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Quantile-Based Iterative Methods for Corrupted Systems of Linear Equations

Jamie Haddock, Deanna Needell, Elizaveta Rebrova, William Swartworth

2022SIAM Journal on Matrix Analysis and Applications35 citationsDOI

Abstract

Often in applications ranging from medical imaging and sensor networks to error correction and data science (and beyond), one needs to solve large-scale linear systems in which a fraction of the measurements have been corrupted. We consider solving such large-scale systems of linear equations $Ax = b$ that are inconsistent due to corruptions in the measurement vector $b$. We develop several variants of iterative methods that converge to the solution of the uncorrupted system of equations, even in the presence of large corruptions. These methods make use of a quantile of the absolute values of the residual vector in determining the iterate update. We present both theoretical and empirical results that demonstrate the promise of these iterative approaches.

Topics & Concepts

QuantileMathematicsIterative methodLinear systemResidualApplied mathematicsScale (ratio)System of linear equationsMathematical optimizationLinear equationAlgorithmStatisticsMathematical analysisQuantum mechanicsPhysicsSparse and Compressive Sensing TechniquesNumerical methods in inverse problemsAdvanced Optimization Algorithms Research
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