English

Identifying codes in graphs of given maximum degree: Characterizing trees

Combinatorics 2025-10-13 v3

Abstract

An identifying code of a closed-twin-free graph GG is a dominating set SS of vertices of GG such that any two vertices in GG have a distinct intersection between their closed neighborhoods and SS. It was conjectured that there exists an absolute constant cc such that for every connected graph GG of order nn and maximum degree Δ\Delta, the graph GG admits an identifying code of size at most (Δ1Δ)n+c( \frac{\Delta-1}{\Delta} )n +c. We provide significant support for this conjecture by exactly characterizing every tree requiring a positive constant cc together with the exact value of the constant. Hence, proving the conjecture for trees. For Δ=2\Delta=2 (the graph is a path or a cycle), it is long known that c=3/2c=3/2 suffices. For trees, for each Δ3\Delta\ge 3, we show that c=1/Δ1/3c=1/\Delta\le 1/3 suffices and that cc is required to have a positive value only for a finite number of trees. In particular, for Δ=3\Delta = 3, there are 12 trees with a positive constant cc and, for each Δ4\Delta \ge 4, the only tree with positive constant cc is the Δ\Delta-star. Our proof is based on induction and utilizes recent results from [F. Foucaud, T. Lehtil\"a. Revisiting and improving upper bounds for identifying codes. SIAM Journal on Discrete Mathematics, 2022]. We remark that there are infinitely many trees for which the bound is tight when Δ=3\Delta=3; for every Δ4\Delta\ge 4, we construct an infinite family of trees of order nn with identification number very close to the bound, namely (Δ1+1Δ2Δ+2Δ2)n>(Δ1Δ)nnΔ2\left( \frac{\Delta-1+\frac{1}{\Delta-2}}{\Delta+\frac{2}{\Delta-2}} \right) n > (\frac{\Delta-1}{\Delta} ) n -\frac{n}{\Delta^2}. Furthermore, we also give a new tight upper bound for identification number on trees by showing that the sum of the domination and identification numbers of any tree TT is at most its number of vertices.

Keywords

Cite

@article{arxiv.2403.13172,
  title  = {Identifying codes in graphs of given maximum degree: Characterizing trees},
  author = {Dipayan Chakraborty and Florent Foucaud and Michael A. Henning and Tuomo Lehtilä},
  journal= {arXiv preprint arXiv:2403.13172},
  year   = {2025}
}
R2 v1 2026-06-28T15:26:37.767Z