Add to ORKGLet G = (V, A) be an Eulerian directed graph with an arc-labeling. In this work we study the problem of finding an Eulerian circuit of lexicographically minimal label among all Eulerian circuits of the graph. We prove that this problem is NP-hard by showing a reduction from the DIRECTED-HAMILTONIAN-CIRCUIT problem. If the labeling of the arcs is such that. arcs going out from the same vertex have different labels, the problem can be solved in polynomial time. We present an algorithm to construct the unique Eulerian circuit of lexicographically minimal label starting at a fixed vertex. Our algorithm is a recursive greedy algorithm which runs in O(vertical bar A vertical bar) steps. We also show an application of this algorithm to construct ...
A directed multigraph is called Eulerian if it has a circuit which uses each edge exactly once. Eule...
We show that the problem of counting the number of Eulerian circuits in an undirected graph is compl...
Funding Information: We are very grateful to the anonymous reviewers who helped improved the present...
Let G = (V, A) be an Eulerian directed graph with an arc-labeling. In this work we study the problem...
Abstract. Let G = (V, A) be an Eulerian directed graph with an arclabeling. In this work we study th...
AbstractGiven a digraph (directed graph) with a labeling on its arcs, we study the problem of findin...
Given a digraph (directed graph) with a labeling on its arcs, we study the problem of finding the Eu...
AbstractGiven a digraph (directed graph) with a labeling on its arcs, we study the problem of findin...
Artículo de publicaciónLet be the following strategy to construct a walk in a labeled digraph: at ea...
Artículo de publicaciónLet be the following strategy to construct a walk in a labeled digraph: at ea...
An Eulerian circuit in a directed graph is one of the most fundamental Graph Theory notions. Detecti...
An Eulerian circuit in a directed graph is one of the most fundamental Graph Theory notions. Detecti...
6siA directed multigraph is called Eulerian if it has a circuit which uses each edge exactly once. E...
A directed multigraph is called Eulerian if it has a circuit which uses each edge exactly once. Eule...
A directed multigraph is called Eulerian if it has a circuit which uses each edge exactly once. Eule...
A directed multigraph is called Eulerian if it has a circuit which uses each edge exactly once. Eule...
We show that the problem of counting the number of Eulerian circuits in an undirected graph is compl...
Funding Information: We are very grateful to the anonymous reviewers who helped improved the present...
Let G = (V, A) be an Eulerian directed graph with an arc-labeling. In this work we study the problem...
Abstract. Let G = (V, A) be an Eulerian directed graph with an arclabeling. In this work we study th...
AbstractGiven a digraph (directed graph) with a labeling on its arcs, we study the problem of findin...
Given a digraph (directed graph) with a labeling on its arcs, we study the problem of finding the Eu...
AbstractGiven a digraph (directed graph) with a labeling on its arcs, we study the problem of findin...
Artículo de publicaciónLet be the following strategy to construct a walk in a labeled digraph: at ea...
Artículo de publicaciónLet be the following strategy to construct a walk in a labeled digraph: at ea...
An Eulerian circuit in a directed graph is one of the most fundamental Graph Theory notions. Detecti...
An Eulerian circuit in a directed graph is one of the most fundamental Graph Theory notions. Detecti...
6siA directed multigraph is called Eulerian if it has a circuit which uses each edge exactly once. E...
A directed multigraph is called Eulerian if it has a circuit which uses each edge exactly once. Eule...
A directed multigraph is called Eulerian if it has a circuit which uses each edge exactly once. Eule...
A directed multigraph is called Eulerian if it has a circuit which uses each edge exactly once. Eule...
We show that the problem of counting the number of Eulerian circuits in an undirected graph is compl...
Funding Information: We are very grateful to the anonymous reviewers who helped improved the present...