A Generalization of a Result of Barrucand and Cohn on Class Numbers

Let A be an m\_n matrix in which the entries of each row are all distinct. A. A. Drisko (1998, J. Combin. Theory Ser. A 84, 181 195) showed that if m 2n&1, then A has a transversal: a set of n distinct entries with no two in the same row or column. We generalize this to matrices with entries in the

We prove that if there exists a t -(v, k, λ) design satisfying the inequality for some positive integer j (where m = min{j, v -k} and n = min{i, t}), then there exists a t -(v + j, k, λ( v-t+j j )) design.

We show that if G is a graph minimal with respect to having crossing number at least k, and G has no vertices of degree 3, then G has crossing number at most 2k+35. ## 2000 Academic Press Richter and Thomassen proved that if G is minimal with respect to having crossing number at least k, then the

We explore the class of generalized nilpotent groups in the universe c of all radical locally finite groups satisfying min-p for every prime p. We obtain that this class is the natural generalization of the class of finite nilpotent groups from the finite universe to the universe c . Moreover, the s