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SODA
2000
ACM

Minimum ratio canceling is oracle polynomial for linear programming, but not strongly polynomial, even for networks

14 years 1 months ago
Minimum ratio canceling is oracle polynomial for linear programming, but not strongly polynomial, even for networks
This paper shows that the minimum ratio canceling algorithm of Wallacher (1989) (and a faster relaxed version) can be generalized to an algorithm for general linear programs with geometric convergence. This implies that when we have a negative cycle oracle, this algorithm will compute an optimal solution in (weakly) polynomial time. We then specialize the algorithm to linear programming on unimodular linear spaces, and to the minimum cost flow and (dual) tension problems. We construct instances proving that even in the network special cases the algorithm is not strongly polynomial.
S. Thomas McCormick, Akiyoshi Shioura
Added 01 Nov 2010
Updated 01 Nov 2010
Type Conference
Year 2000
Where SODA
Authors S. Thomas McCormick, Akiyoshi Shioura
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