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Lipschitz Certificates for Layered Network Structures Driven by Averaged Activation Operators

Patrick L. Combettes, Jean‐Christophe Pesquet

2020SIAM Journal on Mathematics of Data Science76 citationsDOIOpen Access PDF

Abstract

Obtaining sharp Lipschitz constants for feed-forward neural networks is essential to assess their robustness in the face of perturbations of their inputs. We derive such constants in the context of a general layered network model involving compositions of nonexpansive averaged operators and affine operators. By exploiting this architecture, our analysis finely captures the interactions between the layers, yielding tighter Lipschitz constants than those resulting from the product of individual bounds for groups of layers. The proposed framework is shown to cover in particular many practical instances encountered in feed-forward neural networks. Our Lipschitz constant estimates are further improved in the case of structures employing scalar nonlinear functions, which include standard convolutional networks as special cases.

Topics & Concepts

Lipschitz continuityAffine transformationRobustness (evolution)Nonlinear systemComputer scienceScalar (mathematics)Constant (computer programming)Context (archaeology)Applied mathematicsArtificial neural networkMathematicsTopology (electrical circuits)Pure mathematicsArtificial intelligencePhysicsGeometryCombinatoricsBiologyChemistryProgramming languageBiochemistryGenePaleontologyQuantum mechanicsAdversarial Robustness in Machine LearningMachine Learning and ELMAdvanced Memory and Neural Computing
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