Lower Bounds on the Sizes of Defining Sets in Full n-Latin Squares and Full Designs

Abstract: The full n-Latin square is the n × n array with symbols 1, 2, . . . , n in each cell. In this paper we show, as part of a more general result, that any defining set for the full n-Latin square has size n 3 (1 − o(1)). The full design N (v, k) is the unique simple design with parameters (v, k, v−2 k−2 ); that is, the design consisting of all subsets of size k from a set of size v. We show that any defining set for the full design N (v, k) has size v k (1 − o(1)) (as v − k becomes large). These results improve e… Show more