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A simplex algorithm whose average number of steps is bounded between two quadratic functions of the smaller dimension
1985
Journal of the ACM
It has been a challenge for mathematicians to confirm theoretically the extremely good performance of simplex-type algorithms for linear programming. In this paper the average number of steps performed by a simplex algorithm, the so-called self-dual method, is analyzed. The algorithm is not started at the traditional point (1, . . . , but points of the form (1, e, e2, . . .)T, with t sufficiently small, are used. The result is better, in two respects, than those of the previous analyses. First,
doi:10.1145/4221.4222
fatcat:obw5t66izva7nayvdllwjg2wru