The top eigenvalue of uniformly random trees
Abstract
Let be a uniformly random tree with vertex set , let be the largest vertex degree in , and let be the eigenvalues of its adjacency matrix, arranged in decreasing order. We prove that in expectation as , and additionally prove probability tail bounds for . Writing for any median of , we also prove that in expectation, uniformly over , for any fixed . The proof is based on the trace method and thus on counting closed walks in a random tree. To this end, we develop novel combinatorial tools for encoding walks in trees that we expect will find other applications. In order to apply these tools, we show that uniformly random trees -- after appropriate "surgery" -- satisfy, with high probability, the properties required for the combinatorial bounds to be effective.
Keywords
Cite
@article{arxiv.2403.08443,
title = {The top eigenvalue of uniformly random trees},
author = {Louigi Addario-Berry and Gábor Lugosi and Roberto Imbuzeiro Oliveira},
journal= {arXiv preprint arXiv:2403.08443},
year = {2024}
}
Comments
40 pages, 4 figures