International audienceThe decision problems of the existence of a Hamiltonian cycle or of a Hamiltonian path in a given graph, and of the existence of a truth assignment satisfying a given Boolean formula C, are well-known NPcomplete problems. Here we study the problems of the uniqueness of a Hamiltonian cycle or path in an undirected, directed or oriented graph, and show that they have the same complexity, up to polynomials, as the problem U-SAT of the uniqueness of an assignment satisfying C. As a consequence, these Hamiltonian problems are NP-hard and belong to the class DP, like U-SAT
We study graph theory. A graph is composed by a vertex set and an edge set, and each edge joins an u...
Hamiltonian cycle and Hamiltonian path problems are famous hard problems. The Hamiltonian cycle seem...
We study the computational complexity of the Hamiltonian cycle problem in the class of graphs of ver...
International audienceThe decision problems of the existence of a Hamiltonian cycle or of a Hamilton...
Bertossi and Bonuccelli [2] proved that the Hamiltonian Circuit problem in NP-Complete even when the...
AbstractThe problem of deciding whether a 3-regular graph has a hamiltonian cycle (or path) was prov...
AbstractThe main result of this paper is the NP-completeness of the HAMILTONIAN CIRCUIT problem for ...
AbstractWe survey results on the sequential and parallel complexity of hamiltonian path and cycle pr...
AbstractA number of results in hamiltonian graph theory are of the form “P1 implies P2”, where P1 is...
AbstractSince finding whether a graph has a Hamiltonian path or Hamiltonian cycle are both NP-comple...
Given a Graph G (V, E), We Consider the problem of deciding whether G is Hamiltonian, that is- wheth...
In this paper we present the first deterministic polynomial time algorithm for determining the exist...
A number of results in Hamiltonian graph theory are of the form $\mathcal{P}$$_{1}$ implies $\mathca...
AbstractFinding a Hamiltonian path or a Hamiltonian cycle in a general graph are classic NP-complete...
An algorithm for an NP-complete problem is presented, namely the existence of a Directed Hamiltonian...
We study graph theory. A graph is composed by a vertex set and an edge set, and each edge joins an u...
Hamiltonian cycle and Hamiltonian path problems are famous hard problems. The Hamiltonian cycle seem...
We study the computational complexity of the Hamiltonian cycle problem in the class of graphs of ver...
International audienceThe decision problems of the existence of a Hamiltonian cycle or of a Hamilton...
Bertossi and Bonuccelli [2] proved that the Hamiltonian Circuit problem in NP-Complete even when the...
AbstractThe problem of deciding whether a 3-regular graph has a hamiltonian cycle (or path) was prov...
AbstractThe main result of this paper is the NP-completeness of the HAMILTONIAN CIRCUIT problem for ...
AbstractWe survey results on the sequential and parallel complexity of hamiltonian path and cycle pr...
AbstractA number of results in hamiltonian graph theory are of the form “P1 implies P2”, where P1 is...
AbstractSince finding whether a graph has a Hamiltonian path or Hamiltonian cycle are both NP-comple...
Given a Graph G (V, E), We Consider the problem of deciding whether G is Hamiltonian, that is- wheth...
In this paper we present the first deterministic polynomial time algorithm for determining the exist...
A number of results in Hamiltonian graph theory are of the form $\mathcal{P}$$_{1}$ implies $\mathca...
AbstractFinding a Hamiltonian path or a Hamiltonian cycle in a general graph are classic NP-complete...
An algorithm for an NP-complete problem is presented, namely the existence of a Directed Hamiltonian...
We study graph theory. A graph is composed by a vertex set and an edge set, and each edge joins an u...
Hamiltonian cycle and Hamiltonian path problems are famous hard problems. The Hamiltonian cycle seem...
We study the computational complexity of the Hamiltonian cycle problem in the class of graphs of ver...