The distribution of the number of cycles in directed and undirected random 2-regular graphs

TL;DR

This paper analytically characterizes the distribution of the number of cycles in directed and undirected random 2-regular graphs, revealing Poisson convergence and extending known combinatorial results.

Contribution

It provides the first analytical results for cycle distributions in undirected 2-regular graphs, extending existing knowledge from directed cases.

Findings

Cycle count distribution converges to Poisson for large N.

Mean number of cycles scales with ln N.

Directed case matches cycle permutations in random permutations.

Abstract

We present analytical results for the distribution of the number of cycles in directed and undirected random 2-regular graphs (2-RRGs) consisting of $N$ nodes. In directed 2-RRGs each node has one inbound link and one outbound link, while in undirected 2-RRGs each node has two undirected links. Since all the nodes are of degree $k=2$, the resulting networks consist of cycles. These cycles exhibit a broad spectrum of lengths, where the average length of the shortest cycle in a random network instance scales with $\ln N$, while the length of the longest cycle scales with $N$. The number of cycles varies between different network instances in the ensemble, where the mean number of cycles $\langle S \rangle$ scales with $\ln N$. Here we present exact analytical results for the distribution $P_N(S=s)$ of the number of cycles $s$ in ensembles of directed and undirected 2-RRGs, expressed in terms of the Stirling numbers of the first kind. In both cases the distributions converge to a Poisson distribution in the large $N$ limit. The moments and cumulants of $P_N(S=s)$ are also calculated. The statistical properties of directed 2-RRGs are equivalent to the combinatorics of cycles in random permutations of $N$ objects. In this context our results recover and extend known results. In contrast, the statistical properties of cycles in undirected 2-RRGs have not been studied before.