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Two Irregularity Measures Possessing High Discriminatory Ability

Combinatorics 2020-09-08 v1

Abstract

An nn-vertex graph whose degree set consists of exactly n1n-1 elements is called antiregular graph. Such type of graphs are usually considered opposite to the regular graphs. An irregularity measure (IMIM) of a connected graph GG is a non-negative graph invariant satisfying the property: IM(G)=0IM(G) = 0 if and only if GG is regular. The total irregularity of a graph GG, denoted by irrt(G)irr_t(G), is defined as irrt(G)={u,v}V(G)dudvirr_t(G)= \sum_{\{u,v\} \subseteq V(G)} |d_u - d_v| where V(G)V(G) is the vertex set of GG and dud_u, dvd_v denote the degrees of the vertices uu, vv, respectively. Antiregular graphs are the most nonregular graphs according to the irregularity measure irrtirr_t; however, various non-antiregular graphs are also the most nonregular graphs with respect to this irregularity measure. In this note, two new irregularity measures having high discriminatory ability are devised. Only antiregular graphs are the most nonregular graphs according to the proposed measures.

Keywords

Cite

@article{arxiv.1904.05053,
  title  = {Two Irregularity Measures Possessing High Discriminatory Ability},
  author = {Akbar Ali and Tamás Réti},
  journal= {arXiv preprint arXiv:1904.05053},
  year   = {2020}
}

Comments

11 pages and 2 figures

R2 v1 2026-06-23T08:35:06.822Z