International audienceWe prove new results for approximating the graphic TSP and some related problems. We obtain polynomial-time algorithms with improved approximation guarantees. For the graphic TSP itself, we improve the approximation ratio to 7/5. For a generalization, the connected-$T$-join problem, we obtain the first nontrivial approximation algorithm, with ratio 3/2. This contains the graphic $s$-$t$-path-TSP as a special case. Our improved approximation guarantee for finding a smallest 2-edge-connected spanning subgraph is 4/3. The key new ingredient of all our algorithms is a special kind of ear-decomposition optimized using forest representations of hypergraphs. The same methods also provide the lower bounds (arising from LP rela...
The traveling salesman problem (TSP) is the problem of finding a shortest Hamiltonian circuit or pat...
The approximability of the maximum edge disjoint paths problem (EDP) in directed graphs was seemingl...
We present an O(log n·log k)-approximation algorithm for the prob-lem of finding k-vertex connected ...
International audienceWe prove new results for approximating the graphic TSP and some related proble...
We prove the approximation ratio 8/5 for the metric {s, t}-path-TSP problem, and more generally for ...
We give a 17 12-approximation algorithm for the following NP-hard problem: Given a simple undirected...
We give a 17 12 -approximation algorithm for the following NP-hard problem: Given an undirected gra...
We consider a generalized Path Traveling Salesman Problem where the distances are defined by a 2-edg...
In this thesis we focus on two NP-hard and intensively studied problems: The travelling salesman pro...
We consider the problem of finding the minimum 2-vertex connected spanning subgraph in a given graph...
The T-tour problem is a natural generalization of TSP and Path TSP. Given a graph G=(V,E), edge cost...
Given an undirected graph, finding either a minimum 2-edge-connected spanning subgraph or a minimum ...
A 5/4-approximation algorithm is presented for the minimum cardinality 2-edge-connected spanning sub...
We present a framework for approximating the metric TSP based on a novel use of matchings. Tradition...
n this extended abstract, we survey some of the recent results on approximating the traveling salesm...
The traveling salesman problem (TSP) is the problem of finding a shortest Hamiltonian circuit or pat...
The approximability of the maximum edge disjoint paths problem (EDP) in directed graphs was seemingl...
We present an O(log n·log k)-approximation algorithm for the prob-lem of finding k-vertex connected ...
International audienceWe prove new results for approximating the graphic TSP and some related proble...
We prove the approximation ratio 8/5 for the metric {s, t}-path-TSP problem, and more generally for ...
We give a 17 12-approximation algorithm for the following NP-hard problem: Given a simple undirected...
We give a 17 12 -approximation algorithm for the following NP-hard problem: Given an undirected gra...
We consider a generalized Path Traveling Salesman Problem where the distances are defined by a 2-edg...
In this thesis we focus on two NP-hard and intensively studied problems: The travelling salesman pro...
We consider the problem of finding the minimum 2-vertex connected spanning subgraph in a given graph...
The T-tour problem is a natural generalization of TSP and Path TSP. Given a graph G=(V,E), edge cost...
Given an undirected graph, finding either a minimum 2-edge-connected spanning subgraph or a minimum ...
A 5/4-approximation algorithm is presented for the minimum cardinality 2-edge-connected spanning sub...
We present a framework for approximating the metric TSP based on a novel use of matchings. Tradition...
n this extended abstract, we survey some of the recent results on approximating the traveling salesm...
The traveling salesman problem (TSP) is the problem of finding a shortest Hamiltonian circuit or pat...
The approximability of the maximum edge disjoint paths problem (EDP) in directed graphs was seemingl...
We present an O(log n·log k)-approximation algorithm for the prob-lem of finding k-vertex connected ...