Multiplicative Connectivity Revan Indices of Polycyclic Aromatic Hydrocarbons and Benzenoid Systems

Abstract: A chemical graph is a simple graph related to the structure of a chemical compound. The connectivity indices are applied to measure the chemical characteristics of compounds in Chemical Graph Theory. In this paper, we compute the multiplicative product connectivity Revan index, multiplicative sum connectivity Revan index, multiplicative ABC Revan index for polycyclic aromatic hydrocarbons and jagged rectangle benzenoid systems.

“…Recently, Zhao et al discussed the B-indices, R-index, and hyper-R-index for the very important structure of silicon carbide isomer [19]. As hydrocarbons are the main part of organic chemistry, Kulli et al studied the multiplicative version of these indices in chemistry [20]. Revan polynomials are also introduced to get more information about the molecular structure of benzene [21].…”

Various Uses of Topological Invariants in Jahangir Graph J_β,α

“…Recently, Zhao et al discussed the B-indices, R-index, and hyper-R-index for the very important structure of silicon carbide isomer [19]. As hydrocarbons are the main part of organic chemistry, Kulli et al studied the multiplicative version of these indices in chemistry [20]. Revan polynomials are also introduced to get more information about the molecular structure of benzene [21].…”

Various Uses of Topological Invariants in Jahangir Graph J_β,α

“…Recently, some variants of status indices were introduced and studied such as first and second status connectivity indices [7], first and second hyper status indices [8], F 1 -status index [9], harmonic status index [10], multiplicative vertex status index [11], (a, b)-status index [12], status connectivity coincides [13]. Recently, some different multiplicative indices were studied, for example, in [14,15,16,17,18,19,20,21,22,23,24,25,26,27,28,29,30,31].…”

Computation of Multiplicative (a, b)-Status Index of Certain Graphs

“…In recent years, some new connectivity indices have been introduced and studied such as sum connectivity index [8], product connectivity index [9], sum connectivity Revan index [10], geometric-arithmetic reverse and sum connectivity reverse indices [11], sum connectivity Gourava index [12], connectivity Banhatti indices [13]. Also some other connectivity indices were studied, for example, in [ 14,15,16,17,18,19,20,21,22,23,24,25,26 ].…”

Product Connectivity Leap Index and ABC Leap Index of Helm Graphs