On the number of a SDRs of a valued (t,n)-family

Abstract

A system of distinct representatives (SDR) of a family F = (A1, ·s, An) is a sequence (x1, ·s, xn) of n distinct elements with xi ∈ Ai for 1 i n. Let N(F) denote the number of SDRs of a family F; two SDRs are considered distinct if they are different in at least one component. For a nonnegative integer t, a family F=(A1,·s,An) is called a (t,n)-family if the union of any k 1 sets in the family contains at least k+t elements. The famous Hall's Theorem says that N(F) 1 if and only if F is a (0,n)-family. Denote by M(t,n) the minimum number of SDRs in a (t,n)-family. The problem of determining M(t,n) and those families containing exactly M(t,n) SDRs was first raised by Chang [European J. Combin. 10(1989), 231-234]. He solved the cases when 0 t 2 and gave a conjecture for t 3. In this paper, we solve the conjecture. In fact, we get a more general result for so-called valued (t,n)-family.