AK-type stability theorems on cross t-intersecting families

Abstract

Two families, A and B, of subsets of [n] are cross t-intersecting if for every A ∈ A and B ∈ B, A and B intersect in at least t elements. For a real number p and a family A the product measure μp ( A) is defined as the sum of p|A|(1-p)n-|A| over all A∈ A. For every non-negative integer r, and for large enough t, we determine, for any p satisfying rt+2r-1≤ p≤r+1t+2r+1, the maximum possible value of μp ( A)μp ( B) for cross t-intersecting families A and B. In this paper we prove a stronger stability result which yields the above result.