# Spectral atoms of unimodular random trees

### Justin Salez

Université Paris Diderot, France

## Abstract

We use the Mass Transport Principle to analyze the local recursion governing the resolvent $(A−z)_{−1}$ of the adjacency operator of unimodular random trees. In the limit where the complex parameter $z$ approaches a given location $λ$ on the real axis, we show that this recursion induces a decomposition of the tree into finite blocks whose geometry directly determines the spectral mass at $λ$. We then exploit this correspondence to obtain precise information on the pure-point support of the spectrum, in terms of expansion properties of the tree. In particular, we deduce that the pure-point support of the spectrum of any unimodular random tree with minimum degree $δ≥3$ and maximum degree $Δ$ is restricted to finitely many points, namely the eigenvalues of trees of size less than $δ−2Δ−2 $. More generally, we show that the restriction $δ≥3$ can be weakened to $δ≥2$, as long as the anchored isoperimetric constant of the tree remains bounded away from 0. This applies in particular to any unimodular Galton–Watson tree without leaves, allowing us to settle a conjecture of Bordenave, Sen and Virág (2013). Finally, we produce explicit examples of non-regular trees whose spectrum is completely atom-free.

## Cite this article

Justin Salez, Spectral atoms of unimodular random trees. J. Eur. Math. Soc. 22 (2020), no. 2, pp. 345–363

DOI 10.4171/JEMS/923