Sorry, we do not have enough data to show an influence graph for this author.
- Full text PDF available (1)
- This year (0)
- Last 5 years (3)
- Last 10 years (4)
Eric Lander conjectured that if G is an abelian group of order v containing a difference set of order n and p is a prime dividing v and n, then the Sylow p-subgroup of G cannot be cyclic. This paper verifies a version of this conjecture for k < 6500. A special case of this version is the non-existence of Menon-Hadamard-McFarland difference sets in 2-groups.… (More)