Linear programming (LP) relaxations provide a powerful technique to design approximation algorithms for combinatorial optimization problems. In the first part of the thesis, we study the metric s-t path Traveling Salesman Problem (TSP) via LP relaxations. We first consider the s-t path graph-TSP, a critical special case of the metric s-t path TSP. We design a new simple LP-based algorithm for the s-t path graph-TSP that achieves the best known approximation factor of 1.5. Then, we turn our attention to the general metric s-t path TSP. [An, Kleinberg, and Shmoys, STOC 2012] improved on the long standing 5/3-approximation factor and presented an algorithm that achieves an approximation factor of (1+\sqrt{5})/2 \approx 1.61803. Later, [Sebo...
We study the traveling salesman problem (TSP) in the case when the objective function of the subtour...
The inapproximability for NP-hard combinatorial optimization problems lies in the heart of theoretic...
Studying the approximation threshold of NP-hard optimization problems, i.e. the ratio of the objecti...
The traveling salesman problem (TSP) is the problem of finding a shortest Hamiltonian circuit or pat...
169 pagesThe Traveling Salesman Problem (TSP) is a fundamental problem in combinatorial optimization...
The Asymmetric Traveling Salesperson Path (ATSPP) problem is one where, given an asymmetric metric s...
The Asymmetric Traveling Salesperson Path (ATSPP) problem is one where, given an asymmetric metric s...
The Travelling Salesman Problem is one of the most fundamental and most studied problems in approxim...
We give a constant-factor approximation algorithm for the asymmetric traveling salesman problem (ATS...
URL to paper on conference siteWe consider the Asymmetric Traveling Salesman problem for costs sati...
International audienceWe give a new, strongly polynomial-time algorithm and improved analysis for th...
The Asymmetric Traveling Salesman Problem and its variants are optimization problems that are widely...
The Asymmetric Travelling Salesman Problem (ATSP) is a famous problem in the field of Combinatorial ...
We prove the approximation ratio 8/5 for the metric {s, t}-path-TSP problem, and more generally for ...
A salesman wishes to make a journey, visiting each of $n$ cities exactly once and finishing at the c...
We study the traveling salesman problem (TSP) in the case when the objective function of the subtour...
The inapproximability for NP-hard combinatorial optimization problems lies in the heart of theoretic...
Studying the approximation threshold of NP-hard optimization problems, i.e. the ratio of the objecti...
The traveling salesman problem (TSP) is the problem of finding a shortest Hamiltonian circuit or pat...
169 pagesThe Traveling Salesman Problem (TSP) is a fundamental problem in combinatorial optimization...
The Asymmetric Traveling Salesperson Path (ATSPP) problem is one where, given an asymmetric metric s...
The Asymmetric Traveling Salesperson Path (ATSPP) problem is one where, given an asymmetric metric s...
The Travelling Salesman Problem is one of the most fundamental and most studied problems in approxim...
We give a constant-factor approximation algorithm for the asymmetric traveling salesman problem (ATS...
URL to paper on conference siteWe consider the Asymmetric Traveling Salesman problem for costs sati...
International audienceWe give a new, strongly polynomial-time algorithm and improved analysis for th...
The Asymmetric Traveling Salesman Problem and its variants are optimization problems that are widely...
The Asymmetric Travelling Salesman Problem (ATSP) is a famous problem in the field of Combinatorial ...
We prove the approximation ratio 8/5 for the metric {s, t}-path-TSP problem, and more generally for ...
A salesman wishes to make a journey, visiting each of $n$ cities exactly once and finishing at the c...
We study the traveling salesman problem (TSP) in the case when the objective function of the subtour...
The inapproximability for NP-hard combinatorial optimization problems lies in the heart of theoretic...
Studying the approximation threshold of NP-hard optimization problems, i.e. the ratio of the objecti...