# On Gupta's Co-density Conjecture

**Authors:** Yan Cao, Guantao Chen, Guoli Ding, Guangming Jing, Wenan Zang

arXiv: 1906.06458 · 2019-06-18

## TL;DR

This paper investigates Gupta's co-density conjecture related to edge-colorings in multigraphs, providing partial proofs and linking it to other longstanding conjectures in graph theory.

## Contribution

The authors prove bounds on the cover index based on co-density, confirming Gupta's conjecture in specific cases and connecting it to earlier conjectures.

## Key findings

- Proved the conjecture when co-density is not an integer.
- Established the conjecture with a one-unit relaxation when co-density is an integer.
- Linked the co-density conjecture to Gupta's earlier cover index conjecture.

## Abstract

Let $G=(V,E)$ be a multigraph. The {\em cover index} $\xi(G)$ of $G$ is the greatest integer $k$ for which there is a coloring of $E$ with $k$ colors such that each vertex of $G$ is incident with at least one edge of each color. Let $\delta(G)$ be the minimum degree of $G$ and let $\Phi(G)$ be the {\em co-density} of $G$, defined by \[\Phi(G)=\min \Big\{\frac{2|E^+(U)|}{|U|+1}:\,\, U \subseteq V, \,\, |U|\ge 3 \hskip 2mm {\rm and \hskip 2mm odd} \Big\},\] where $E^+(U)$ is the set of all edges of $G$ with at least one end in $U$. It is easy to see that $\xi(G) \le \min\{\delta(G), \lfloor \Phi(G) \rfloor\}$. In 1978 Gupta proposed the following co-density conjecture: Every multigraph $G$ satisfies $\xi(G)\ge \min\{\delta(G)-1, \, \lfloor \Phi(G) \rfloor\}$, which is the dual version of the Goldberg-Seymour conjecture on edge-colorings of multigraphs. In this note we prove that $\xi(G)\ge \min\{\delta(G)-1, \, \lfloor \Phi(G) \rfloor\}$ if $\Phi(G)$ is not integral and $\xi(G)\ge \min\{\delta(G)-2, \, \lfloor \Phi(G) \rfloor-1\}$ otherwise. We also show that this co-density conjecture implies another conjecture concerning cover index made by Gupta in 1967.

## Full text

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## References

12 references — full list in the complete paper: https://tomesphere.com/paper/1906.06458/full.md

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Source: https://tomesphere.com/paper/1906.06458