Enhanced power graphs of finite groups with cograph structure
Abstract
The enhanced power graph, E(G), of a group G has vertex set G and two elements are adjacent if they generate a cyclic subgroup. In the case of finite groups, we identify some striking and unexpected properties of these graphs, as well as links between properties of E(G) and properties of the group G. We prove that if E(G) is a cograph then it is also a chordal graph. Making use of properties of simplicial vertices, we characterise the finite groups G whose enhanced power graph is diamond-free or a block graph. We also characterise the finite groups having enhanced power graph a cograph or a quasi-threshold graph, and those with C4-free enhanced power graph. We use these characterisations to classify the finite nonabelian simple groups whose enhanced power graph is a cograph and give information on the finite simple groups whose enhanced power graph is C4-free. Some open problems are posed.
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