Litcius/Paper detail

Exact and inexact Douglas–Rachford splitting methods for solving large-scale sparse absolute value equations

Cairong Chen, Dongmei Yu, Deren Han

2021IMA Journal of Numerical Analysis30 citationsDOI

Abstract

Abstract Exact and inexact Douglas–Rachford splitting methods are developed to solve the large-scale sparse absolute value equation (AVE) $Ax - |x| =b$, where $A\in \mathbb {R}^{n\times n}$ and $b\in \mathbb {R}^n$. The inexact method adopts a relative error tolerance and, therefore, in the inner iterative processes, the LSQR method is employed to find a qualified approximate solution of each subproblem, resulting in a lower cost for each iteration. When $\|A^{-1}\|\le 1$ and the solution set of the AVE is nonempty, the algorithms are globally and linearly convergent. When $\|A^{-1}\|= 1$ and the solution set of the AVE is empty, the sequence generated by the exact algorithm diverges to infinity on a trivial example. Numerical examples are presented to demonstrate the viability and robustness of the proposed methods.

Topics & Concepts

MathematicsDimension (graph theory)Convergence (economics)Value (mathematics)Rate of convergenceNewton's methodComplementarity (molecular biology)CombinatoricsApplied mathematicsAlgorithmDiscrete mathematicsNonlinear systemComputer scienceStatisticsPhysicsKey (lock)Quantum mechanicsBiologyEconomicsEconomic growthComputer securityGeneticsAdvanced Optimization Algorithms ResearchMatrix Theory and AlgorithmsSparse and Compressive Sensing Techniques
Exact and inexact Douglas–Rachford splitting methods for solving large-scale sparse absolute value equations | Litcius