Degree distance index of class of graphs

A. Harshitha; Sabitha D’Souza; Pradeep G. Bhat

doi:10.22049/CCO.2023.28325.1506

Degree distance index of class of graphs

A. Harshitha
, Sabitha D’Souza^*
, Pradeep G. Bhat

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

Abstract

The topological indices are the numerical parameters of a graph that characterize the topology of a graph and are usually graph invariant. The topological indices are classified based on the properties of graphs. The degree distance index is the topological index which is calculated by counting the degrees and distance between the vertices. In this paper, the degree distance index of the connected thorn graph, the graph obtained by joining an edge between two connected graphs, and one vertex union of two connected graphs are calculated.

Original language	English
Pages (from-to)	453-462
Number of pages	10
Journal	Communications in Combinatorics and Optimization
Volume	10
Issue number	2
DOIs	https://doi.org/10.22049/CCO.2023.28325.1506
Publication status	Published - 2025

All Science Journal Classification (ASJC) codes

Discrete Mathematics and Combinatorics
Control and Optimization

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10.22049/CCO.2023.28325.1506

Cite this

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AU - Bhat, Pradeep G.

PY - 2025

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AB - The topological indices are the numerical parameters of a graph that characterize the topology of a graph and are usually graph invariant. The topological indices are classified based on the properties of graphs. The degree distance index is the topological index which is calculated by counting the degrees and distance between the vertices. In this paper, the degree distance index of the connected thorn graph, the graph obtained by joining an edge between two connected graphs, and one vertex union of two connected graphs are calculated.

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M3 - Article

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IS - 2

ER -

Degree distance index of class of graphs

Abstract

All Science Journal Classification (ASJC) codes

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