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Multiple and Complete Stability of Recurrent Neural Networks With Sinusoidal Activation Function

Peng Liu, Jun Wang, Zhenyuan Guo

2020IEEE Transactions on Neural Networks and Learning Systems45 citationsDOI

Abstract

This article presents new theoretical results on multistability and complete stability of recurrent neural networks with a sinusoidal activation function. Sufficient criteria are provided for ascertaining the stability of recurrent neural networks with various numbers of equilibria, such as a unique equilibrium, finite, and countably infinite numbers of equilibria. Multiple exponential stability criteria of equilibria are derived, and the attraction basins of equilibria are estimated. Furthermore, criteria for complete stability and instability of equilibria are derived for recurrent neural networks without time delay. In contrast to the existing stability results with a finite number of equilibria, the new criteria, herein, are applicable for both finite and countably infinite numbers of equilibria. Two illustrative examples with finite and countably infinite numbers of equilibria are elaborated to substantiate the results.

Topics & Concepts

MultistabilityStability (learning theory)Artificial neural networkMathematicsExponential stabilityFunction (biology)Applied mathematicsCountable setFinite setInstabilityEquilibrium pointComputer sciencePure mathematicsMathematical analysisPhysicsDifferential equationArtificial intelligenceBiologyQuantum mechanicsEvolutionary biologyMachine learningNonlinear systemMechanicsNeural Networks Stability and SynchronizationNeural Networks and ApplicationsModel Reduction and Neural Networks