Varieties of Hexagonal Quasigroups

Each of the Moufang identities in a quasigroup implies that the quasigroup is a loop.

The idea of a sharp permutation character of a group arises from combinatorial considerations. Recent work, founded on early results of Blichfeldt, has shown that the definition of sharpness can be extended to arbitrary group characters, and in fact it bas emerged that the natural object to define i

Two connexions between quasigroups and quandles are established. In one direction, Joyce's homogeneous quandle construction is shown to yield a quasigroup isotopic to the loop constructed by Scimemi on the set of @-commutators of a group automorphism @ In the other direction, the universal multiplic

Let Fix, y) be the free groupoid on two generators x and y. Define an infinite class of words in F(x, y) by WO(X, y) = X, WI (x, y) = y and ~f+2t~, y) -Wi(X, y) wi+ 1(x, y). An identity of the form \v~~(x, y) = x is called a cyclic identity and ;f quasigroup satisfying a cyclic identity is called a

4 Steiner quasigroup is a quasigroup satisfying the identities x (xy) = y, (JX)X = y and x2 = X. It is well known that the spectrum for Steiner quasi:j:roups is the set of all positive integers such that n = 1 or 3 (mod 6). A Steiner quasigroup is reverse provided that its automorphism group contain