English

Eigenvalues of signed graphs

Combinatorics 2022-01-19 v1

Abstract

Signed graphs have their edges labeled either as positive or negative. ρ(M)\rho(M) denote the MM-spectral radius of Σ\Sigma, where M=M(Σ)M=M(\Sigma) is a real symmetric graph matrix of Σ\Sigma. Obviously, ρ(M)=\mboxmax{λ1(M),λn(M)}\rho(M)=\mbox{max}\{\lambda_1(M),-\lambda_n(M)\}. Let A(Σ)A(\Sigma) be the adjacency matrix of Σ\Sigma and (Kn,H)(K_n,H^-) be a signed complete graph whose negative edges induce a subgraph HH. In this paper, we first focus on a central problem in spectral extremal graph theory as follows: Which signed graph with maximum ρ(A(Σ))\rho(A(\Sigma)) among (Kn,T)(K_n,T^-) where TT is a spanning tree? To answer the problem, we characterize the extremal signed graph with maximum λ1(A(Σ))\lambda_1(A(\Sigma)) and minimum λn(A(Σ))\lambda_n(A(\Sigma)) among (Kn,T)(K_n,T^-), respectively. Another interesting graph matrix of a signed graph is distance matrix, i.e. D(Σ)D(\Sigma) which was defined by Hameed, Shijin, Soorya, Germina and Zaslavsky [8]. Note that A(Σ)=D(Σ)A(\Sigma)=D(\Sigma) when Σ(Kn,T)\Sigma\in (K_n,T^-). In this paper, we give upper bounds on the least distance eigenvalue of a signed graph Σ\Sigma with diameter at least 2. This result implies a result proved by Lin [11] was originally conjectured by Aouchiche and Hansen [1].

Keywords

Cite

@article{arxiv.2201.06729,
  title  = {Eigenvalues of signed graphs},
  author = {Dan Li and Huiqiu Lin and Jixiang Meng},
  journal= {arXiv preprint arXiv:2201.06729},
  year   = {2022}
}

Comments

18 pages, 2 figures

R2 v1 2026-06-24T08:53:06.258Z