In the paper, we define a new parameter for tournaments called degreewidth which can be seen as a measure of how far is the tournament from being acyclic. The degreewidth of a tournament $T$ denoted by $\Delta(T)$ is the minimum value $k$ for which we can find an ordering $\langle v_1, \dots, v_n \rangle$ of the vertices of $T$ such that every vertex is incident to at most $k$ backward arcs (\textit{i.e.} an arc $(v_i,v_j)$ such that $j<i$). Thus, a tournament is acyclic if and only if its degreewidth is zero. Additionally, the class of sparse tournaments defined by Bessy et al. [ESA 2017] is exactly the class of tournaments with degreewidth one. We first study computational complexity of finding degreewidth. Namely, we show it is NP-ha...
A tournament is a directed graph T such that every pair of vertices is connected by an arc. A feedba...
A tournament T = (V,A) is a directed graph in which there is exactly one arc between every pair of d...
International audienceAnswering a question of Bang-Jensen and Thomassen, we prove that the minimum f...
Given a tournament with an acyclic tournament as a feedback arc set we give necessary and sufficient...
A tournament is a directed graph in which there is a single arc between every pair of distinct verti...
A tournament is a directed graph in which there is a single arc between every pair of distinct verti...
AbstractThe parameterized feedback vertex (arc) set problem is to find whether there are k vertices ...
AbstractA tournament T=(V,A) is a directed graph in which there is exactly one arc between every pai...
A tournament $T = (V,A)$ is a directed graph in which there is exactly one arc between every pair of...
In this series of two papers we examine the classical problem of ranking a set of players on the bas...
A bipartite tournament is a directed graph T:=(A cup B, E) such that every pair of vertices (a,b), a...
As various combinatorial optimization problems can be formulated as integer linear programs, polyhed...
A tournament is a directed graph T such that every pair of vertices is connected by an arc. A feedba...
We consider the minimum-weight feedback vertex set problem in tournaments: given a tournament with n...
We consider the minimum-weight feedback vertex set problem in tournaments: given a tournament with n...
A tournament is a directed graph T such that every pair of vertices is connected by an arc. A feedba...
A tournament T = (V,A) is a directed graph in which there is exactly one arc between every pair of d...
International audienceAnswering a question of Bang-Jensen and Thomassen, we prove that the minimum f...
Given a tournament with an acyclic tournament as a feedback arc set we give necessary and sufficient...
A tournament is a directed graph in which there is a single arc between every pair of distinct verti...
A tournament is a directed graph in which there is a single arc between every pair of distinct verti...
AbstractThe parameterized feedback vertex (arc) set problem is to find whether there are k vertices ...
AbstractA tournament T=(V,A) is a directed graph in which there is exactly one arc between every pai...
A tournament $T = (V,A)$ is a directed graph in which there is exactly one arc between every pair of...
In this series of two papers we examine the classical problem of ranking a set of players on the bas...
A bipartite tournament is a directed graph T:=(A cup B, E) such that every pair of vertices (a,b), a...
As various combinatorial optimization problems can be formulated as integer linear programs, polyhed...
A tournament is a directed graph T such that every pair of vertices is connected by an arc. A feedba...
We consider the minimum-weight feedback vertex set problem in tournaments: given a tournament with n...
We consider the minimum-weight feedback vertex set problem in tournaments: given a tournament with n...
A tournament is a directed graph T such that every pair of vertices is connected by an arc. A feedba...
A tournament T = (V,A) is a directed graph in which there is exactly one arc between every pair of d...
International audienceAnswering a question of Bang-Jensen and Thomassen, we prove that the minimum f...