Zagreb Polynomials and redefined Zagreb indices of Dendrimers and Polyomino Chains

Autor: Farooq Adeel, Habib Mustafa, Mahboob Abid, Nazeer Waqas, Kang Shin Min
Jazyk: angličtina
Rok vydání: 2019
Předmět:
Zdroj: Open Chemistry, Vol 17, Iss 1, Pp 1374-1381 (2019)
Druh dokumentu: article
ISSN: 2391-5420
DOI: 10.1515/chem-2019-0144
Popis: Dendrimers have an incredibly strong potential because their structure allows multivalent frameworks, i.e. one dendrimer molecule has many possible destinations to couple to a functioning species. Researchers expected to utilize the hydrophobic conditions of the dendritic media to lead photochemical responses that make the things that are artificially tested. Carboxylic acid and phenol- terminated water-dissolvable dendrimers were joined to set up their utility in tranquilize conveyance and furthermore driving compound reactions in their inner parts. This may empower scientists to associate both concentrating on atoms and medication particles to the equivalent dendrimer, which could diminish negative manifestations of prescriptions on sound and health cells. Topological indices are numerical numbers associated with the graphs of dendrimers and are invariant up to graph isomorphism. These numbers compare certain physicochemical properties like boiling point, strain energy, stability, etc. of a synthetic compound. There are three main types of topological indices, i.e degree-based, distance-based and spectrum-based. In this paper, our aim is to compute some degree-based indices and polynomials for some dendrimers and polyomino chains. We computed redefined first, second and third Zagreb indices of PAMAM dendrimers PD1, PD2, and DS1 and linear Polyomino chain Ln , Zigzag Polyomino chain Zn, polyomino chain with n squares and of m segments Bn1$B_{n}^{1}$and Bn2$B_{n}^{2}$We also computed some Zagreb polynomials of understudy dendrimers and chains.
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