Abstract
The eccentric connectivity index and connective eccentricity index are important topological indices for chemistry. In this paper, we investigate the eccentric connectivity index and connective eccentricity index of boron-nitrogen fullerenes, respectively. And we give computing formulas of eccentric connectivity index and connective eccentricity index of all boron-nitrogen fullerenes with regular structure.
Highlights
All graphs considered in this paper are simple connected graphs
We investigate the eccentric connectivity index and connective eccentricity index of boron-nitrogen fullerenes, respectively
The chemical information derived through the topological index has been found useful in chemical documentation, isomer discrimination, structure-property correlations, etc
Summary
All graphs considered in this paper are simple connected graphs. Let G be a graph with vertex set V (G) and edge set E (G). The eccentric connectivity index and connective eccentricity index are important topological indices for chemistry. We investigate the eccentric connectivity index and connective eccentricity index of boron-nitrogen fullerenes, respectively. We give computing formulas of eccentric connectivity index and connective eccentricity index of all boron-nitrogen fullerenes with regular structure.
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