On r-cross t-intersecting families for weak compositions

Abstract

Let N0 be the set of non-negative integers, and let P(n,l) denote the set of all weak compositions of n with l parts, i.e., P(n,l)=\ (x1,x2,…, xl)∈ N0l\ :\ x1+x2+·s+xl=n\. For any element u=(u1,u2,…, ul)∈ P(n,l), denote its ith-coordinate by u(i), i.e., u(i)=ui. Let l=(l1,l2,…, lr). Families Aj⊂eq P(nj,lj) (j=1,2,…, r) are said to be r-cross t-intersecting if \ i∈ [l] \ :\ u1(i)= u2(i)=·s= ur(i)\ ≥ t for all uj∈ Aj. Suppose that l≥ t+2. We prove that there exists a constant n0=n0(l1,l2,…,lr,t) depending only on lj's and t, such that for all nj≥ n0, if the families Aj⊂eq P(nj,lj) (j=1,2,…, r) are r-cross t-intersecting, then equation Πj=1r Aj ≤ Πj=1r nj+lj-t-1 lj-t-1. equation Moreover, equality holds if and only if there is a t-set T of \1,2,…,l\ such that Aj=\ u∈ P(nj,lj)\ :\ u(i)=0\ for\ all\ i∈ T\ for j=1,2,…, r.