Abstract :
For a finite set system H with ground set X, we let H ∨ H = {A ∪ B: A, B ∈ H, A ≠ B}. An atom of H is a nonempty maximal subset C of X such that for all A ∈ H, either C ⊂ A or C ∩ A = 0. We obtain a best possible upper bound for the number of atoms determined by a set system H with ∥H∥ = k and ∥H ∨ H∥ = u for all integers k and u. This answers a problem posed by Sós.
