We consider the traveling salesman problem when the cities are points in Rd for some fixed d and distances are computed according to a polyhedral norm. We show that for any such norm, the problem of finding a tour of maximum length can be solved in polynomial time. If arithmetic operations are assumed to take unit time, our algorithms run in time O(n f-2 log n), where f is the number of facets of the polyhedron determining the polyhedral norm. Thus for example we have O(n 2 log n) algorithms for the cases of points in the plane under the Rectilinear and Sup norms. This is in contrast to the fact that finding a minimum length tour in each case is NP-hard
We consider labeled Traveling Salesman Problems, defined upon a complete graph of n vertices with co...
Given a set S of n points in the unit square [0, 1]d , an optimal traveling salesman tour of S is a ...
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-t...
We consider the traveling salesman problem when the cities are points in Rd for some fixed d and dis...
We consider the traveling salesman problem when the cities are points in ℝd for some fixed d ...
In this paper, we present a number of results on the Maximum TSP, i.e., the problem of finding a tra...
Recently, Barvinok, Johnson, Woeginger, and Woodroofe have shown that the Maximum TSP, i. e., the pr...
The Traveling Salesman Problem or TSP is probably the best known combinatorial optimisation problem....
AbstractWe give an O(n2m+nm2+m2logm) time and O(n2+m2) space algorithm for finding the shortest trav...
We consider the Travelling Salesman Problem with Vertex Requisitions where, for each position of the...
Many heuristics have been developed to approximate optimal tours for the Euclidean Traveling Salesma...
We show that the traveling salesman problem in bounded-degree graphs can be solved in time O((2 - ep...
The problem of traversing a set of points in the order that minimizes the total distance traveled (t...
We consider labeled Traveling Salesman Problems, defined upon a complete graph of n vertices with co...
Although k-best solutions for polynomial solvable problems are extensively studied in the literature...
We consider labeled Traveling Salesman Problems, defined upon a complete graph of n vertices with co...
Given a set S of n points in the unit square [0, 1]d , an optimal traveling salesman tour of S is a ...
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-t...
We consider the traveling salesman problem when the cities are points in Rd for some fixed d and dis...
We consider the traveling salesman problem when the cities are points in ℝd for some fixed d ...
In this paper, we present a number of results on the Maximum TSP, i.e., the problem of finding a tra...
Recently, Barvinok, Johnson, Woeginger, and Woodroofe have shown that the Maximum TSP, i. e., the pr...
The Traveling Salesman Problem or TSP is probably the best known combinatorial optimisation problem....
AbstractWe give an O(n2m+nm2+m2logm) time and O(n2+m2) space algorithm for finding the shortest trav...
We consider the Travelling Salesman Problem with Vertex Requisitions where, for each position of the...
Many heuristics have been developed to approximate optimal tours for the Euclidean Traveling Salesma...
We show that the traveling salesman problem in bounded-degree graphs can be solved in time O((2 - ep...
The problem of traversing a set of points in the order that minimizes the total distance traveled (t...
We consider labeled Traveling Salesman Problems, defined upon a complete graph of n vertices with co...
Although k-best solutions for polynomial solvable problems are extensively studied in the literature...
We consider labeled Traveling Salesman Problems, defined upon a complete graph of n vertices with co...
Given a set S of n points in the unit square [0, 1]d , an optimal traveling salesman tour of S is a ...
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-t...