Geometry of Heteroclinic Cascades in Scalar Parabolic Differential Equations |
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| Authors: | M. Wolfrum |
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| Affiliation: | (1) WIAS-Berlin, Weierstrass Institute for Applied Analysis and Stochastics, Mohrenstr. 39, 10117 Berlin, Germany |
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| Abstract: | We investigate the geometrical properties of the attractor for semilinear scalar parabolic PDEs on a bounded interval with Neumann boundary conditions. Using the nodal properties of the stationary solutions which are determined by an ordinary boundary value problem, we obtain crucial information about the long-time behavior for the full PDE. Especially, we prove an exact criterion for the intersection of strong-stable and strong-unstable manifolds in the finite dimensional Morse-Smale flow on the attractor. |
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| Keywords: | scalar semilinear equations attractors heteroclinic orbits nodal properties meandric permutations Morse-Smale systems |
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