Supersaturation and stability for forbidden subposet problems

Abstract

We address a supersaturation problem in the context of forbidden subposets. A family F of sets is said to contain the poset P if there is an injection i:P → F such that p P q implies i(p) ⊂ i (q). The poset on four elements a,b,c,d with a,b c,d is called butterfly. The maximum size of a family F ⊂eq 2[n] that does not contain a butterfly is (n,2)=n n/2 +n n/2 +1 as proved by De Bonis, Katona, and Swanepoel. We prove that if F ⊂eq 2[n] contains (n,2)+E sets, then it has to contain at least (1-o(1))E( n/2 +1) n/22 copies of the butterfly provided E 2n1- for some positive . We show by a construction that this is asymptotically tight and for small values of E we show that the minimum number of butterflies contained in F is exactly E( n/2 +1) n/22.