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Computer assisted proofs of two-dimensional attracting invariant tori for ODEs

Maciej J. Capiński, Emmanuel Fleurantin, J. D. Mireles James

2020Discrete and Continuous Dynamical Systems13 citationsDOIOpen Access PDF

Abstract

This work studies existence and regularity questions for attracting invariant tori in three dimensional dissipative systems of ordinary differential equations. Our main result is a constructive method of computer assisted proof which applies to explicit problems in non-perturbative regimes. We obtain verifiable lower bounds on the regularity of the attractor in terms of the ratio of the expansion rate on the torus with the contraction rate near the torus. We consider separately two important cases of rotational and resonant tori. In the rotational case we obtain $ C^k $ lower bounds on the regularity of the embedding. In the resonant case we verify the existence of tori which are only $ C^0 $ and neither star-shaped nor Lipschitz.

Topics & Concepts

TorusOrdinary differential equationInvariant (physics)EmbeddingOdeMathematical proofConstructiveDissipative systemMathematicsAttractorPure mathematicsLipschitz continuityErgodic theoryDiscrete mathematicsMathematical analysisDifferential equationPhysicsComputer scienceMathematical physicsGeometryQuantum mechanicsOperating systemArtificial intelligenceProcess (computing)Quantum chaos and dynamical systemsNumerical methods for differential equationsCellular Automata and Applications
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