A strengthened inequality of Alon-Babai-Suzuki's conjecture on set systems with restricted intersections modulo p

Abstract

Let K=\k1,k2,…,kr\ and L=\l1,l2,…,ls\ be disjoint subsets of \0,1,…,p-1\, where p is a prime and A=\A1,A2,…,Am\ be a family of subsets of [n] such that |Ai|p∈ K for all Ai∈ A and |Ai Aj|p∈ L for i j. In 1991, Alon, Babai and Suzuki conjectured that if n≥ s+1≤ i≤ r ki, then |A|≤ n s+n s-1+·s+n s-r+1. In 2000, Qian and Ray-Chaudhuri proved the conjecture under the condition n≥ 2s-r. In 2015, Hwang and Kim verified the conjecture of Alon, Babai and Suzuki. In this paper, we will prove that if n≥ 2s-2r+1 or n≥ s+1≤ i≤ rki, then \[ |A|≤n-1 s+n-1 s-1+·s+n-1 s-2r+1. \] This result strengthens the upper bound of Alon, Babai and Suzuki's conjecture when n≥ 2s-2.