AbstractWe propose an improved algorithm for counting the number of Hamiltonian cycles in a directed graph. The basic idea of the method is sequential acceptance/rejection, which is successfully used in approximating the number of perfect matchings in dense bipartite graphs. As a consequence, a new ratio of the number of Hamiltonian cycles to the number of 1-factors is proposed. Based on this ratio, we prove that our algorithm runs in expected time of O(n8.5) for dense problems. This improves the Markov chain Monte Carlo method, the most powerful existing method, by a factor of at least n4.5(logn)4 in running time. This class of dense problems is shown to be nontrivial in counting, in the sense that they are #P-Complete
In this paper we present the first deterministic polynomial time algorithm for determining the exist...
We analyze the performance of a simple randomized algorithm for finding 2-factors in directed Hamilt...
For even k ϵ N, the matchings connectivity matrix Mk is a binary matrix indexed by perfect matchings...
AbstractWe propose an improved algorithm for counting the number of Hamiltonian cycles in a directed...
AbstractWe describe a polynomial time (O(n3 log n)) algorithm which has a high probability of findin...
We are motivated by a tantalizing open question in exact algorithms: can we detect whether an n-vert...
We analyze the performance of a simple randomized algorithm for finding long cycles and 2-factors in...
published source had been acknowledged original journal website: http://www.informatik.uni-trier.de/...
In this paper, we present a distributed algorithm to find Hamiltonian cycles in random binomial grap...
A Hamilton cycle in a digraph is a cycle passing through all the vertices, where all the arcs are or...
A Hamilton cycle in a digraph is a cycle that passes through all the vertices, where all the arcs ar...
We present a Monte Carlo algorithm that detects the presence of a Hamiltonian cycle in an n-vertex u...
We are motivated by a tantalizing open question in exact algorithms: can we detect whether an n-vert...
We design a randomized algorithm that finds a Hamilton cycle in O(n) time with high probability in a...
We present a Monte Carlo algorithm for Hamiltonicity detection in an $n$-vertex undirected graph run...
In this paper we present the first deterministic polynomial time algorithm for determining the exist...
We analyze the performance of a simple randomized algorithm for finding 2-factors in directed Hamilt...
For even k ϵ N, the matchings connectivity matrix Mk is a binary matrix indexed by perfect matchings...
AbstractWe propose an improved algorithm for counting the number of Hamiltonian cycles in a directed...
AbstractWe describe a polynomial time (O(n3 log n)) algorithm which has a high probability of findin...
We are motivated by a tantalizing open question in exact algorithms: can we detect whether an n-vert...
We analyze the performance of a simple randomized algorithm for finding long cycles and 2-factors in...
published source had been acknowledged original journal website: http://www.informatik.uni-trier.de/...
In this paper, we present a distributed algorithm to find Hamiltonian cycles in random binomial grap...
A Hamilton cycle in a digraph is a cycle passing through all the vertices, where all the arcs are or...
A Hamilton cycle in a digraph is a cycle that passes through all the vertices, where all the arcs ar...
We present a Monte Carlo algorithm that detects the presence of a Hamiltonian cycle in an n-vertex u...
We are motivated by a tantalizing open question in exact algorithms: can we detect whether an n-vert...
We design a randomized algorithm that finds a Hamilton cycle in O(n) time with high probability in a...
We present a Monte Carlo algorithm for Hamiltonicity detection in an $n$-vertex undirected graph run...
In this paper we present the first deterministic polynomial time algorithm for determining the exist...
We analyze the performance of a simple randomized algorithm for finding 2-factors in directed Hamilt...
For even k ϵ N, the matchings connectivity matrix Mk is a binary matrix indexed by perfect matchings...