Affiliation:
1. Department of Mathematics Cornell University Ithaca New York USA
2. Department of Mathematics Binghamton University Binghamton New York USA
Abstract
AbstractIn this note, we solve the “birthday problem” for loops on random regular graphs. Namely, for fixed , we prove that on a random ‐regular graph with vertices, as approaches infinity, with high probability: (i) almost all primitive nonbacktracking loops of length are simple, that is, do not self‐intersect, and (ii) almost all primitive nonbacktracking loops of length self‐intersect.
Subject
Geometry and Topology,Discrete Mathematics and Combinatorics