Graphs, Disjoint Matchings and Some Inequalities

TL;DR

This paper investigates bounds on maximum k-edge-colorable subgraphs in cubic and claw-free graphs, establishing new inequalities and improving existing bounds, especially for bridgeless and claw-free cases, with implications for graphs with limited cycles.

Contribution

It introduces new inequalities relating  and  parameters, improves bounds for claw-free and bridgeless cubic graphs, and proposes conjectures for bipartite and nearly bipartite graphs.

Findings

Established   bounds for cubic graphs.

Improved lower bounds for claw-free bridgeless cubic graphs.

Proposed conjectures for bipartite and nearly bipartite graphs.

Abstract

For $k \geq 1$ and a graph $G$ let $\nu_k(G)$ denote the size of a maximum $k$-edge-colorable subgraph of $G$. Mkrtchyan, Petrosyan and Vardanyan proved that $\nu_2(G)\geq \frac45\cdot |V(G)|$, $\nu_3(G)\geq \frac76\cdot |V(G)|$ for any cubic graph $G$ ~\cite{samvel:2010}. They were also able to show that if $G$ is a cubic graph, then $\nu_2(G)+\nu_3(G)\geq 2\cdot |V(G)|$ ~\cite{samvel:2014} and $\nu_2(G) \leq \frac{|V(G)| + 2\cdot \nu_3(G)}{4}$ ~\cite{samvel:2010}. In the first part of the present work, we show that the last two inequalities imply the first two of them. Moreover, we show that $\nu_2(G) \geq \alpha \cdot \frac{|V(G)| + 2\cdot \nu_3(G)}{4} $, where $\alpha=\frac{16}{17}$, if $G$ is a cubic graph, $\alpha=\frac{20}{21}$, if $G$ is a cubic graph containing a perfect matching, $\alpha=\frac{44}{45}$, if $G$ is a bridgeless cubic graph. We also investigate the parameters $\nu_2(G)$ and $\nu_3(G)$ in the class of claw-free cubic graphs. We improve the lower bounds for $\nu_2(G)$ and $\nu_3(G)$ for claw-free bridgeless cubic graphs to $\nu_2(G)\geq \frac{35}{36}\cdot |V(G)|$ ($n \geq 48$), $\nu_3(G)\geq \frac{43}{45}\cdot |E(G)|$. On the basis of these inequalities we are able to improve the coefficient $\alpha$ for bridgeless claw-free cubic graphs. In the second part of the work, we prove lower bounds for $\nu_k(G)$ in terms of $\frac{\nu_{k-1}(G)+\nu_{k+1}(G)}{2}$ for $k\geq 2$ and graphs $G$ containing at most $1$ cycle. We also present the corresponding conjectures for bipartite and nearly bipartite graphs.