An extension of Chubanov’s algorithm to symmetric cones

“…If result (3) is returned, the problem is scaled appropriately and the basic procedure is called again. It should be noted that the purpose of rescaling differs between [2] and [11].…”

Section: A Recommendation Of Scaling Problem P(a)mentioning

confidence: 99%

“…In [2], the authors assumed that the symmetric cone K is given by the Cartesian product of ps simple symmetric cones K 1 , K 2 , . .…”

Section: A Recommendation Of Scaling Problem P(a)mentioning

confidence: 99%

“…Chubanov's method has also been extended to the feasibility problem over the second-order cone [8] and the symmetric cone [11,2]. The feasibility problem over the symmetric cone is of the form,…”

Section: Introductionmentioning

confidence: 99%

“…As proposed in [11,2], for problem P(A), the structure of Chubanov's method remains the same; i.e., the main algorithm calls the basic procedure, and the basic procedure returns one of the following in a finite number of iterations:…”

Section: Introductionmentioning

confidence: 99%

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A New Extension of Chubanov's Method to Symmetric Cones

Kanoh¹,

Yoshise²

2021

Preprint

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We propose a new variant of Chubanov's method for solving the feasibility problem over the symmetric cone by extending Roos's method (2018) for the feasibility problem over the nonnegative orthant. The proposed method considers a feasibility problem associated with a norm induced by the maximum eigenvalue of an element and uses a rescaling focusing on the upper bound of the sum of eigenvalues of any feasible solution to the problem. Its computational bound is (i) equivalent to Roos's original method (2018) and superior to Lourenço et al.'s method (2019) when the symmetric cone is the nonnegative orthant, (ii) superior to Lourenço et al.'s method (2019) when the symmetric cone is a Cartesian product of second-order cones, and (iii) equivalent to Lourenço et al.'s method (2019) when the symmetric cone is the simple positive semidefinite cone, under the assumption that the costs of computing the spectral decomposition and the minimum eigenvalue are of the same order for any given symmetric matrix.We also conduct numerical experiments that compare the performance of our method with existing methods by generating instance in three types: (i) strongly (but ill-conditioned) feasible instances, (ii) weakly feasible instances, and (iii) infeasible instances. For any of these instances, the proposed method is rather more efficient than the existing methods in terms of accuracy and execution time.

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A new extension of Chubanov’s method to symmetric cones

Kanoh

Yoshise

2023

Math. Program.

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We propose a new variant of Chubanov’s method for solving the feasibility problem over the symmetric cone by extending Roos’s method (Optim Methods Softw 33(1):26–44, 2018) of solving the feasibility problem over the nonnegative orthant. The proposed method considers a feasibility problem associated with a norm induced by the maximum eigenvalue of an element and uses a rescaling focusing on the upper bound for the sum of eigenvalues of any feasible solution to the problem. Its computational bound is (1) equivalent to that of Roos’s original method (2018) and superior to that of Lourenço et al.’s method (Math Program 173(1–2):117–149, 2019) when the symmetric cone is the nonnegative orthant, (2) superior to that of Lourenço et al.’s method (2019) when the symmetric cone is a Cartesian product of second-order cones, (3) equivalent to that of Lourenço et al.’s method (2019) when the symmetric cone is the simple positive semidefinite cone, and (4) superior to that of Pena and Soheili’s method (Math Program 166(1–2):87–111, 2017) for any simple symmetric cones under the feasibility assumption of the problem imposed in Pena and Soheili’s method (2017). We also conduct numerical experiments that compare the performance of our method with existing methods by generating strongly (but ill-conditioned) feasible instances. For any of these instances, the proposed method is rather more efficient than the existing methods in terms of accuracy and execution time.

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An extension of Chubanov’s algorithm to symmetric cones

Cited by 11 publications

References 28 publications

An improved version of Chubanov's method for solving a homogeneous feasibility problem

An improved version of Chubanov's method for solving a homogeneous feasibility problem

A New Extension of Chubanov's Method to Symmetric Cones

A new extension of Chubanov’s method to symmetric cones

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