An accelerated interior point method whose running time depends only on A (extended abstract)
STOC '94 Proceedings of the twenty-sixth annual ACM symposium on Theory of computing
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We propose a "layered-step" interior point (LIP) algorithm for linear programming. This algorithm follows the central path, either with short steps or with a new type of step called a "layered least squares" (LLS) step. The algorithm returns the exact global minimum after a finite number of steps in particular, after O (mathematical symbol omitted) iterations, where c(A) is a function of the coefficient matrix. The LLS steps can be thought of as accelerating a path-following interior point method whenever near-degeneracies occur. One consequence of the new method is a new characterization of the central path: we show that it composed of at most n-squared alternating straight and curved segments. If the LIP algorithm is applied to integer data, we get as another corollary a new proof of a well-known theorom by Tardos that linear programming can be solved in strongly polynomial time provided that A contains small-integer entries.