Add to ORKGIn this thesis, we study arc colorings and cycles in digraphs. The following topics are considered: vertex-distinguishing proper arc colorings in digraphs, short cycles in digraphs with forbidden subgraphs , disjoint cycles in bipartite tournaments, cycle factors in regualr bipartite tournaments and universal arcs in tournaments. The main results are contained in five original articles published or submitted to an international journal. We introduce vertex-distinguishing proper arc colorings of digraphs. A conjecture on the vertex-distinguishing arc-chromatic number is given and some partial results are obtained. We extend a result of Razborov by proving that the Caccetta-Häggkvist conjecture is true for digraphs with certain induced forbi...
AbstractThe Bermond–Thomassen conjecture states for r≥1, any digraph of minimum out-degree at least ...
AbstractB. Alspach has proved that a regular tournament is arc-pancyclic. Zhu and Tian proved that i...
A digraph without loops, multiple arcs and cycles of length two is called a local tournament if the ...
In this thesis, we study arc colorings and cycles in digraphs. The following topics are considered: ...
In this thesis, we study arc colorings and cycles in digraphs. The following topics are considered: ...
In this thesis, we study arc colorings and cycles in digraphs. The following topics are considered: ...
Cette thèse étudie la coloration d'arcs et de cycles dans les graphes orientés. Elle se concentre su...
For k¿=¿2, a strongly connected digraph D is called -connected if it contains a set of arcs W such t...
AbstractIf x is a vertex of a digraph D, then we denote by d+(x) and d−(x) the outdegree and the ind...
We study the complexity of finding 2-factors with various restrictions as well as edge-decomposition...
We study the complexity of finding 2-factors with various restrictions as well as edge-decomposition...
This thesis consists of two parts where the first one represents theoretical results in the field of...
AbstractIn this paper we collect a substantial number of challenging open problems and conjectures o...
AbstractThe Bermond–Thomassen conjecture states for r≥1, any digraph of minimum out-degree at least ...
A digraph D is called semicomplete if for each pair of distinct vertices u, v {dollar}\\in{dollar} V...
AbstractThe Bermond–Thomassen conjecture states for r≥1, any digraph of minimum out-degree at least ...
AbstractB. Alspach has proved that a regular tournament is arc-pancyclic. Zhu and Tian proved that i...
A digraph without loops, multiple arcs and cycles of length two is called a local tournament if the ...
In this thesis, we study arc colorings and cycles in digraphs. The following topics are considered: ...
In this thesis, we study arc colorings and cycles in digraphs. The following topics are considered: ...
In this thesis, we study arc colorings and cycles in digraphs. The following topics are considered: ...
Cette thèse étudie la coloration d'arcs et de cycles dans les graphes orientés. Elle se concentre su...
For k¿=¿2, a strongly connected digraph D is called -connected if it contains a set of arcs W such t...
AbstractIf x is a vertex of a digraph D, then we denote by d+(x) and d−(x) the outdegree and the ind...
We study the complexity of finding 2-factors with various restrictions as well as edge-decomposition...
We study the complexity of finding 2-factors with various restrictions as well as edge-decomposition...
This thesis consists of two parts where the first one represents theoretical results in the field of...
AbstractIn this paper we collect a substantial number of challenging open problems and conjectures o...
AbstractThe Bermond–Thomassen conjecture states for r≥1, any digraph of minimum out-degree at least ...
A digraph D is called semicomplete if for each pair of distinct vertices u, v {dollar}\\in{dollar} V...
AbstractThe Bermond–Thomassen conjecture states for r≥1, any digraph of minimum out-degree at least ...
AbstractB. Alspach has proved that a regular tournament is arc-pancyclic. Zhu and Tian proved that i...
A digraph without loops, multiple arcs and cycles of length two is called a local tournament if the ...