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ReLU Networks Are Universal Approximators via Piecewise Linear or Constant Functions

Changcun Huang

2020Neural Computation25 citationsDOI

Abstract

This letter proves that a ReLU network can approximate any continuous function with arbitrary precision by means of piecewise linear or constant approximations. For univariate function [Formula: see text], we use the composite of ReLUs to produce a line segment; all of the subnetworks of line segments comprise a ReLU network, which is a piecewise linear approximation to [Formula: see text]. For multivariate function [Formula: see text], ReLU networks are constructed to approximate a piecewise linear function derived from triangulation methods approximating [Formula: see text]. A neural unit called TRLU is designed by a ReLU network; the piecewise constant approximation, such as Haar wavelets, is implemented by rectifying the linear output of a ReLU network via TRLUs. New interpretations of deep layers, as well as some other results, are also presented.

Topics & Concepts

PiecewiseConstant functionPiecewise linear functionConstant (computer programming)MathematicsUnivariateFunction (biology)Line (geometry)Artificial neural networkFunction approximationApplied mathematicsAlgorithmComputer scienceMathematical analysisMultivariate statisticsArtificial intelligenceGeometryStatisticsProgramming languageEvolutionary biologyBiologyNeural Networks and ApplicationsAdvanced Numerical Analysis TechniquesModel Reduction and Neural Networks
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