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Connecting orbits in one-parameter families of flows - MaRDI portal

Connecting orbits in one-parameter families of flows

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Publication:3830272

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DOI10.1017/S0143385700009482zbMath0675.58034OpenAlexW2140530791MaRDI QIDQ3830272

James F. Reineck

Publication date: 1988

Published in: Ergodic Theory and Dynamical Systems (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1017/s0143385700009482

zbMATH Keywords

invariant set flows reaction-diffusion equations Morse decomposition connecting orbits Morse sets attracting repelling

Mathematics Subject Classification ID

Attractors and repellers of smooth dynamical systems and their topological structure (37C70) Dynamics induced by flows and semiflows (37C10)

Related Items (20)

A connection matrix analysis of ecological models ⋮ The Connection Matrix Theory for Morse Decompositions ⋮ A heteroclinic bifurcation in a motion of pendulum: numerical-topological approach ⋮ Continuation and bifurcation associated to the dynamical spectral sequence ⋮ A product theorem for connection matrices and the structure of connecting orbits ⋮ On the existence of intermediate magnetohydrodynamic shock waves ⋮ Transition matrix theory ⋮ A dynamical system approach to a phase transition problem ⋮ A computational framework for connection matrix theory ⋮ Algebraic transition matrices in the Conley index theory ⋮ Transition systems ⋮ Decompositions and Liapounov functions ⋮ A predator-prey system involving group defense: a connection matrix approach ⋮ Homoclinic orbits in Hamiltonian systems and heteroclinic orbits in gradient and gradient-like systems ⋮ Travelling Wave Solutions to a Gradient System ⋮ The Continuation Theory for Morse Decompositions and Connection Matrices ⋮ The Connection Map for Attractor-Repeller Pairs ⋮ Existence of Generalized Homoclinic Orbits for one Parameter Families of Flows ⋮ The viscous Cahn-Hilliard equation: Morse decomposition and structure of the global attractor ⋮ Traveling Wave Solutions of a Gradient System: Solutions with a Prescribed Winding Number. I

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