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On graphs having minimal fourth adjacency coefficient

Combinatorics 2020-02-11 v1

Abstract

Let GG be a graph with order nn and adjacency matrix A(G)\mathbf{A}(G). The adjacency polynomial of GG is defined as ϕ(G;λ)=det(λIA(G))=i=0nai(G)λni\phi(G;\lambda) =det(\lambda\mathbf{I}-\mathbf{A}(G))=\sum_{i=0}^n\mathbf{a_i}(G)\lambda^{n-i}. Hereafter, ai(G)\mathbf{a}_i(G) is called the ii-th adjacency coefficient of GG. Denote by Gn,m\mathfrak{G}_{n,m} the set of all connected graphs having nn vertices and mm edges. A graph GG is said 44-Sachs minimal if a4(G)=min{a4(H)HGn,m}.\mathbf{a}_4(G)=min\{\mathbf{a}_4(H)|H\in \mathfrak{G}_{n,m}\}. The value min{a4(H)HGn,m}min\{\mathbf{a}_4(H)|H\in \mathfrak{G}_{n,m}\} is called the minimal 44-Sachs number in Gn,m\mathfrak{G}_{n,m}, denoted by aˉ4(Gn,m)\bar{\mathbf{a}}_4(\mathfrak{G}_{n,m}). In this paper, we study the relationship between the value a4(G)\mathbf{a}_4(G) and its structural properties. Especially, we give a structural characterization on 44-Sachs minimal graphs, showing that each 44-Sachs minimal graph contains a difference graph as its spanning subgraph (see Theorem 8). Then, for n4n\ge 4 and n1m2n4n-1\le m\le 2n-4, we determine all 44-Sachs minimal graphs together with the corresponding minimal 44-Sachs number aˉ4(Gn,m)\bar{\mathbf{a}}_4(\mathfrak{G}_{n,m}).

Keywords

Cite

@article{arxiv.2002.03826,
  title  = {On graphs having minimal fourth adjacency coefficient},
  author = {Shi Cai Gong and Shi Wei Sun},
  journal= {arXiv preprint arXiv:2002.03826},
  year   = {2020}
}

Comments

17 pages

R2 v1 2026-06-23T13:36:54.050Z