On the number of autotopies of an n-ary qusigroup of order 4

Abstract

An algebraic system from a finite set of cardinality k and an n-ary operation f invertible in each argument is called an n-ary quasigroup of order k. An autotopy of an n-ary quasigroup (,f) is a collection (θ0,θ1,...,θn) of n+1 permutations of such that f(θ1(x1),...,θn(xn)) θ0(f(x1,…,xn)). We show that every n-ary quasigroup of order 4 has at least 2[n/2]+2 and not more than 6· 4n autotopies. We characterize the n-ary quasigroups of order 4 with 2(n+3)/2, 2· 4n, and 6· 4n autotopies.