I want to know when an abelian group of even order is admissible (or has a complete map)? And when a nonabelian group of even order is admissible (or has a complete map)?
Thanks.
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There is a conjecture of Hall and Paige on this subject, in the paper Hall, Marshall; Paige, L. J. Complete mappings of finite groups, Pacific J. Math. 5 (1955), 541–549
By the looks of it, the conjecture hasn't quite been resolved yet, but a lot of progress has been made. See, for instance: Stewart Wilcox, Reduction of the Hall–Paige conjecture to sporadic simple groups, J.Algebra, 321:5, 1407–1428 This paper and references ought to give a good idea of what is known. Hall and Paige proved their conjecture in the soluble case, so the answer to your question in the abelian case is that a finite abelian group admits a complete map exactly if its $2$-Sylow subgroup is either trivial or non-cyclic. (Aside: the identity is a complete map for any finite group of odd order, hence the focus on groups of even order in the question.) (Aside 2: this answer brought to you by the power of Google; I don't actually know much about the subject myself.) |
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