The Difference Subgroup Graph of a Finite Group
Abstract
The difference subgroup graph D(G) of a finite group G is defined as the graph whose vertices are the non-trivial proper subgroups of G, with two distinct vertices H and K adjacent if and only if H, K = G but HK G. This graph arises naturally as the difference between the join graph (G) and the comaximal subgroup graph (G). In this paper, we initiate a systematic study of D(G) and its reduced version D*(G), obtained by removing isolated vertices. We establish several fundamental structural properties of these graphs, including conditions for connectivity, forbidden subgraph characterizations, and the relationship between graph parameters - such as independence number, clique number, and girth - and the solvability or nilpotency of the underlying group. The paper concludes with a discussion of open problems and potential directions for future research.
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