Uniform stability and chaotic dynamics in nonhomogeneous linear dissipative scalar ordinary differential equations
Juan Campos, Carmen Núñez, Rafael Obaya
Abstract
The paper analyzes the structure and the inner long-term dynamics of the invariant compact sets for the skewproduct flow induced by a family of time-dependent ordinary differential equations of nonhomogeneous linear dissipative type. The main assumptions are made on the dissipative term and on the homogeneous linear term of the equations. The rich casuistic includes the uniform stability of the invariant compact sets, as well as the presence of Li-Yorke chaos and Auslander-Yorke chaos inside the attractor.
Topics & Concepts
MathematicsDissipative systemAttractorOrdinary differential equationMathematical analysisInvariant (physics)ChaoticScalar (mathematics)Linear stabilityHomogeneousDifferential equationApplied mathematicsNonlinear systemMathematical physicsPhysicsGeometryCombinatoricsArtificial intelligenceComputer scienceQuantum mechanicsQuantum chaos and dynamical systemsMathematical Dynamics and FractalsStability and Controllability of Differential Equations