We show that the max entropy algorithm can be derandomized (with respect to a particular objective function) to give a deterministic $3/2-\epsilon$ approximation algorithm for metric TSP for some $\epsilon > 10^{-36}$. To obtain our result, we apply the method of conditional expectation to an objective function constructed in prior work which was used to certify that the expected cost of the algorithm is at most $3/2-\epsilon$ times the cost of an optimal solution to the subtour elimination LP. The proof in this work involves showing that the expected value of this objective function can be computed in polynomial time (at all stages of the algorithm's execution)
AbstractWe present deterministic approximation algorithms for the multi-criteria maximum traveling s...
The metric traveling salesman problem is one of the most prominent APX-complete optimization problem...
We present a randomized approximation algorithm for computing traveling salesperson tours in undirec...
We describe recent joint work with Nathan Klein and Shayan Oveis Gharan showing that for any metric ...
For some $\epsilon > 10^{-36}$ we give a $3/2-\epsilon$ approximation algorithm for metric TSP
AbstractWe present the first 7/8-approximation algorithm for the maximum Traveling Salesman Problem ...
We show that for some $\epsilon > 10^{-36}$ and any metric TSP instance, the max entropy algorithm r...
We present an improved performance analysis of select-and-extend heuristics for the metric traveling...
The Travelling Salesman Problem is one of the most fundamental and most studied problems in approxim...
We present the first 7/8-approximation algorithm for the maximum traveling salesman problem with tri...
Presented on November 11, 2011 in Klaus 1116Runtime: 54:36 minutesWe show a (3/2-epsilon)-approxima...
We present two polynomial-time approximation algorithms for the metric case of the maximum traveling...
The traveling salesman problem (TSP) is one of the most fundamental optimization problems....
We consider the design of sublinear space and query complexity algorithms for estimating the cost of...
The Traveling Salesman Problem (TSP) is a canoni-cal NP-complete problem which is known to be MAX-SN...
AbstractWe present deterministic approximation algorithms for the multi-criteria maximum traveling s...
The metric traveling salesman problem is one of the most prominent APX-complete optimization problem...
We present a randomized approximation algorithm for computing traveling salesperson tours in undirec...
We describe recent joint work with Nathan Klein and Shayan Oveis Gharan showing that for any metric ...
For some $\epsilon > 10^{-36}$ we give a $3/2-\epsilon$ approximation algorithm for metric TSP
AbstractWe present the first 7/8-approximation algorithm for the maximum Traveling Salesman Problem ...
We show that for some $\epsilon > 10^{-36}$ and any metric TSP instance, the max entropy algorithm r...
We present an improved performance analysis of select-and-extend heuristics for the metric traveling...
The Travelling Salesman Problem is one of the most fundamental and most studied problems in approxim...
We present the first 7/8-approximation algorithm for the maximum traveling salesman problem with tri...
Presented on November 11, 2011 in Klaus 1116Runtime: 54:36 minutesWe show a (3/2-epsilon)-approxima...
We present two polynomial-time approximation algorithms for the metric case of the maximum traveling...
The traveling salesman problem (TSP) is one of the most fundamental optimization problems....
We consider the design of sublinear space and query complexity algorithms for estimating the cost of...
The Traveling Salesman Problem (TSP) is a canoni-cal NP-complete problem which is known to be MAX-SN...
AbstractWe present deterministic approximation algorithms for the multi-criteria maximum traveling s...
The metric traveling salesman problem is one of the most prominent APX-complete optimization problem...
We present a randomized approximation algorithm for computing traveling salesperson tours in undirec...