Schultz indices and their polynomials of Mycielskian graphs. (English) Zbl 1524.05055
Summary: Topological indices are studied extensively due to its vibrant applicability in the field of chemical graph theory. These connectivity indices (topological indices) are numerical values resulting in an unequivocal process based on the structure of a graph. Numerous topological indices are classified based on their distance and degree. The Schultz and modified Schultz indices considered in this paper have been expansively studied by various authors on different types of graphs. In this paper, we established the results on Schultz, modified Schultz indices and their polynomials for mycielskian graphs.
MSC:
| 05C09 | Graphical indices (Wiener index, Zagreb index, Randić index, etc.) |
| 92E10 | Molecular structure (graph-theoretic methods, methods of differential topology, etc.) |
| 05C92 | Chemical graph theory |
| 05C07 | Vertex degrees |
| 05C12 | Distance in graphs |
| 05C31 | Graph polynomials |
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