spectral gap

**Authors:** Tim de Laat, Mikael de la Salle

arXiv: 1705.03296 · 2021-02-24

## TL;DR

This paper extends spectral gap criteria for property (T) from Hilbert spaces to uniformly curved Banach spaces, applying to random groups and providing new spectral estimates.

## Contribution

It generalizes Żuk's spectral gap criterion for property (T) to Banach spaces beyond Hilbert spaces, including $L^p$ spaces, and applies to random groups in the triangular density model.

## Key findings

- Spectral gap criteria for Banach space actions established.
- Results apply to random groups with density > 1/3.
- New spectral estimates for $p$-Laplacian and Erdős-Rényi graphs.

## Abstract

\.{Z}uk proved that if a finitely generated group admits a Cayley graph such that the Laplacian on the links of this Cayley graph has a spectral gap $> \frac{1}{2}$, then the group has property (T), or equivalently, every affine isometric action of the group on a Hilbert space has a fixed point. We prove that the same holds for affine isometric actions of the group on a uniformly curved Banach space (for example an $L^p$-space with $1 < p < \infty$ or an interpolation space between a Hilbert space and an arbitrary Banach space) as soon as the Laplacian on the links has a two-sided spectral gap $>1-\varepsilon$.   This criterion applies to random groups in the triangular density model for densities $> \frac{1}{3}$. In this way, we are able to generalize recent results of Dru\c{t}u and Mackay to affine isometric actions of random groups on uniformly curved Banach spaces. Also, in the setting of actions on $L^p$-spaces, our results are quantitatively stronger, even in the case $p=2$. This naturally leads to new estimates on the conformal dimension of the boundary of random groups in the triangular model.   Additionally, we obtain results on the eigenvalues of the $p$-Laplacian on graphs, and on the spectrum and degree distribution of Erd\H{o}s-R\'enyi graphs.

## Full text

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## References

50 references — full list in the complete paper: https://tomesphere.com/paper/1705.03296/full.md

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Source: https://tomesphere.com/paper/1705.03296