# Quantum Ergodicity on Graphs : from Spectral to Spatial Delocalization

**Authors:** Nalini Anantharaman (IRMA), Mostafa Sabri (IRMA)

arXiv: 1704.02766 · 2019-03-06

## TL;DR

This paper establishes a quantum-ergodicity theorem for eigenfunctions on large graphs with Schr"odinger operators, linking spectral properties of the infinite model to spatial delocalization in finite approximations.

## Contribution

It proves quantum ergodicity for graphs with a local weak limit, connecting spectral properties of the infinite model to eigenfunction delocalization on finite graphs.

## Key findings

- Eigenfunctions become equidistributed in phase space.
- Absolutely continuous spectrum implies spatial delocalization.
- Results apply to graphs converging to the Anderson model on a regular tree.

## Abstract

We prove a quantum-ergodicity theorem on large graphs, for eigenfunctions of Schr\"odinger operators in a very general setting. We consider a sequence of finite graphs endowed with discrete Schr\"odinger operators, assumed to have a local weak limit. We assume that our graphs have few short loops, in other words that the limit model is a random rooted tree endowed with a random discrete Schr\"odinger operator. We show that absolutely continuous spectrum for the infinite model, reinforced by a good control of the moments of the Green function, imply "quantum ergodicity", a form of spatial delocalization for eigenfunctions of the finite graphs approximating the tree. This roughly says that the eigenfunctions become equidistributed in phase space. Our result applies in particular to graphs converging to the Anderson model on a regular tree, in the r\'egime of extended states studied by Klein and Aizenman-Warzel.

## Full text

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## References

48 references — full list in the complete paper: https://tomesphere.com/paper/1704.02766/full.md

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Source: https://tomesphere.com/paper/1704.02766