Let n and k(n ≥ k 〉 1) be two non-negative integers.A k-multi-hypertournament on n vertices is a pair(V,A),where V is a set of vertices with |V|=n,and A is a set of k-tuples of vertices,called arcs,such that f...Let n and k(n ≥ k 〉 1) be two non-negative integers.A k-multi-hypertournament on n vertices is a pair(V,A),where V is a set of vertices with |V|=n,and A is a set of k-tuples of vertices,called arcs,such that for any k-subset S of V,A contains at least one(at most k!) of the k! k-tuples whose entries belong to S.The necessary and suffcient conditions for a non-decreasing sequence of non-negative integers to be the out-degree sequence(in-degree sequence) of some k-multi-hypertournament are given.展开更多
Given non-negative integers m,n,h and k with m≥ h 〉 1 and n ≥ k 〉 1, an (h, k)-bipartite hypertournament on m + n vertices is a triple (U, V, A), where U and V are two sets of vertices with |U| = m and |V...Given non-negative integers m,n,h and k with m≥ h 〉 1 and n ≥ k 〉 1, an (h, k)-bipartite hypertournament on m + n vertices is a triple (U, V, A), where U and V are two sets of vertices with |U| = m and |V| = n, and A is a set of (h + k)-tuples of vertices,called arcs, with at most h vertices from U and at most k vertices from V, such that for any h+k subsets U1 UV1 of UUV, A contains exactly one of the (h+k)! (h+k)-tuples whose entries belong to U1 ∪ V1. Necessary and sufficient conditions for a pair of non-decreasing sequences of non-negative integers to be the losing score lists or score lists of some(h, k)-bipartite hypertournament are obtained.展开更多
文摘Let n and k(n ≥ k 〉 1) be two non-negative integers.A k-multi-hypertournament on n vertices is a pair(V,A),where V is a set of vertices with |V|=n,and A is a set of k-tuples of vertices,called arcs,such that for any k-subset S of V,A contains at least one(at most k!) of the k! k-tuples whose entries belong to S.The necessary and suffcient conditions for a non-decreasing sequence of non-negative integers to be the out-degree sequence(in-degree sequence) of some k-multi-hypertournament are given.
基金Supported by the National Natural Science Foundation of China(10501021)
文摘Given non-negative integers m,n,h and k with m≥ h 〉 1 and n ≥ k 〉 1, an (h, k)-bipartite hypertournament on m + n vertices is a triple (U, V, A), where U and V are two sets of vertices with |U| = m and |V| = n, and A is a set of (h + k)-tuples of vertices,called arcs, with at most h vertices from U and at most k vertices from V, such that for any h+k subsets U1 UV1 of UUV, A contains exactly one of the (h+k)! (h+k)-tuples whose entries belong to U1 ∪ V1. Necessary and sufficient conditions for a pair of non-decreasing sequences of non-negative integers to be the losing score lists or score lists of some(h, k)-bipartite hypertournament are obtained.
