English

Spectrum preserving short cycle removal on regular graphs

Data Structures and Algorithms 2020-02-19 v1 Discrete Mathematics Combinatorics

Abstract

We describe a new method to remove short cycles on regular graphs while maintaining spectral bounds (the nontrivial eigenvalues of the adjacency matrix), as long as the graphs have certain combinatorial properties. These combinatorial properties are related to the number and distance between short cycles and are known to happen with high probability in uniformly random regular graphs. Using this method we can show two results involving high girth spectral expander graphs. First, we show that given d3d \geq 3 and nn, there exists an explicit distribution of dd-regular Θ(n)\Theta(n)-vertex graphs where with high probability its samples have girth Ω(logd1n)\Omega(\log_{d - 1} n) and are ϵ\epsilon-near-Ramanujan; i.e., its eigenvalues are bounded in magnitude by 2d1+ϵ2\sqrt{d - 1} + \epsilon (excluding the single trivial eigenvalue of dd). Then, for every constant d3d \geq 3 and ϵ>0\epsilon > 0, we give a deterministic poly(n)(n)-time algorithm that outputs a dd-regular graph on Θ(n)\Theta(n)-vertices that is ϵ\epsilon-near-Ramanujan and has girth Ω(logn)\Omega(\sqrt{\log n}), based on the work of arXiv:1909.06988 .

Keywords

Cite

@article{arxiv.2002.07211,
  title  = {Spectrum preserving short cycle removal on regular graphs},
  author = {Pedro Paredes},
  journal= {arXiv preprint arXiv:2002.07211},
  year   = {2020}
}

Comments

21 pages

R2 v1 2026-06-23T13:44:31.981Z