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Deep Network With Approximation Error Being Reciprocal of Width to Power of Square Root of Depth

Zuowei Shen, Haizhao Yang, Shijun Zhang

2021Neural Computation55 citationsDOIOpen Access PDF

Abstract

A new network with super-approximation power is introduced. This network is built with Floor (⌊x⌋) or ReLU (max{0,x}) activation function in each neuron; hence, we call such networks Floor-ReLU networks. For any hyperparameters N∈N+ and L∈N+, we show that Floor-ReLU networks with width max{d,5N+13} and depth 64dL+3 can uniformly approximate a Hölder function f on [0,1]d with an approximation error 3λdα/2N-αL, where α∈(0,1] and λ are the Hölder order and constant, respectively. More generally for an arbitrary continuous function f on [0,1]d with a modulus of continuity ωf(·), the constructive approximation rate is ωf(dN-L)+2ωf(d)N-L. As a consequence, this new class of networks overcomes the curse of dimensionality in approximation power when the variation of ωf(r) as r→0 is moderate (e.g., ωf(r)≲rα for Hölder continuous functions), since the major term to be considered in our approximation rate is essentially d times a function of N and L independent of d within the modulus of continuity.

Topics & Concepts

Modulus of continuityMathematicsReciprocalFunction (biology)CombinatoricsSquare rootApproximation errorCurse of dimensionalityConstant (computer programming)Square (algebra)Continuous function (set theory)Mathematical analysisType (biology)GeometryComputer scienceStatisticsPhilosophyBiologyProgramming languageEvolutionary biologyLinguisticsEcologyNeural Networks and ApplicationsMachine Learning and ELMFace and Expression Recognition