On the facet pivot simplex method for linear programming II: a linear iteration bound
Abstract
The Hirsch Conjecture stated that any -dimensional polytope with n facets has a diameter at most equal to . This conjecture was disproved by Santos (A counterexample to the Hirsch Conjecture, Annals of Mathematics, 172(1) 383-412, 2012). The implication of Santos' work is that all {\it vertex} pivot algorithms cannot solve the linear programming problem in the worst case in vertex pivot iterations. In the first part of this series of papers, we proposed a {\it facet} pivot method. In this paper, we show that the proposed facet pivot method can solve the canonical linear programming problem in the worst case in at most facet pivot iterations. This work was inspired by Smale's Problem 9 (Mathematical problems for the next century, In Arnold, V. I.; Atiyah, M.; Lax, P.; Mazur, B. Mathematics: frontiers and perspectives, American Mathematical Society, 271-294, 1999).
Keywords
Cite
@article{arxiv.2201.00193,
title = {On the facet pivot simplex method for linear programming II: a linear iteration bound},
author = {Yaguang Yang},
journal= {arXiv preprint arXiv:2201.00193},
year = {2025}
}
Comments
An error in Section 3 is found. I am working on a fix