A directed acyclic network with nonnegative integer arc lengths is called balanced if any two paths with common endpoints have equal lengths. In the buffer assignment problem such a network is given, and the goal is to balance it by increasing arc lengths by integer amounts (called buffers), so that the sum of the amounts added is minimal. This problem arises in VLSI design, and was recently shown to be polynomial for rooted networks. Here we give simple procedures which solve several generalizations of this problem in strongly polynomial time, using ideas from network flow theory. In particular, we solve a weighted version of the problem, extend the results to nonrooted networks, and allow upper bounds on buffers. We also give a strongly p...
We present two new strongly polynomial algorithms for the Minimum Cost Network Flow Problem (MCNF). ...
National audienceWe consider a routing problem where we want to minimize the maximal relative conges...
AbstractWe present two new strongly polynomial algorithms for the minimum cost network flow problem ...
A directed acyclic network with nonnegative integer arc lengths is called balanced if any two paths ...
AbstractA directed acyclic network with nonnegative integer arc lengths is called balanced if any tw...
AbstractWe pose a new network flow problem and solve it by reducing to the b-matching problem. The r...
In designing VLSI architectures for a complex computational task, the functional decomposition of th...
We show that the Balanced Network Flow Problem in the case of general weights, i.e., the problem of...
We present approximation algorithms for balanced partitioning problems. These problems are notorious...
In this paper, we study a variant of the minimum cost flow problem where each arc in the specified s...
Given a weighted directed network G, we consider the problem of computing k balanced paths from giv...
In this paper, a new problem on a directed network is presented. Let D be a feasible network such...
The original motivation for investigating the Linear Balancing Flow Problem (LBFP) came from the opt...
We present an O(nm) algorithm for all-pairs shortest paths computations in a directed graph with n n...
We present an $O(nm)$ algorithm for all-pairs shortest paths computations in a directed graph with $...
We present two new strongly polynomial algorithms for the Minimum Cost Network Flow Problem (MCNF). ...
National audienceWe consider a routing problem where we want to minimize the maximal relative conges...
AbstractWe present two new strongly polynomial algorithms for the minimum cost network flow problem ...
A directed acyclic network with nonnegative integer arc lengths is called balanced if any two paths ...
AbstractA directed acyclic network with nonnegative integer arc lengths is called balanced if any tw...
AbstractWe pose a new network flow problem and solve it by reducing to the b-matching problem. The r...
In designing VLSI architectures for a complex computational task, the functional decomposition of th...
We show that the Balanced Network Flow Problem in the case of general weights, i.e., the problem of...
We present approximation algorithms for balanced partitioning problems. These problems are notorious...
In this paper, we study a variant of the minimum cost flow problem where each arc in the specified s...
Given a weighted directed network G, we consider the problem of computing k balanced paths from giv...
In this paper, a new problem on a directed network is presented. Let D be a feasible network such...
The original motivation for investigating the Linear Balancing Flow Problem (LBFP) came from the opt...
We present an O(nm) algorithm for all-pairs shortest paths computations in a directed graph with n n...
We present an $O(nm)$ algorithm for all-pairs shortest paths computations in a directed graph with $...
We present two new strongly polynomial algorithms for the Minimum Cost Network Flow Problem (MCNF). ...
National audienceWe consider a routing problem where we want to minimize the maximal relative conges...
AbstractWe present two new strongly polynomial algorithms for the minimum cost network flow problem ...