ABSOLUTE VALUE EQUATIONS WITH DATA UNCERTAINTY IN THE l1 AND l∞ NORM BALLS

Yue Lu; Hong Min Ma; Dong Yang Xue; Jein Shan Chen

doi:10.23952/jnva.7.2023.4.06

ABSOLUTE VALUE EQUATIONS WITH DATA UNCERTAINTY IN THE l₁ AND l_∞ NORM BALLS

Yue Lu^*, Hong Min Ma, Dong Yang Xue, Jein Shan Chen

^*Corresponding author for this work

Department of Mathematics

Research output: Contribution to journal › Article › peer-review

Abstract

Absolute value equations (AVEs) have attracted much attention in recent studies. However, the problem data may be contaminated by noises that yield a meaningless solution, even if these coefficients are uncertain within a certain range. To address this issue, we import the idea of robust optimization and present their robust counterpart models with data uncertainty in the l₁ and l_∞ norm balls. In particular, we prove that these models are equivalent to the linear programming problems. Numerical experiments demonstrate that the true solution of these AVEs can be recovered by solving the equivalent linear programming models with open-resource packages JuMP and HiGHS in Julia language.

Original language	English
Pages (from-to)	549-561
Number of pages	13
Journal	Journal of Nonlinear and Variational Analysis
Volume	7
Issue number	4
DOIs	https://doi.org/10.23952/jnva.7.2023.4.06
Publication status	Published - 2023 Aug 1

Keywords

Absolute value equations
Data uncertainty
Robust counterpart model
Robust optimization

ASJC Scopus subject areas

Analysis
Applied Mathematics

Access to Document

10.23952/jnva.7.2023.4.06

Cite this

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title = "ABSOLUTE VALUE EQUATIONS WITH DATA UNCERTAINTY IN THE l1 AND l∞ NORM BALLS",

abstract = "Absolute value equations (AVEs) have attracted much attention in recent studies. However, the problem data may be contaminated by noises that yield a meaningless solution, even if these coefficients are uncertain within a certain range. To address this issue, we import the idea of robust optimization and present their robust counterpart models with data uncertainty in the l1 and l∞ norm balls. In particular, we prove that these models are equivalent to the linear programming problems. Numerical experiments demonstrate that the true solution of these AVEs can be recovered by solving the equivalent linear programming models with open-resource packages JuMP and HiGHS in Julia language.",

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