Bound on shortest cycle covers

TL;DR

This paper improves the upper bound on the shortest cycle cover length in bridgeless graphs, reducing it from 5/3 times the number of edges to approximately 1.6111 times, and confirms Fan's conjecture related to 4-flows.

Contribution

It establishes a tighter upper bound on cycle cover length for bridgeless graphs, advancing the understanding of cycle covers and confirming Fan's conjecture on 4-flows.

Findings

New upper bound: cc(G) < 29/18 m + 1/18 n_2

Improved bound for minimum degree ≥ 3: cc(G) < 1.6258 m

Confirmed Fan's conjecture on 4-flows in certain graphs

Abstract

Assume $G$ is a bridgeless graph. A cycle cover of $G$ is a collection of cycles of $G$ such that each edge of $G$ is contained in at least one of the cycles. The length of a cycle cover of $G$ is the sum of the lengths of the cycles in the cover. The minimum length of a cycle cover of $G$ is denoted by $cc(G)$. It was proved independently by Alon and Tarsi and by Bermond, Jackson, and Jaeger that $cc(G)\le \frac{5}{3}m$ for every bridgeless graph $G$ with $m$ edges. This remained the best-known upper bound for $cc(G)$ for 40 years. In this paper, we prove that if $G$ is a bridgeless graph with $m$ edges and $n_2$ vertices of degree $2$, then $cc(G) < \frac{29}{18}m+ \frac 1{18}n_2$. As a consequence, we show that $cc(G) \le \frac 53 m - \frac 1{42} \log m$. The upper bound $ cc(G) < \frac{29}{18}m \approx 1.6111 m$ for bridgeless graphs $G$ of minimum degree at least 3 improves the previous known upper bound $1.6258m$. A key lemma used in the proof confirms Fan's conjecture that if $C$ is a circuit of $G$ and $G/C$ admits a nowhere zero 4-flow, then $G$ admits a 4-flow $f$ such that $E(G)-E(C)\subseteq \text{supp} (f)$ and $|\textrm{supp}(f)\cap E(C)|>\frac{3}{4}|E(C)|$.