English

Note on a relation between Randic index and algebraic connectivity

Combinatorics 2010-12-23 v1

Abstract

A conjecture of AutoGraphiX on the relation between the Randi\'c index RR and the algebraic connectivity aa of a connected graph GG is: Ra(n3+222)/(2(1cosπn))\frac R a\leq (\frac{n-3+2\sqrt{2}}{2})/(2(1- \cos {\frac{\pi}{n}})) with equality if and only if GG is PnP_n, which was proposed by Aouchiche and Hansen [M. Aouchiche and P. Hansen, A survey of automated conjectures in spectral graph theory, {\it Linear Algebra Appl.} {\bf 432}(2010), 2293--2322]. We prove that the conjecture holds for all trees and all connected graphs with edge connectivity κ(G)2\kappa'(G)\geq 2, and if κ(G)=1\kappa'(G)=1, the conjecture holds for sufficiently large nn. The conjecture also holds for all connected graphs with diameter D2(n3+22)π2D\leq \frac {2(n-3+2\sqrt{2})}{\pi^2} or minimum degree δn2\delta\geq \frac n 2. We also prove Ra8n1nD2R\cdot a\geq \frac {8\sqrt{n-1}}{nD^2} and Ranδ(2δn+2)2(n1)R\cdot a\geq \frac {n\delta(2\delta-n+2)} {2(n-1)}, and then RaR\cdot a is minimum for the path if D(n1)1/4D\leq (n-1)^{1/4} or δn21\delta\geq \frac n 2-1.

Keywords

Cite

@article{arxiv.1012.4856,
  title  = {Note on a relation between Randic index and algebraic connectivity},
  author = {Xueliang Li and Yongtang Shi},
  journal= {arXiv preprint arXiv:1012.4856},
  year   = {2010}
}

Comments

6 pages

R2 v1 2026-06-21T17:02:51.349Z