Cycle type in Hall-Paige: A proof of the Friedlander-Gordon-Tannenbaum conjecture
Abstract
An orthomorphism of a finite group G is a bijection φ G G such that g g-1φ(g) is also a bijection. In 1981, Friedlander, Gordon, and Tannenbaum conjectured that when G is abelian, for any k≥ 2 dividing |G|-1, there exists an orthomorphism of G fixing the identity and permuting the remaining elements as products of disjoint k-cycles. We prove this conjecture for all sufficiently large groups.
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