VC dimension and a union theorem for set systems

Abstract

Fix positive integers k and d. We show that, as n∞, any set system A ⊂ 2[n] for which the VC dimension of \ i=1k Si Si ∈ A\ is at most d has size at most (2dk+o(1))n d/k. Here denotes the symmetric difference operator. This is a k-fold generalisation of a result of Dvir and Moran, and it settles one of their questions. A key insight is that, by a compression method, the problem is equivalent to an extremal set theoretic problem on k-wise intersection or union that was originally due to Erdos and Frankl. We also give an example of a family A ⊂ 2[n] such that the VC dimension of A A and of A A are both at most d, while A = (nd). This provides a negative answer to another question of Dvir and Moran.