Louigi Addario-Berry, Simon Griffiths
Published 2010-12-18, updated 2011-11-07Version 3
For a fixed d-regular graph H, a random n-lift is obtained by replacing each vertex v of H by a "fibre" containing n vertices, then placing a uniformly random matching between fibres corresponding to adjacent vertices of H. We show that with extremely high probability, all eigenvalues of the lift that are not eigenvalues of H, have order O(sqrt(d)). In particular, if H is Ramanujan then its n-lift is with high probability nearly Ramanujan. We also show that any exceptionally large eigenvalues of the n-lift that are not eigenvalues of H, are overwhelmingly likely to have been caused by a dense subgraph of size O(|E(H)|).
Comments: 35 pages; substantially revised, constants in the main results improved
A new proof of Friedman's second eigenvalue Theorem and its extension to random lifts
A note on 1-2-3 and 1-2 Conjectures for 3-regular graphs
Spanning trees without adjacent vertices of degree 2
![QR code for arXiv:1012.4097 [math.CO]](http://oss.arxitics.com/images/favicon.svg)