We prove that the traveling salesman problem ({sc Min TSP}) is {sf Max SNP}-hard (and thus {sf NP}-hard to approximate within some constant r>1) even if all cities lie in a Euclidean space of dimension $log n$ (n is the number of cities) and distances are computed with respect to any lp norm. The running time of recent approximation schemes for geometric {sc Min TSP} is doubly exponential in the number of dimensions. Our result implies that this dependence is necessary unless NP has subexponential algorithms. As an intermediate step, we also prove the hardness of approximating {sc Min TSP} in Hamming spaces. Finally, we prove a similar, but weaker, inapproximability result for the Steiner minimal tree problem ({sc Min ST}). The reduction...
For some positive constant 0, we give a ( 32 − 0)-approximation algorithm for the following problem:...
We first prove that the minimum and maximum traveling salesman problems, their metric versions as we...
Traveling Salesman Problem (TSP) given G = (V,E) find a tour visiting each1 node v ∈ V. NP–hard opti...
We prove that the traveling salesman problem ({sc Min TSP}) is {sf Max SNP}-hard (and thus {sf NP}-h...
We study the variant of the Euclidean Traveling Salesman problem where instead of a set of points, w...
The traveling salesman problem (TSP) is one of the most fundamental optimization problems....
The traveling salesman problem (TSP) is the problem of finding a shortest Hamiltonian circuit or pat...
The metric traveling salesman problem is one of the most prominent APX-complete optimization problem...
We consider the metric Traveling Salesman Problem (Δ-TSP for short) and study how stability (as defi...
Abstract. In the Euclidean group Traveling Salesman Problem (TSP), we are given a set of points P in...
Network design problems are important subjects in the study of approximation algorithms. The key cha...
n this extended abstract, we survey some of the recent results on approximating the traveling salesm...
TSP(1,2) is the problem of finding a tour with minimum length in a complete weighted graph where eac...
A salesman wishes to make a journey, visiting each of $n$ cities exactly once and finishing at the c...
We prove that both minimum and maximum traveling salesman problems on complete graphs with edge-dist...
For some positive constant 0, we give a ( 32 − 0)-approximation algorithm for the following problem:...
We first prove that the minimum and maximum traveling salesman problems, their metric versions as we...
Traveling Salesman Problem (TSP) given G = (V,E) find a tour visiting each1 node v ∈ V. NP–hard opti...
We prove that the traveling salesman problem ({sc Min TSP}) is {sf Max SNP}-hard (and thus {sf NP}-h...
We study the variant of the Euclidean Traveling Salesman problem where instead of a set of points, w...
The traveling salesman problem (TSP) is one of the most fundamental optimization problems....
The traveling salesman problem (TSP) is the problem of finding a shortest Hamiltonian circuit or pat...
The metric traveling salesman problem is one of the most prominent APX-complete optimization problem...
We consider the metric Traveling Salesman Problem (Δ-TSP for short) and study how stability (as defi...
Abstract. In the Euclidean group Traveling Salesman Problem (TSP), we are given a set of points P in...
Network design problems are important subjects in the study of approximation algorithms. The key cha...
n this extended abstract, we survey some of the recent results on approximating the traveling salesm...
TSP(1,2) is the problem of finding a tour with minimum length in a complete weighted graph where eac...
A salesman wishes to make a journey, visiting each of $n$ cities exactly once and finishing at the c...
We prove that both minimum and maximum traveling salesman problems on complete graphs with edge-dist...
For some positive constant 0, we give a ( 32 − 0)-approximation algorithm for the following problem:...
We first prove that the minimum and maximum traveling salesman problems, their metric versions as we...
Traveling Salesman Problem (TSP) given G = (V,E) find a tour visiting each1 node v ∈ V. NP–hard opti...