Eccentricity based topological indices of face centered cubic lattice FCC(n)
Chemical graph theory has become a prime gadget for mathematical chemistry due to its wide range of graph theoretical applications for solving molecular problems. A numerical quantity is named as topological index which explains the topological characteristics of a chemical graph. Recently face cent...
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De Gruyter
2021
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oai:doaj.org-article:4a2836d59c21404eb46abb595888f5f02021-12-05T14:10:55ZEccentricity based topological indices of face centered cubic lattice FCC(n)0792-12412191-021910.1515/mgmc-2021-0005https://doaj.org/article/4a2836d59c21404eb46abb595888f5f02021-04-01T00:00:00Zhttps://doi.org/10.1515/mgmc-2021-0005https://doaj.org/toc/0792-1241https://doaj.org/toc/2191-0219Chemical graph theory has become a prime gadget for mathematical chemistry due to its wide range of graph theoretical applications for solving molecular problems. A numerical quantity is named as topological index which explains the topological characteristics of a chemical graph. Recently face centered cubic lattice FCC(n) attracted large attention due to its prominent and distinguished properties. Mujahed and Nagy (2016, 2018) calculated the precise expression for Wiener index and hyper-Wiener index on rows of unit cells of FCC(n). In this paper, we present the ECI (eccentric-connectivity index), TCI (total-eccentricity index), CEI (connective eccentric index), and first eccentric Zagreb index of face centered cubic lattice.Shaker HaniImran MuhammadSajjad WasimDe Gruyterarticleeccentric-connectivity indextotal-eccentricity indexconnective eccentric indexfirst eccentricity based zagreb indexfcc(n)ChemistryQD1-999ENMain Group Metal Chemistry, Vol 44, Iss 1, Pp 32-38 (2021) |
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eccentric-connectivity index total-eccentricity index connective eccentric index first eccentricity based zagreb index fcc(n) Chemistry QD1-999 |
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eccentric-connectivity index total-eccentricity index connective eccentric index first eccentricity based zagreb index fcc(n) Chemistry QD1-999 Shaker Hani Imran Muhammad Sajjad Wasim Eccentricity based topological indices of face centered cubic lattice FCC(n) |
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Chemical graph theory has become a prime gadget for mathematical chemistry due to its wide range of graph theoretical applications for solving molecular problems. A numerical quantity is named as topological index which explains the topological characteristics of a chemical graph. Recently face centered cubic lattice FCC(n) attracted large attention due to its prominent and distinguished properties. Mujahed and Nagy (2016, 2018) calculated the precise expression for Wiener index and hyper-Wiener index on rows of unit cells of FCC(n). In this paper, we present the ECI (eccentric-connectivity index), TCI (total-eccentricity index), CEI (connective eccentric index), and first eccentric Zagreb index of face centered cubic lattice. |
| format |
article |
| author |
Shaker Hani Imran Muhammad Sajjad Wasim |
| author_facet |
Shaker Hani Imran Muhammad Sajjad Wasim |
| author_sort |
Shaker Hani |
| title |
Eccentricity based topological indices of face centered cubic lattice FCC(n) |
| title_short |
Eccentricity based topological indices of face centered cubic lattice FCC(n) |
| title_full |
Eccentricity based topological indices of face centered cubic lattice FCC(n) |
| title_fullStr |
Eccentricity based topological indices of face centered cubic lattice FCC(n) |
| title_full_unstemmed |
Eccentricity based topological indices of face centered cubic lattice FCC(n) |
| title_sort |
eccentricity based topological indices of face centered cubic lattice fcc(n) |
| publisher |
De Gruyter |
| publishDate |
2021 |
| url |
https://doaj.org/article/4a2836d59c21404eb46abb595888f5f0 |
| work_keys_str_mv |
AT shakerhani eccentricitybasedtopologicalindicesoffacecenteredcubiclatticefccn AT imranmuhammad eccentricitybasedtopologicalindicesoffacecenteredcubiclatticefccn AT sajjadwasim eccentricitybasedtopologicalindicesoffacecenteredcubiclatticefccn |
| _version_ |
1718371601137795072 |