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Spectral deconfounding via perturbed sparse linear models

Domagoj Ćevid, Peter Bühlmann, Nicolai Meinshausen

2020Repository for Publications and Research Data (ETH Zurich)16 citationsDOIOpen Access PDF

Abstract

Standard high-dimensional regression methods assume that the underlying coefficient vector is sparse. This might not be true in some cases, in particular in presence of hidden, confounding variables. Such hidden confounding can be represented as a high-dimensional linear model where the sparse coefficient vector is perturbed. For this model, we develop and investigate a class of methods that are based on running the Lasso on preprocessed data. The preprocessing step consists of applying certain spectral transformations that change the singular values of the design matrix. We show that, under some assumptions, one can achieve the usual Lasso ℓ1-error rate for estimating the underlying sparse coefficient vector, despite the presence of confounding. Our theory also covers the Lava estimator (Chernozhukov et al., 2017) for a special model class. The performance of the methodology is illustrated on simulated data and a genomic dataset.

Topics & Concepts

Lasso (programming language)EstimatorMathematicsDesign matrixApplied mathematicsPreprocessorCoefficient matrixComputer scienceLinear modelAlgorithmSparse approximationLinear regressionMatrix (chemical analysis)Pattern recognition (psychology)Artificial intelligenceStatisticsEigenvalues and eigenvectorsWorld Wide WebPhysicsComposite materialQuantum mechanicsMaterials scienceStatistical Methods and Inference
Spectral deconfounding via perturbed sparse linear models | Litcius