Additive triples of bijections, or the toroidal semiqueens problem

Abstract

We prove an asymptotic for the number of additive triples of bijections \1,…,n\/nZ, that is, the number of pairs of bijections π1,π2 \1,…,n\/nZ such that the pointwise sum π1+π2 is also a bijection. This problem is equivalent to counting the number of orthomorphisms or complete mappings of Z/nZ, to counting the number of arrangements of n mutually nonattacking semiqueens on an n× n toroidal chessboard, and to counting the number of transversals in a cyclic Latin square. The method of proof is a version of the Hardy--Littlewood circle method from analytic number theory, adapted to the group (Z/nZ)n.