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A competitive (dual) simplex method for the assignment problem. (English) Zbl 0596.90064

The worst case complexity of the simplex method is known to be exponential for general liner programming problems. For the linear assignment problem the author presents new pivot choice rules, and shows that the worst case complexity of the dual simplex method reduces to \(\left( \begin{matrix} n-1\\ 2\end{matrix} \right)\) pivots and \(0(n^ 3)\) time, when these rules are applied (n denotes the number of assignments). It is argued that the average number of pivots is at most n log n.
Reviewer: M.Bastian

MSC:

90C08 Special problems of linear programming (transportation, multi-index, data envelopment analysis, etc.)
90C05 Linear programming
68Q25 Analysis of algorithms and problem complexity
65K05 Numerical mathematical programming methods
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References:

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