Abstract
The concept of the topological index of a graph is increasingly diverse because researchers continue to introduce new concepts of topological indices. Researches on the topological indices of a graph which initially only examines graphs related to chemical structures begin to examine graphs in general. On the other hand, the concept of graphs obtained from an algebraic structure is also increasingly being introduced. Thus, studying the topological indices of a graph obtained from an algebraic structure such as a group is very interesting to do. One concept of graph obtained from a group is subgroup graph introduced by Anderson et al in 2012 and there is no research on the topology index of the subgroup graph of the symmetric group until now. This article examines several topological indices of the subgroup graphs of the symmetric group for trivial normal subgroups. This article focuses on determining the formulae of various Zagreb indices such as first and second Zagreb indices and co-indices, reduced second Zagreb index and first and second multiplicatively Zagreb indices and several eccentricity-based topological indices such as first and second Zagreb eccentricity indices, eccentric connectivity, connective eccentricity, eccentric distance sum and adjacent eccentric distance sum indices of these graphs.
Highlights
The topological index of a finite graph is a number associated with the graph and this number is invariant under automorphism [1]
Three major classifications of the topological index of a graph are based on degree, distance and the eccentricity of vertex in the graph
While the eccentricity-based topological indices for example total eccentricity index [39, 40] and first and second Zagreb eccentricity indices [41]. Based on these three major topological indices, new topological indices are developed for examples Schultz index [42], Gutman index [43,44,45], additively and multiplicatively Weighted Harary indices [46,47,48,49], eccentric connectivity index [50,51,52,53], connective eccentricity index [54], eccentric distance sum [3,55,56,57,58,59] and adjacent eccentric distance sum index [5]
Summary
The topological index of a finite graph is a number associated with the graph and this number is invariant under automorphism [1]. Research on the topological index was initially related to graphs of biological activity or chemical structures and reactivity and researches in this regard continue, for example see [59,60,61,62,63]. Several studies began to examine the topological index of graphs that are not of chemical structure and reactivity or biological activity, for example [54,64,65,66,67,68,69,70,71,72]. This article will examine the formulae of various Zagreb indices and eccentricity-based topological indices of the subgroup graph of the symmetric group
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