Further Results on the Pseudo-Lg(s) Association Scheme with g≥ 3, s≥ g+2

Abstract

It is inevitable that the Lg(s) association scheme with g≥ 3, s≥ g+2 is a pseudo-Lg(s) association scheme. On the contrary, although s2 treatments of the pseudo-Lg(s) association scheme can form one Lg(s) association scheme, it is not always an Lg(s) association scheme. Mainly because the set of cardinality s, which contains two first-associates treatments of the pseudo-Lg(s) association scheme, is non-unique. Whether the order s of a Latin square L is a prime power or not, the paper proposes two new conditions in order to extend a POL(s,w) containing L. It has been known that a POL(s,w) can be extended to a POL(s,s-1) so long as Bruck's brh condition s≥ (s-1-w)4-2(s-1-w)3+2(s-1-w)2+(s-1-w)2 is satisfied, Bruck's condition will be completely improved through utilizing six properties of the Lw+2(s) association scheme in this paper. Several examples are given to elucidate the application of our results.