Litcius/Paper detail

Learning strange attractors with reservoir systems

Lyudmila Grigoryeva, Allen Hart, Juan‐Pablo Ortega

2023Nonlinearity28 citationsDOIOpen Access PDF

Abstract

Abstract This paper shows that the celebrated embedding theorem of Takens is a particular case of a much more general statement according to which, randomly generated linear state-space representations of generic observations of an invertible dynamical system carry in their wake an embedding of the phase space dynamics into the chosen Euclidean state space. This embedding coincides with a natural generalized synchronization that arises in this setup and that yields a topological conjugacy between the state-space dynamics driven by the generic observations of the dynamical system and the dynamical system itself. This result provides additional tools for the representation, learning, and analysis of chaotic attractors and sheds additional light on the reservoir computing phenomenon that appears in the context of recurrent neural networks.

Topics & Concepts

AttractorMathematicsEmbeddingDynamical systems theoryPhase spaceDynamical system (definition)Context (archaeology)State spaceEuclidean spaceLorenz systemState (computer science)Representation (politics)ChaoticPure mathematicsTopology (electrical circuits)Mathematical analysisComputer scienceArtificial intelligenceAlgorithmPhysicsPoliticsThermodynamicsBiologyLawPolitical scienceCombinatoricsQuantum mechanicsStatisticsPaleontologyNeural Networks and Reservoir ComputingNeural dynamics and brain functionNonlinear Dynamics and Pattern Formation