On Alternating and Symmetric Groups Which Are Quasi OD-Characterizable
Abstract
Let (G) be the prime graph associated with a finite group G and D(G) be the degree pattern of G. A finite group G is said to be k-fold OD-characterizable if there exist exactly k non-isomorphic groups H such that |H|=|G| and D(H)=D(G). The purpose of this article is twofold. First, it shows that the symmetric group S27 is 38-fold OD-charaterizable. Second, it shows that there exist many infinite families of alternating and symmetric groups, \An\ and \Sn\, which are k-fold OD-characterizable with k>3.
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