AbstractA tournament is an orientation of a complete graph, and in general a multipartite or c-partite tournament is an orientation of a complete c-partite graph. A digraph D is cycle complementary if there exist two vertex-disjoint directed cycles spanning the vertex set V(D) of D. In this paper we prove that each regular c-partite tournament D of order |V(D)|⩾6 with c⩾3 is cycle complementary, unless D is isomorphic to T7 or to D3,2, where T7 is a 3-regular tournament of order 7, and D3,2 is a 2-regular 3-partite tournament such that there are exactly two vertices in each partite set
AbstractA multipartite tournament is an orientation of a complete multipartite graph. A tournament i...
AbstractA tournament is an orientation of a complete graph and a multipartite or c-partite tournamen...
This thesis mainly deals with the existence of directed cycles and directed paths (or short: cycles ...
AbstractA tournament is an orientation of a complete graph, and in general a multipartite or c-parti...
AbstractThe vertex set of a digraph D is denoted by V(D). A c-partite tournament is an orientation o...
A tournament is a directed graph obtained by assigning a direction for each edge in an undirected co...
summary:If $x$ is a vertex of a digraph $D$, then we denote by $d^+(x)$ and $d^-(x)$ the outdegre...
AbstractA tournament is an orientation of a complete graph, and in general a multipartite or c-parti...
AbstractAn n-partite tournament is an orientation of a complete n-partite graph. In this paper, we g...
AbstractAn in-tournament is an oriented graph such that the negative neighborhood of every vertex in...
AbstractWe prove that if T is a tournament on n⩾7 vertices and x,y are distinct vertices of T with t...
International audienceWe show that every $k$-regular bipartite tournament $B$ with $k \geq 3$ has tw...
AbstractA tournament is an orientation of a complete graph, and in general a multipartite or c-parti...
AbstractIf D is a digraph, then we denote by V(D) its vertex set. A multipartite or c-partite tourna...
AbstractA tournament is an orientation of a complete graph and a multipartite tournament is an orien...
AbstractA multipartite tournament is an orientation of a complete multipartite graph. A tournament i...
AbstractA tournament is an orientation of a complete graph and a multipartite or c-partite tournamen...
This thesis mainly deals with the existence of directed cycles and directed paths (or short: cycles ...
AbstractA tournament is an orientation of a complete graph, and in general a multipartite or c-parti...
AbstractThe vertex set of a digraph D is denoted by V(D). A c-partite tournament is an orientation o...
A tournament is a directed graph obtained by assigning a direction for each edge in an undirected co...
summary:If $x$ is a vertex of a digraph $D$, then we denote by $d^+(x)$ and $d^-(x)$ the outdegre...
AbstractA tournament is an orientation of a complete graph, and in general a multipartite or c-parti...
AbstractAn n-partite tournament is an orientation of a complete n-partite graph. In this paper, we g...
AbstractAn in-tournament is an oriented graph such that the negative neighborhood of every vertex in...
AbstractWe prove that if T is a tournament on n⩾7 vertices and x,y are distinct vertices of T with t...
International audienceWe show that every $k$-regular bipartite tournament $B$ with $k \geq 3$ has tw...
AbstractA tournament is an orientation of a complete graph, and in general a multipartite or c-parti...
AbstractIf D is a digraph, then we denote by V(D) its vertex set. A multipartite or c-partite tourna...
AbstractA tournament is an orientation of a complete graph and a multipartite tournament is an orien...
AbstractA multipartite tournament is an orientation of a complete multipartite graph. A tournament i...
AbstractA tournament is an orientation of a complete graph and a multipartite or c-partite tournamen...
This thesis mainly deals with the existence of directed cycles and directed paths (or short: cycles ...