Computation method of the Hosoya index of primitive coronoid systems

Coronoid systems are natural graph representations of coronoid hydrocarbons associated with benzenoid systems, but they differ in that they contain a hole. The Hosoya index of a graph G is defined as the total number of independent edge sets, that are called k-matchings in G. The Hosoya index is a s...

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Autores:: Cruz Rodes, Roberto
Rada Rincón, Juan Pablo
Sinan Oz, Mert

Tipo de recurso:: Article of investigation

Fecha de publicación:: 2022

Institución:: Universidad de Antioquia

Repositorio:: Repositorio UdeA

Idioma:: eng

Description
Summary:	Coronoid systems are natural graph representations of coronoid hydrocarbons associated with benzenoid systems, but they differ in that they contain a hole. The Hosoya index of a graph G is defined as the total number of independent edge sets, that are called k-matchings in G. The Hosoya index is a significant molecular descriptor that has an important position in QSAR and QSPR studies. Therefore, the computation of the Hosoya index of various molecular graphs is needed for making progress on investigations. In this paper, a method based on the transfer matrix technique and the Hosoya vector for computing the Hosoya index of arbitrary primitive coronoid systems is presented. Moreover, the presented method is customized for hollow hexagons by using six parameters. As a result, the Hosoya indices of both each arbitrary primitive coronoid system and also each hollow hexagon can be computed by means of a summation of four selected multiplications consisting of presented transfer matrices and two vectors.

Computation method of the Hosoya index of primitive coronoid systems

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