On connection between reducibility of an n-ary quasigroup and that of its retracts

Abstract

An n-ary operation Q:Sn S is called an n-ary quasigroup of order |S| if in the equation x0=Q(x1,...,xn) knowledge of any n elements of x0,...,xn uniquely specifies the remaining one. An n-ary quasigroup Q is (permutably) reducible if Q(x1,...,xn)=P(R(xs(1),...,xs(k)),xs(k+1),...,xs(n)) where P and R are (n-k+1)-ary and k-ary quasigroups, s is a permutation, and 1<k<n. An m-ary quasigroup R is called a retract of Q if it can be obtained from Q or one of its inverses by fixing n-m>0 arguments. We show that every irreducible n-ary quasigroup has an irreducible (n-1)-ary or (n-2)-ary retract; moreover, if the order is finite and prime, then it has an irreducible (n-1)-ary retract. We apply this result to show that all n-ary quasigroups of order 5 or 7 whose all binary retracts are isotopic to Z5 or Z7 are reducible for n>3. Keywords: n-ary quasigroups, retracts, reducibility, latin hypercubes