- Заглавие:
The Traveling Salesman Problem: Low-Dimensionality Implies a Polynomial Time Approximation Scheme
- Автор:
Bartal Y.
- Аннотация:
The Traveling Salesman Problem (TSP) is among the most famous NP-hard optimization problems. We design for this problem a randomized polynomial-time algorithm that computes a (1+eps)-approximation to the optimal tour, for any fixed eps>0, in TSP instances that form an arbitrary metric space with bounded intrinsic dimension. The celebrated results of Arora (A-98) and Mitchell (M-99) prove that the above result holds in the special case of TSP in a fixed-dimensional Euclidean space. Thus, our algorithm demonstrates that the algorithmic tractability of metric TSP depends on the dimensionality of the space and not on its specific geometry. This result resolves a problem that has been open since the quasi-polynomial time algorithm of Talwar (T-04).
- Язык текста:
Английский
- Сведения об источнике:
SIAM Journal on Computing. – 2016. – Vol. 45, № 4. – P. 1563–1581.
Библиографический источник
The Traveling Salesman Problem: Low-Dimensionality Implies a Polynomial Time Approximation...
Y. Bartal, L.-A. Gottlieb, R. Krauthgamer