AbstractIn this paper an inverse problem of the weighted shortest arborescence problem is discussed. That is, given a directed graph G and a set of nonnegative costs on its arcs, we need to modify those costs as little as possible to ensure that T, a given v1 -arborescence of G, is the shortest one. It is found that only the cost of T needs modifying. An O(n3) combinatorial algorithm is then proposed. This algorithm also gives an optimal solution to the inverse weighted shortest path problem
Given an undirected graph G =(V; E) with positive edge weights (lengths) w: E !! + , a set of term...
In a partial inverse optimization problem there is an underlying optimization problem with a partial...
The inverse shortest path problem (ISPP) is a problem based on graph theory, that is to design link ...
AbstractIn this paper an inverse problem of the weighted shortest arborescence problem is discussed....
In 1998, Hu and Liu developed a strongly polynomial algorithm for solving the inverse arborescence p...
AbstractWe consider a general class of optimization problems regarding spanning trees in directed gr...
. The inverse shortest paths problem in a graph is considered, that is, the problem of recovering th...
. We examine the computational complexity of the inverse shortest paths problem with upper bounds on...
In this paper we study the complexity of an Inverse Shortest Paths Problem (ISPP). We show that the ...
Given a feasible solution to a particular combinatorial optimization problem defined on a graph and ...
The input to an Inverse Shortest Path Lengths Problem (ISPL) consists of a graph G with arc weights,...
The shortest path tree problem is one of the most studied problems in network optimization. Given a ...
Part 2: Algorithms and ComplexityInternational audienceGiven a network $G(N,\!A,\!C)$ and a directed...
International audienceWe revisit fundamental problems in undirected and directed graphs, such as the...
In this paper, we consider the bipartite node weighted matching problem on a special class of graphs...
Given an undirected graph G =(V; E) with positive edge weights (lengths) w: E !! + , a set of term...
In a partial inverse optimization problem there is an underlying optimization problem with a partial...
The inverse shortest path problem (ISPP) is a problem based on graph theory, that is to design link ...
AbstractIn this paper an inverse problem of the weighted shortest arborescence problem is discussed....
In 1998, Hu and Liu developed a strongly polynomial algorithm for solving the inverse arborescence p...
AbstractWe consider a general class of optimization problems regarding spanning trees in directed gr...
. The inverse shortest paths problem in a graph is considered, that is, the problem of recovering th...
. We examine the computational complexity of the inverse shortest paths problem with upper bounds on...
In this paper we study the complexity of an Inverse Shortest Paths Problem (ISPP). We show that the ...
Given a feasible solution to a particular combinatorial optimization problem defined on a graph and ...
The input to an Inverse Shortest Path Lengths Problem (ISPL) consists of a graph G with arc weights,...
The shortest path tree problem is one of the most studied problems in network optimization. Given a ...
Part 2: Algorithms and ComplexityInternational audienceGiven a network $G(N,\!A,\!C)$ and a directed...
International audienceWe revisit fundamental problems in undirected and directed graphs, such as the...
In this paper, we consider the bipartite node weighted matching problem on a special class of graphs...
Given an undirected graph G =(V; E) with positive edge weights (lengths) w: E !! + , a set of term...
In a partial inverse optimization problem there is an underlying optimization problem with a partial...
The inverse shortest path problem (ISPP) is a problem based on graph theory, that is to design link ...