Let D = (d(ij)) be the n x n distance matrix of a set of n cities {1, 2,..., n}, and let T be a PQ-tree with node degree bounded by d that represents a set n(T) of permutations over {1, 2,..., n }. We show how to compute for D in O(2(d)n(3)) time the shortest travelling salesman tour contained in n(T). Our algorithm may be interpreted as a common generalization of the well-known Held and Karp dynamic programming algorithm for the TSP and of the dynamic programming algorithm for finding the shortest pyramidal TSP tour. A consequence of our result is that the shortcutting phase of the "twice around the tree" heuristic for the Euclidean TSP can be optimally implemented in polynomial time. This contradicts a statement of Papadimitriou and Vaz...
A traveling salesman problem is studied, containing a shortest Hamiltonian tour that is as long as a...
A neighbourhood N (T ) of a tour T (in the TSP with n cities) is polynomially searchable if the best...
A neighbourhood N (T ) of a tour T (in the TSP with n cities) is polynomially searchable if the best...
Let D = (dij) be the n x n distance matrix of a set of n cities {1, 2, ..., n}, and let T be a PQ-tr...
ABSTRACT. The main objective of the paper is to present an algorithm for finding a solution to the t...
In the path version of the Travelling Salesman Problem (Path-TSP), a salesman is looking for the sho...
This paper discusses several classes of restricted traveling salesman tours and polynomial time algo...
We analyze two classic variants of the TRAVELING SALESMAN PROBLEM (TSP) using the toolkit of fine-gr...
The many-visits traveling salesperson problem (MV-TSP) asks for an optimal tour of n cities that vis...
We analyze two classic variants of the Traveling Salesman Problem using the toolkit of fine-grained ...
The many-visits traveling salesperson problem (MV-TSP) asks for an optimal tour of n cities that vis...
In the travelling salesman problem we are given a graph. The task of the salesman is to find the sho...
The travelling salesperson problem (TSP) is one among the globally recognized and broadly studied pr...
A traveling salesman problem is studied, containing a shortest Hamiltonian tour that is as long as a...
A neighbourhood N (T ) of a tour T (in the TSP with n cities) is polynomially searchable if the best...
A neighbourhood N (T ) of a tour T (in the TSP with n cities) is polynomially searchable if the best...
Let D = (dij) be the n x n distance matrix of a set of n cities {1, 2, ..., n}, and let T be a PQ-tr...
ABSTRACT. The main objective of the paper is to present an algorithm for finding a solution to the t...
In the path version of the Travelling Salesman Problem (Path-TSP), a salesman is looking for the sho...
This paper discusses several classes of restricted traveling salesman tours and polynomial time algo...
We analyze two classic variants of the TRAVELING SALESMAN PROBLEM (TSP) using the toolkit of fine-gr...
The many-visits traveling salesperson problem (MV-TSP) asks for an optimal tour of n cities that vis...
We analyze two classic variants of the Traveling Salesman Problem using the toolkit of fine-grained ...
The many-visits traveling salesperson problem (MV-TSP) asks for an optimal tour of n cities that vis...
In the travelling salesman problem we are given a graph. The task of the salesman is to find the sho...
The travelling salesperson problem (TSP) is one among the globally recognized and broadly studied pr...
A traveling salesman problem is studied, containing a shortest Hamiltonian tour that is as long as a...
A neighbourhood N (T ) of a tour T (in the TSP with n cities) is polynomially searchable if the best...
A neighbourhood N (T ) of a tour T (in the TSP with n cities) is polynomially searchable if the best...