English

Spanning trees and even integer eigenvalues of graphs

Combinatorics 2014-01-30 v4

Abstract

For a graph GG, let L(G)L(G) and Q(G)Q(G) be the Laplacian and signless Laplacian matrices of GG, respectively, and τ(G)\tau(G) be the number of spanning trees of GG. We prove that if GG has an odd number of vertices and τ(G)\tau(G) is not divisible by 44, then (i) L(G)L(G) has no even integer eigenvalue, (ii) Q(G)Q(G) has no integer eigenvalue λ2(mod4)\lambda\equiv2\pmod4, and (iii) Q(G)Q(G) has at most one eigenvalue λ0(mod4)\lambda\equiv0\pmod4 and such an eigenvalue is simple. As a consequence, we extend previous results by Gutman and Sciriha and by Bapat on the nullity of adjacency matrices of the line graphs. We also show that if τ(G)=2ts\tau(G)=2^ts with ss odd, then the multiplicity of any even integer eigenvalue of Q(G)Q(G) is at most t+1t+1. Among other things, we prove that if L(G)L(G) or Q(G)Q(G) has an even integer eigenvalue of multiplicity at least 22, then τ(G)\tau(G) is divisible by 44. As a very special case of this result, a conjecture by Zhou et al. [On the nullity of connected graphs with least eigenvalue at least 2-2, Appl. Anal. Discrete Math. 7 (2013), 250--261] on the nullity of adjacency matrices of the line graphs of unicyclic graphs follows.

Keywords

Cite

@article{arxiv.1201.3221,
  title  = {Spanning trees and even integer eigenvalues of graphs},
  author = {Ebrahim Ghorbani},
  journal= {arXiv preprint arXiv:1201.3221},
  year   = {2014}
}

Comments

Final version. To appear in Discrete Math

R2 v1 2026-06-21T20:05:01.000Z