Computation of Vertex-Edge Degree Based Topological Descriptors for Hex-Derived Networks
Autor: | Ali N. A. Koam, Ali Ahmad, Abdullah Ali H. Ahmadini |
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Rok vydání: | 2021 |
Předmět: |
Vertex (graph theory)
Quantitative structure–activity relationship General Computer Science Degree (graph theory) Computer science Computation Dimension (graph theory) General Engineering Structure (category theory) Graph theory 0102 computer and information sciences 02 engineering and technology Hex-derived networks Type (model theory) 021001 nanoscience & nanotechnology Topology 01 natural sciences vertex-edge based index TK1-9971 010201 computation theory & mathematics General Materials Science Electrical engineering. Electronics. Nuclear engineering Electrical and Electronic Engineering 0210 nano-technology topological descriptors |
Zdroj: | IEEE Access, Vol 9, Pp 82989-83001 (2021) |
ISSN: | 2169-3536 |
Popis: | A numeric number that represents the entire structure of a graph is defined to be a topological descriptor. Graph theory has been found to be a useful area of research in the direction of topological descriptors. The different physical and chemical properties of basic chemical compounds are related by main factors of topological descriptors. In the study of QSAR/QSPR, the vertex-edge topological descriptors are used to predict the bioactivity of chemical compound. The hex-derived networks are generated by hexagonal networks of dimension $p$ , these networks have an assortment of valuable applications in computer science, medical science and engineering. Simonraj and George derived a new type of graphs, which is named a third type of hex-derived networks and this work carried out by Ali et al. with calculation of degree-based topological descriptors for these networks. In this paper, we compute the exact values of vertex-edge based topological descriptors for third type of hex-derived networks. |
Databáze: | OpenAIRE |
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