Supersaturation, counting, and randomness in forbidden subposet problems

Abstract

In the area of forbidden subposet problems we look for the largest possible size La(n,P) of a family F⊂eq 2[n] that does not contain a forbidden inclusion pattern described by P. The main conjecture of the area states that for any finite poset P there exists an integer e(P) such that La(n,P)=(e(P)+o(1))n n/2. In this paper, we formulate three strengthenings of this conjecture and prove them for some specific classes of posets. (The parameters x(P) and d(P) are defined in the paper.) For any finite connected poset P and >0, there exists δ>0 and an integer x(P) such that for any n large enough, and F⊂eq 2[n] of size (e(P)+)n n/2, F contains at least δ nx(P)n n/2 copies of P. The number of P-free families in 2[n] is 2(e(P)+o(1))n n/2. For any finite poset P, there exists a positive rational d(P) such that if p=ω(n-d(P)), then the size of the largest P-free family in P(n,p) is (e(P)+o(1))pn n/2 with high probability.