On Van, r and s topological properties of the Sierpinski triangle networks
Open Access
- 20 May 2020
- journal article
- research article
- Published by Sami Publishing Company in Eurasian Chemical Communications
- Vol. 2 (7), 819-826
- https://doi.org/10.33945/sami/ecc.2020.7.9
Abstract
A topological index-a numerical quantity derived from the graph of a chemical network-is used for modelling the mathematical, chemical and physical properties of these networks and chemicals. The topological properties of the Sierpinski triangle has been newly studied in chemical graph theory. In this study we defined novel Van, R and S degree concepts as well as novel Van, R and S topological indices, and computed these topological indices for the Sierpinski triangle network. The closed formulas of these novel topological indices for the Sierpinski triangle network were presented.Keywords
This publication has 9 references indexed in Scilit:
- Computation of bond incident degree (BID) indices of complex structures in drugsEurasian Chemical Communications, 2020
- The eccentric connectivity index of polycyclic aromatic hydrocarbons (PAHs)Eurasian Chemical Communications, 2020
- On ve-degree atom-bond connectivity, sum-connectivity, geometric-arithmetic and harmonic indices of copper oxideEurasian Chemical Communications, 2020
- Valency-Based Topological Descriptors and Structural Property of the Generalized Sierpiński NetworksJournal of Statistical Physics, 2019
- ECCENTRIC DISTANCE SUM OF SIERPIŃSKI GASKET AND SIERPIŃSKI NETWORKFractals, 2019
- A Fractal-Based Authentication Technique Using Sierpinski Triangles in Smart DevicesSensors, 2019
- On a recursive construction of Dirichlet form on the Sierpiński gasketJournal of Mathematical Analysis and Applications, 2019
- A discrete chaotic dynamical system on the Sierpinski gasketTURKISH JOURNAL OF MATHEMATICS, 2019
- There are eight-element orthogonal exponentials on the spatial Sierpinski gasketMathematische Nachrichten, 2018