Locally semicomplete digraphs: A generalization of tournaments

## Abstract It is shown that every __k__‐connected locally semicomplete digraph __D__ with minimum outdegree at least 2__k__ and minimum indegree at least 2__k__ − 2 has at least __m__ = max{2, __k__} vertices __x__~1~, __x__~2~, ⃛, __x__~__m__~ such that __D__ − __x__~__i__~ is __k__‐connected for

The notions of rotational tournament and the associated symbol set are generalized to r-tournaments. It is shown that a necessary and sufficient condition for the existence of a rotational r-tournament on n vertices is (n, r) = 1. A scheme to generate rotational r'tournaments is given, along with so

In this paper we investigate the foliowing generalization of transitivity: A digraph D is (m, n)-transitive whenever there is a path of length m from x to y there is a subset of n + 1 vertices of these m + 1 vertices which contain a path of length n from x to y. Here we study various properties of

We survey results concerning various generalizations of tournaments. The reader will see that tournaments are by no means the only class of directed graphs with a very rich structure. We describe, among numerous other topics mostly related to paths and cycles, results on hamiltonian paths and cycle

This paper studies the probability that a random tournament with specified score sequence contains a specified subgraph. The exact asymptotic value is found in the case that the scores are not too far from regular and the subgraph is not too large. An ndimensional saddle-point method is used. As a s