Transversals, near transversals, and diagonals in iterated groups and quasigroups

Abstract

Given a binary quasigroup G of order n, a d-iterated quasigroup G[d] is the (d+1)-ary quasigroup equal to the d-times composition of G with itself. The Cayley table of every d-ary quasigroup is a d-dimensional latin hypercube. Transversals and diagonals in multiary quasigroups are defined so as to coincide with those in the corresponding latin hypercube. We prove that if a group G of order n satisfies the Hall--Paige condition, then the number of transversals in G[d] is equal to n! |G'| nn-1 · n!d (1 + o(1)) for large d, where G' is the commutator subgroup of G. For a general quasigroup G, we obtain similar estimations on the numbers of transversals and near transversals in G[d] and develop a method for counting diagonals of other types in iterated quasigroups.