Bifurcations of random differential equations with bounded noise on surfaces
| Authors |
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|---|---|
| Publication date | 2010 |
| Journal | Topological Methods in Nonlinear Analysis |
| Volume | Issue number | 35 | 1 |
| Pages (from-to) | 77-97 |
| Organisations |
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| Abstract | In random differential equations with bounded noise minimal forward invariant (MFI) sets play a central role since they support stationary measures. We study the stability and possible bifurcations of MFI sets. In dimensions 1 and 2 we classify all minimal forward invariant sets and their codimension one bifurcations in bounded noise random differential equations. |
| Document type | Article |
| Language | English |
| Published at | https://projecteuclid.org/journals/topological-methods-in-nonlinear-analysis/volume-35/issue-1/Bifurcations-of-random-differential-equations-with-bounded-noise-on-surfaces/tmna/1461249003.full |
| Other links | https://projecteuclid.org/journals/topological-methods-in-nonlinear-analysis/volume-35/issue-1 |
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Bifurcations of random differential equations with bounded noise on surfaces
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