English

A note on Gupta's co-density conjecture

Combinatorics 2023-04-14 v1

Abstract

Let GG be a multigraph. A subset FF of E(G)E(G) is an edge cover of GG if every vertex of GG is incident to an edge of FF. The cover index, ξ(G)\xi(G), is the largest number of edge covers into which the edges of GG can be partitioned. Clearly ξ(G)δ(G)\xi(G) \le \delta(G), the minimum degree of GG. For UV(G)U\subseteq V(G), denote by E+(U)E^+(U) the set of edges incident to a vertex of UU. When U|U| is odd, to cover all the vertices of UU, any edge cover needs to contain at least (U+1)/2(|U|+1)/2 edges from E+(U)E^+(U), indicating ξ(G)E+(U)/(U+1)/2 \xi(G) \le |E^+(U)|/ (|U|+1)/2. Let ρc(G)\rho_c(G), the co-density of GG, be defined as the minimum of E+(U)/((U+1)/2)|E^+(U)|/((|U|+1)/2) ranging over all UV(G)U\subseteq V(G) with U|U| odd and at least 3. Then ρc(G)\rho_c(G) provides another upper bound on ξ(G)\xi(G). Thus ξ(G)min{δ(G),ρc(G)}\xi(G) \le \min\{\delta(G), \lfloor \rho_c(G) \rfloor \}. For a lower bound on ξ(G)\xi(G), in 1967, Gupta conjectured that ξ(G)min{δ(G)1,ρc(G)}\xi(G) \ge \min\{\delta(G)-1, \lfloor \rho_c(G) \rfloor \}. Gupta showed that the conjecture is true when GG is simple, and Cao et al. verified this conjecture when ρc(G)\rho_c(G) is not an integer. In this note, we confirm the conjecture when the maximum multiplicity of GG is at most two or min{δ(G)1,ρc(G)}6 \min\{\delta(G)-1, \lfloor \rho_c(G) \rfloor \} \le 6.

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Cite

@article{arxiv.2304.06651,
  title  = {A note on Gupta's co-density conjecture},
  author = {Guantao Chen and Songling Shan},
  journal= {arXiv preprint arXiv:2304.06651},
  year   = {2023}
}
R2 v1 2026-06-28T10:05:02.385Z