Litcius/Paper detail

Feature Selection using Stochastic Gates

Yutaro Yamada, Ofir Lindenbaum, Sahand Negahban, Yuval Kluger

202031 citations

Abstract

Feature selection problems have been extensively studied for linear estimation, for instance, Lasso, but less emphasis has been placed on feature selection for non-linear functions. In this study, we propose a method for feature selection in high-dimensional non-linear function estimation problems. The new procedure is based on minimizing the $\ell_0$ norm of the vector of indicator variables that represent if a feature is selected or not. Our approach relies on the continuous relaxation of Bernoulli distributions, which allows our model to learn the parameters of the approximate Bernoulli distributions via gradient descent. This general framework simultaneously minimizes a loss function while selecting relevant features. Furthermore, we provide an information-theoretic justification of incorporating Bernoulli distribution into our approach and demonstrate the potential of the approach on synthetic and real-life applications.

Topics & Concepts

Feature selectionBernoulli's principleFeature (linguistics)Computer scienceFeature vectorLasso (programming language)AlgorithmGradient descentArtificial intelligenceMathematical optimizationFunction (biology)Selection (genetic algorithm)Bernoulli distributionPattern recognition (psychology)MathematicsRandom variableArtificial neural networkEngineeringStatisticsWorld Wide WebEvolutionary biologyBiologyPhilosophyAerospace engineeringLinguisticsStatistical Methods and InferenceMachine Learning and AlgorithmsFault Detection and Control Systems