This work considers a small random perturbation of alpha-stable jump type nonlinear reaction-diffusion equations with Dirichlet boundary conditions over an interval. It has two stable points whose domains of attraction meet in a separating manifold with several saddle points. Extending a method developed by Imkeller and Pavlyukevich it proves that in contrast to a Gaussian perturbation, the expected exit and transition times between the domains of attraction depend polynomially on the noise intensity in the small intensity limit. Moreover the solution exhibits metastable behavior: there is a polynomial time scale along which the solution dynamics correspond asymptotically to the dynamic behavior of a finite-state Markov chain switching between the stable states.
| ISBN-13: | 9783319008271 |
| ISBN-10: | 3319008277 |
| Publisher: | Springer International Publishing |
| Publication date: | 2013-10-14 |
| Edition description: | 2013 |
| Pages: | 165 |
| Product dimensions: | Height: 9.25 Inches, Length: 6.1 Inches, Weight: 6.21262654316 Pounds, Width: 0.43 Inches |
| Author: | Arnaud Debussche, Michael Högele, Peter Imkeller |
| Language: | en |
| Binding: | Paperback |
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