Loops with exponent three in all isotopes

Abstract

It was shown by van Rees vR that a latin square of order n has at most n2(n-1)/18 latin subsquares of order 3. He conjectured that this bound is only achieved if n is a power of 3. We show that it can only be achieved if n36. We also state several conditions that are equivalent to achieving the van Rees bound. One of these is that the Cayley table of a loop achieves the van Rees bound if and only if every loop isotope has exponent 3. We call such loops van Rees loops and show that they form an equationally defined variety. We also show that (1) In a van Rees loop, any subloop of index 3 is normal, (2) There are exactly 6 nonassociative van Rees loops of order 27 with a non-trivial nucleus and at least 1 with all nuclei trivial, (3) Every commutative van Rees loop has the weak inverse property and (4) For each van Rees loop there is an associated family of Steiner quasigroups.