AbstractA digraph is arc-locally in-semicomplete if for any pair of adjacent vertices x,y, every in-neighbor of x and every in-neighbor of y either are adjacent or are the same vertex. A digraph is quasi-arc-transitive if for any arc xy, every in-neighbor of x and every out-neighbor of y either are adjacent or are the same vertex. Laborde, Payan and Xuong proposed the following conjecture: Every digraph has an independent set intersecting every non-augmentable path (in particular, every longest path). In this paper, we shall prove that this conjecture is true for arc-locally in-semicomplete digraphs and quasi-arc-transitive digraphs
AbstractWe consider two generalizations of tournaments, locally semicomplete digraphs introduced in ...
Let $D$ be a digraph. A subset $S$ of $V(D)$ is a stable set if every pair of vertices in $S$ is non...
We investigate sufficient conditions, and in case that D be an asymmetrical digraph a necessary and ...
AbstractA digraph is arc-locally in-semicomplete if for any pair of adjacent vertices x,y, every in-...
AbstractWe study different classes of digraphs, which are generalizations of tournaments, to have th...
AbstractA digraph is arc-locally in-semicomplete if for any pair of adjacent vertices x,y, every in-...
AbstractArc-locally semicomplete digraphs were introduced in (Preprint, No. 10, 1993, Department of ...
AbstractThe Path Partition Conjecture for digraphs states that for every digraph D, and every choice...
AbstractArc-locally semicomplete digraphs were introduced by Bang-Jensen as a common generalization ...
We present several results concerning the Laborde-Payan-Xuang conjecture stating that in every digra...
A digraph D is called semicomplete if for each pair of distinct vertices u, v {dollar}\\in{dollar} V...
AbstractAn outpath of a vertex x (an arc xy, respectively) in a digraph is a directed path starting ...
AbstractA digraph obtained by replacing each edge of a complete n-partite graph by an arc or a pair ...
AbstractA digraph T is called a local tournament if for every vertex x of T, the set of in-neighbors...
AbstractLet D be a digraph, V(D) and A(D) will denote the sets of vertices and arcs of D, respective...
AbstractWe consider two generalizations of tournaments, locally semicomplete digraphs introduced in ...
Let $D$ be a digraph. A subset $S$ of $V(D)$ is a stable set if every pair of vertices in $S$ is non...
We investigate sufficient conditions, and in case that D be an asymmetrical digraph a necessary and ...
AbstractA digraph is arc-locally in-semicomplete if for any pair of adjacent vertices x,y, every in-...
AbstractWe study different classes of digraphs, which are generalizations of tournaments, to have th...
AbstractA digraph is arc-locally in-semicomplete if for any pair of adjacent vertices x,y, every in-...
AbstractArc-locally semicomplete digraphs were introduced in (Preprint, No. 10, 1993, Department of ...
AbstractThe Path Partition Conjecture for digraphs states that for every digraph D, and every choice...
AbstractArc-locally semicomplete digraphs were introduced by Bang-Jensen as a common generalization ...
We present several results concerning the Laborde-Payan-Xuang conjecture stating that in every digra...
A digraph D is called semicomplete if for each pair of distinct vertices u, v {dollar}\\in{dollar} V...
AbstractAn outpath of a vertex x (an arc xy, respectively) in a digraph is a directed path starting ...
AbstractA digraph obtained by replacing each edge of a complete n-partite graph by an arc or a pair ...
AbstractA digraph T is called a local tournament if for every vertex x of T, the set of in-neighbors...
AbstractLet D be a digraph, V(D) and A(D) will denote the sets of vertices and arcs of D, respective...
AbstractWe consider two generalizations of tournaments, locally semicomplete digraphs introduced in ...
Let $D$ be a digraph. A subset $S$ of $V(D)$ is a stable set if every pair of vertices in $S$ is non...
We investigate sufficient conditions, and in case that D be an asymmetrical digraph a necessary and ...