On edge irregularity strength of some classes of Toeplitz graphs

ODAM-Vol. 7 (2024), Issue 2, pp. 23 – 34 Open Access Full-Text PDF
Noha Mohammad Seyam, Muhammad Faisal Nadeem

Abstract:An edge irregular \(k\)-labeling of a graph \(G\) is a labeling of vertices of \(G\) with labels from the set \(\{1,2,3,\dots,k\}\) such that no two edges of \(G\) have same weight. The least value of \(k\) for which a graph \(G\) has an edge irregular \(k\)-labeling is called the edge irregularity strength of \(G\). Ahmad et. al. [1] showed the edge irregularity strength of some particular classes of Toeplitz graphs. In this paper we generalize those results and finds the exact values of the edge irregularity strength for some generalize classes of Toeplitz graphs.

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On the eccentric atom-bond sum-connectivity index

ODAM-Vol. 7 (2024), Issue 2, pp. 11 – 22 Open Access Full-Text PDF
Zaryab Hussain, Muhammad Ahsan Binyamin

Abstract:This note presents some upper bounds for the size of the upper deg-centric grapg \(G_{ud}\) of a simple connected graph G. Amongst others, a result for graphs for which a compliant graph \(G\) has \(G_{ud} \cong \overline G\) is presented. Finally, results for size minimality in respect upper deg-centrication and minimum size of such graph \(G\) are presented.

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The inverse degree conditions for Hamiltonian and traceable graphs

ODAM-Vol. 7 (2024), Issue 2, pp. 7 – 10 Open Access Full-Text PDF
Rao Li

Abstract:Let \(G = (V(G), E(G))\) be a graph with minimum degree at least \(1\). The inverse degree of \(G\), denoted \(Id(G)\), is defined as the sum of the reciprocals of degrees of all vertices in \(G\). In this note, we present inverse degree conditions for Hamiltonian and traceable graphs.

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Note: Certain bounds in respect of upper deg-centric graphs

ODAM-Vol. 7 (2024), Issue 2, pp. 1 – 6 Open Access Full-Text PDF
Johan Kok

Abstract:This note presents some upper bounds for the size of the upper deg-centric grapg \(G_{ud}\) of a simple connected graph G. Amongst others, a result for graphs for which a compliant graph \(G\) has \(G_{ud} \cong \overline G\) is presented. Finally, results for size minimality in respect upper deg-centrication and minimum size of such graph \(G\) are presented.

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