Rehan-Lanel Indices of Graphs

Abstract

A graph G consists of vertices V(G) and edges E(G). In this paper, we propose four new indices defined and named as first Rehan-Lanel index of G (RL1), second Rehan-Lanel index of G (RL2), second Rehan-Lanel index of G, third Rehan-Lanel index of G, (RL3) and fourth Rehan-Lanel index of G (RL4). The degrees of the vertices u, v ∈ V(G) are denoted by dG(u) and dG(v). Based on these new indices and the definitions of Revan degree, Domination degree, Banhatti degree, Temperature of a vertex, KV indices, we subsequently introduced an additional 448 indices/exponentials and computed results for the first four new indices of each subsequent definition, for the standard graphs such as r- regular graph, complete graph, cycle, path and compete bipartite graph. In addition, we performed calculations for the Wheel graph, Sunflower graph, and French Windmill graph. Furthermore, using the exponential of a degree of a vertex, the centrality concept, we introduced another 8 indices. Furthermore, we defined a new degree called Chandana-Lanel degree of a vertex of a graph(CL degree). Using this degree, new 6 indices were defined. Also, we defined the index called the Heronian Rehan-Lanel index using the Heronian mean of two numbers. These novel 462 indices would be advantageous in QSPR/QSAR studies.