Please use this identifier to cite or link to this item: http://cmuir.cmu.ac.th/jspui/handle/6653943832/68339
Title: A Symmetry-Based Explanation of the Main Idea Behind Chubanov’s Linear Programming Algorithm
Authors: Olga Kosheleva
Vladik Kreinovich
Thongchai Dumrongpokaphan
Authors: Olga Kosheleva
Vladik Kreinovich
Thongchai Dumrongpokaphan
Keywords: Computer Science
Issue Date: 1-Jan-2020
Abstract: © Springer Nature Switzerland AG 2020. Many important real-life optimization problems can be described as optimizing a linear objective function under linear constraints—i.e., as a linear programming problem. This problem is known to be not easy to solve. Reasonably natural algorithms—such as iterative constraint satisfaction or simplex method—often require exponential time. There exist efficient polynomial-time algorithms, but these algorithms are complicated and not very intuitive. Also, in contrast to many practical problems which can be computed faster by using parallel computers, linear programming has been proven to be the most difficult to parallelize. Recently, Sergei Chubanov proposed a modification of the iterative constraint satisfaction algorithm: namely, instead of using the original constraints, he proposed to come up with appropriate derivative constraints. Interestingly, this idea leads to a new polynomial-time algorithm for linear programming—and to efficient algorithms for many other constraint satisfaction problems. In this paper, we show that an algebraic approach—namely, the analysis of the corresponding symmetries—can (at least partially) explain the empirical success of Chubanov’s idea.
URI: https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=85079586510&origin=inward
http://cmuir.cmu.ac.th/jspui/handle/6653943832/68339
ISSN: 18609503
1860949X
Appears in Collections:CMUL: Journal Articles

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