On the extension complexity of polytopes separating subsets of the Boolean cube

Abstract

We show that 1. for every A⊂eq \0, 1\n, there exists a polytope P⊂eq Rn with P \0, 1\n = A and extension complexity O(2n/2), 2. there exists an A⊂eq \0, 1\n such that the extension complexity of any P with P \0, 1\n = A must be at least 2n3(1-o(1)). We also remark that the extension complexity of any 0/1-polytope in Rn is at most O(2n/n) and pose the problem whether the upper bound can be improved to O(2cn), for c<1.