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Hosoya, Schultz, and Gutman Polynomials of Generalized Petersen Graphs
The graph theory has wide important applications in various other types of sciences. In chemical graph theory, we have many topological polynomials for a graph
G
through which we can compute many topological indices. Topological indices are numerical values and descriptors which are used to quantify the physiochemical properties and bioactivities of the chemical graph. In this paper, we compute Hosoya polynomial, hyper-Wiener index, Tratch–Stankevitch–Zefirov index, Harary index, Schultz polynomial, Gutman polynomial, Schultz index, and Gutman index of generalized Petersen graphs
P
n
,
1
and
P
n
,
2
.
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