This paper proposes a local search algorithm for a specific combinatorial optimisation problem in graph theory: the Hamiltonian Completion Problem (HCP) on undirected graphs. In this problem, the objective is to add as few edges as possible to a given undirected graph in order to obtain a Hamiltonian graph. This problem has mainly been studied in the context of various specific kinds of undirected graphs (e.g. trees, unicyclic graphs and series-parallel graphs). The proposed algorithm, however, concentrates on solving HCP for general undirected graphs. It can be considered to belong to the category of matheuristics, because it integrates an exact linear time solution for trees into a local search algorithm for general graphs. This integrati...
We present a polynomial complexity, deterministic, heuristic for solving the Hamiltonian cycle probl...
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...
Given a graph G = (V ,E), the Hamiltonian completion number of G, HCN(G), is the minimum number of ...
AbstractIn this paper a polynomial algorithm called the Minram algorithm is presented which finds a ...
The paper suggests an exhaustive search algorithm for finding Hamiltonian circuits in an undirected...
Given a graph G = (V , E ), HCN (L(G)) is the minimum number of edges to be added to its line graph ...
This paper describes a polynomial time algorithm HAM that searches for Hamilton cycles in undirected...
This paper describes a polynomial time algorithm HAM that searches for Hamilton cycles in undirected...
This paper describes a polynomial time algorithm HAM that searches for Hamilton cycles in undirected...
The Hamiltonian cycle problem consists of finding a cycle in a given graph that passes through every...
Given a graph G = (V, E), HCN(L(G)) is the minimum number of edges to be added to its line graph L(G...
A Hamilton cycle in a graph is a cycle that passes through every vertex of the graph. A graph is cal...
AbstractGiven a (directed or undirected) graph G, finding the smallest number of additional edges wh...
Given a line graph L(G) of a graph G=(V,E), the problem of finding the minimum number of edges to ad...
We present a polynomial complexity, deterministic, heuristic for solving the Hamiltonian cycle probl...
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...
Given a graph G = (V ,E), the Hamiltonian completion number of G, HCN(G), is the minimum number of ...
AbstractIn this paper a polynomial algorithm called the Minram algorithm is presented which finds a ...
The paper suggests an exhaustive search algorithm for finding Hamiltonian circuits in an undirected...
Given a graph G = (V , E ), HCN (L(G)) is the minimum number of edges to be added to its line graph ...
This paper describes a polynomial time algorithm HAM that searches for Hamilton cycles in undirected...
This paper describes a polynomial time algorithm HAM that searches for Hamilton cycles in undirected...
This paper describes a polynomial time algorithm HAM that searches for Hamilton cycles in undirected...
The Hamiltonian cycle problem consists of finding a cycle in a given graph that passes through every...
Given a graph G = (V, E), HCN(L(G)) is the minimum number of edges to be added to its line graph L(G...
A Hamilton cycle in a graph is a cycle that passes through every vertex of the graph. A graph is cal...
AbstractGiven a (directed or undirected) graph G, finding the smallest number of additional edges wh...
Given a line graph L(G) of a graph G=(V,E), the problem of finding the minimum number of edges to ad...
We present a polynomial complexity, deterministic, heuristic for solving the Hamiltonian cycle probl...
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...