Computing Sanskruti Index of Titania Nanotubes
Let [latex]G=(V;E)[/latex] be a simple connected graph. The Sanskruti index was introduced by Hosamani and defined as [latex]S(G)=\sum_{uv \in E(G)}[/latex] [latex](\frac{S_uS_v}{S_u+S_v-2})^3[/latex] where [latex]S_u[/latex] is the summation of degrees of all neighbors of vertex [latex]u[/latex] in...
Main Authors: | , , , |
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Format: | Article |
Language: | English |
Published: |
Ptolemy Scientific Research Press
2017-12-01
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Series: | Open Journal of Mathematical Sciences |
Subjects: | |
Online Access: | https://openmathscience.com/computing-sanskruti-index-of-titania-nanotubes/ |
Summary: | Let [latex]G=(V;E)[/latex] be a simple connected graph. The Sanskruti index was introduced by Hosamani and defined as [latex]S(G)=\sum_{uv \in E(G)}[/latex] [latex](\frac{S_uS_v}{S_u+S_v-2})^3[/latex] where [latex]S_u[/latex] is the summation of degrees of all neighbors of vertex [latex]u[/latex] in [latex]G[/latex]. In this paper, we give explicit formulas for the Sanskruti index of an infinite class of Titania nanotubes [latex]TiO_2[m, n][/latex]. |
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ISSN: | 2523-0212 2616-4906 |