The Hamiltonian Cycle problem asks if an $n$-vertex graph $G$ has a cycle passing through all vertices of $G$. This problem is a classic $NP$-complete problem. So far, finding an exact algorithm that solves it in $O^*(\aplha^n)$ time for some constant $\alpha < 2$ is a notorious open problem. For a claw-free graph $G$, finding a hamiltonian cycle is equivalent to finding a closed trail (eulerian subgraph) that dominates the edges of some associated graph $H$. Using this translation we obtain two exact algorithms that solve the Hamiltonian Cycle problem for the class of claw-free graphs: one algorithm that uses $O^*(1.6818^n)$ time and exponential space, and one algorithm that uses $O^*(1.8878^n)$ time and polynomial space
AbstractLet u and v be two vertices in a graph G. We say vertex u dominates vertex v if N(v)⊆N(u)∪{u...
AbstractLet G be a 2-connected claw-free graph on n vertices. Let σk(G) be the minimum degree sum am...
We construct an exact algorithm for the Hamiltonian cycle problem in planar graphs with worst case t...
The Hamiltonian Cycle problem asks if an n-vertex graph G has a cycle passing through all vertices o...
The Hamiltonian Cycle problem asks if an n-vertex graph G has a cycle passing through all vertices o...
The Hamiltonian Cycle problem is the problem of deciding whether an n-vertex graph G has a cycle pas...
The Hamiltonian Cycle problem is the problem of deciding whether an n-vertex graph G has a cycle pas...
Dirac's theorem (1952) is a classical result of graph theory, stating that an $n$-vertex graph ($n \...
In this paper, we prove that, given a clique-width k-expression of an n-vertex graph, Hamiltonian Cy...
International audienceFor MSO$_2$-expressible problems like Edge Dominating Set or Hamiltonian Cycle...
grantor: University of TorontoA graph 'G' is called claw-free if it does not contain a cop...
Dirac’s theorem (1952) is a classical result of graph theory, stating that an n-vertex graph (n≥3n≥3...
AbstractA Hamiltonian path of a graph G is a simple path that contains each vertex of G exactly once...
This research paper was completed and submitted at Nipissing University, and is made freely accessib...
Given a Graph G (V, E), We Consider the problem of deciding whether G is Hamiltonian, that is- wheth...
AbstractLet u and v be two vertices in a graph G. We say vertex u dominates vertex v if N(v)⊆N(u)∪{u...
AbstractLet G be a 2-connected claw-free graph on n vertices. Let σk(G) be the minimum degree sum am...
We construct an exact algorithm for the Hamiltonian cycle problem in planar graphs with worst case t...
The Hamiltonian Cycle problem asks if an n-vertex graph G has a cycle passing through all vertices o...
The Hamiltonian Cycle problem asks if an n-vertex graph G has a cycle passing through all vertices o...
The Hamiltonian Cycle problem is the problem of deciding whether an n-vertex graph G has a cycle pas...
The Hamiltonian Cycle problem is the problem of deciding whether an n-vertex graph G has a cycle pas...
Dirac's theorem (1952) is a classical result of graph theory, stating that an $n$-vertex graph ($n \...
In this paper, we prove that, given a clique-width k-expression of an n-vertex graph, Hamiltonian Cy...
International audienceFor MSO$_2$-expressible problems like Edge Dominating Set or Hamiltonian Cycle...
grantor: University of TorontoA graph 'G' is called claw-free if it does not contain a cop...
Dirac’s theorem (1952) is a classical result of graph theory, stating that an n-vertex graph (n≥3n≥3...
AbstractA Hamiltonian path of a graph G is a simple path that contains each vertex of G exactly once...
This research paper was completed and submitted at Nipissing University, and is made freely accessib...
Given a Graph G (V, E), We Consider the problem of deciding whether G is Hamiltonian, that is- wheth...
AbstractLet u and v be two vertices in a graph G. We say vertex u dominates vertex v if N(v)⊆N(u)∪{u...
AbstractLet G be a 2-connected claw-free graph on n vertices. Let σk(G) be the minimum degree sum am...
We construct an exact algorithm for the Hamiltonian cycle problem in planar graphs with worst case t...