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High-girth near-Ramanujan graphs with localized eigenvectors

Combinatorics 2019-08-13 v1 Discrete Mathematics Mathematical Physics math.MP Spectral Theory

Abstract

We show that for every prime dd and α(0,1/6)\alpha\in (0,1/6), there is an infinite sequence of (d+1)(d+1)-regular graphs G=(V,E)G=(V,E) with girth at least 2αlogd(V)(1od(1))2\alpha \log_{d}(|V|)(1-o_d(1)), second adjacency matrix eigenvalue bounded by (3/2)d(3/\sqrt{2})\sqrt{d}, and many eigenvectors fully localized on small sets of size O(Vα)O(|V|^\alpha). This strengthens the results of Ganguly-Srivastava, who constructed high girth (but not expanding) graphs with similar properties, and may be viewed as a discrete analogue of the "scarring" phenomenon observed in the study of quantum ergodicity on manifolds. Key ingredients in the proof are a technique of Kahale for bounding the growth rate of eigenfunctions of graphs, discovered in the context of vertex expansion and a method of Erd\H{o}s and Sachs for constructing high girth regular graphs.

Keywords

Cite

@article{arxiv.1908.03694,
  title  = {High-girth near-Ramanujan graphs with localized eigenvectors},
  author = {Noga Alon and Shirshendu Ganguly and Nikhil Srivastava},
  journal= {arXiv preprint arXiv:1908.03694},
  year   = {2019}
}
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