1. Dicycle cover of Hamiltonian oriented graphs. A dicycle cover of a digraph D is a family F of dicycles of D such that each arc of D lies in at least one dicycle in F. We investigate the problem of determining the upper bounds for the minimum number of dicycles which cover all arcs in a strong digraph. Best possible upper bounds of dicycle covers are obtained in a number of classes of digraphs, including strong tournaments, Hamiltonian oriented graphs, Hamiltonian oriented complete bipartite graphs, and families of possibly non-hamiltonian digraphs obtained from these digraphs via a sequence of 2-sum operations.;2. Supereulerian digraphs with given local structures . Catlin in 1988 indicated that there exist graph families F such that if ...
Let C(l, k) denote the class of 2-edge-connected graphs of order n such that a graph G ∈ C(l, k) if...
This thesis is concerned about the construction of a spanning eulerian supergraph, given a subeuleri...
AbstractAnswering a question of Adrian Bondy (Per. Comm.), we prove that every strong digraph has a ...
1. Dicycle cover of Hamiltonian oriented graphs. A dicycle cover of a digraph D is a family F of dic...
A digraph D is eulerian if D is connected and for any v ∈ V ( D), d+D( v) = d-D( v). A digraph D is ...
International audienceA digraph is eulerian if it is connected and every vertex has its in-degree eq...
A strong digraph D is eulerian if for any v ∈ V (D), d+D (v) = d−D (v). A digraph D is supereulerian...
In this paper, we generalized the above known results and show that this conjecture holds for every ...
International audienceIn this article, we generalize the concepts of Eulerian and Hamiltonian digrap...
AbstractLet D be a strong digraph with n vertices and at least (n − 1)(n − 2) + 3 arcs. For any inte...
We consider finite and simple digraphs. Usually, we use G to denote a graph and D to a digraph. Unde...
A graph is supereulerian if it has a spanning Eulerian subgraph. Motivated by the Chinese Postman Pr...
We consider the problem (MSSS) of finding the minimum number of arcs in a spanning strongly connecte...
AbstractGiven two nonnegative integers s and t, a graph G is (s,t)-supereulerian if for any disjoint...
The so-called Kelly conjecture1 states that every regular tournament on 2k+1 vertices has a decompos...
Let C(l, k) denote the class of 2-edge-connected graphs of order n such that a graph G ∈ C(l, k) if...
This thesis is concerned about the construction of a spanning eulerian supergraph, given a subeuleri...
AbstractAnswering a question of Adrian Bondy (Per. Comm.), we prove that every strong digraph has a ...
1. Dicycle cover of Hamiltonian oriented graphs. A dicycle cover of a digraph D is a family F of dic...
A digraph D is eulerian if D is connected and for any v ∈ V ( D), d+D( v) = d-D( v). A digraph D is ...
International audienceA digraph is eulerian if it is connected and every vertex has its in-degree eq...
A strong digraph D is eulerian if for any v ∈ V (D), d+D (v) = d−D (v). A digraph D is supereulerian...
In this paper, we generalized the above known results and show that this conjecture holds for every ...
International audienceIn this article, we generalize the concepts of Eulerian and Hamiltonian digrap...
AbstractLet D be a strong digraph with n vertices and at least (n − 1)(n − 2) + 3 arcs. For any inte...
We consider finite and simple digraphs. Usually, we use G to denote a graph and D to a digraph. Unde...
A graph is supereulerian if it has a spanning Eulerian subgraph. Motivated by the Chinese Postman Pr...
We consider the problem (MSSS) of finding the minimum number of arcs in a spanning strongly connecte...
AbstractGiven two nonnegative integers s and t, a graph G is (s,t)-supereulerian if for any disjoint...
The so-called Kelly conjecture1 states that every regular tournament on 2k+1 vertices has a decompos...
Let C(l, k) denote the class of 2-edge-connected graphs of order n such that a graph G ∈ C(l, k) if...
This thesis is concerned about the construction of a spanning eulerian supergraph, given a subeuleri...
AbstractAnswering a question of Adrian Bondy (Per. Comm.), we prove that every strong digraph has a ...