Ramsey-Turán theory for partially-ordered sets

Abstract

We introduce weak and strong poset Ramsey-Turán numbers for t-chains in host poset families, focusing on the Boolean lattice family B=\Bn:n 1\. For any poset P, we show RT(B;n,P,l,t) RT(B;n,P,l,t), with equality when P is a chain. In particular, for t=1, RT(B;n,Ck,l)=RT(B;n,Ck,l)=(k-1)(l-1). We also give universal upper bounds for both versions. For fixed k,l,t with \l-1,k-1\ 1, we prove RT(B;n,Ak,l,t)=Θ(nt). More generally, for every non-chain poset P, the strong number is Θ(nt) for fixed l,t. Finally, if h(P)=r>t and l(n)= Mnβ with 0<β α<1, then both weak and strong versions admit lower bounds of order Ω\!(2βnn-β/2).