English

DP color functions versus chromatic polynomials (II)

Combinatorics 2022-03-16 v1

Abstract

For any connected graph GG, let P(G,m)P(G,m) and PDP(G,m)P_{DP}(G,m) denote the chromatic polynomial and DP color function of GG, respectively. It is known that PDP(G,m)P(G,m)P_{DP}(G,m)\le P(G,m) holds for every positive integer mm. Let DPDP_\approx (resp. DP<DP_<) be the set of graphs GG for which there exists an integer MM such that PDP(G,m)=P(G,m)P_{DP}(G,m)=P(G,m) (resp. PDP(G,m)<P(G,m)P_{DP}(G,m)<P(G,m)) holds for all integers mMm \ge M. Determining the sets DPDP_\approx and DP<DP_< is a key problem on the study of the DP color function. For any edge set E0E_0 of GG, let G(E0)\ell_G(E_0) be the length of a shortest cycle CC in GG such that E(C)E0|E(C)\cap E_0| is odd whenever such a cycle exists, and G(E0)=\ell_G(E_0)=\infty otherwise. Write G(E0)\ell_G(E_0) as G(e)\ell_G(e) if E0={e}E_0=\{e\}. In this paper, we prove that if GG has a spanning tree TT such that G(e)\ell_G(e) is odd for each eE(G)E(T)e\in E(G)\setminus E(T), the edges in E(G)E(T)E(G)\setminus E(T) can be labeled as e1,e2,,eqe_1,e_2,\cdots, e_q with G(ei)G(ei+1)\ell_G(e_i)\le \ell_G(e_{i+1}) for all 1iq11\le i\le q-1 and each edge eie_i is contained in a cycle CiC_i of length G(ei)\ell_G(e_i) with E(Ci)E(T){ej:1ji}E(C_i)\subseteq E(T)\cup \{e_j: 1\le j\le i\}, then GG is a graph in DPDP_{\approx}. As a direct application of this conclusion, all plane near-triangulations and complete multipartite graphs with at least three partite sets belong to DPDP_{\approx}. We also show that if EE^* is an edge set of GG such that G(E)\ell_{G}(E^*) is even and EE^* satisfies certain conditions, then GG belongs to DP<DP_<. In particular, if G(E)=4\ell_G(E^*)=4, where EE^* is a set of edges between two disjoint vertex subsets of GG, then GG belongs to DP<DP_<. Both results extend known ones in [DP color functions versus chromatic polynomials, Advances in Applied MathematicsAdvances\ in\ Applied\ Mathematics 134 (2022), article 102301].

Keywords

Cite

@article{arxiv.2203.07704,
  title  = {DP color functions versus chromatic polynomials (II)},
  author = {Meiqiao Zhang and Fengming Dong},
  journal= {arXiv preprint arXiv:2203.07704},
  year   = {2022}
}

Comments

24 pages, 8 figures

R2 v1 2026-06-24T10:13:35.596Z