A PDE approach to small stochastic perturbations of Hamiltonian flows. (English) Zbl 1287.37036
Summary: We present a unified approach, based on pde methods, for the study of averaging principles for (small) stochastic perturbations of Hamiltonian flows in two space dimensions. Such problems were introduced by Freidlin and Wentzell and have been the subject of extensive study in the last few years using probabilistic arguments. When the Hamiltonian flow has critical points, it exhibits complicated behavior near the critical points under a small stochastic perturbation. Asymptotically the slow (averaged) motion takes place on a graph. The issues are to identify both the equations on the sides and the boundary conditions at the vertices of the graph. Our approach is very general and applies also to degenerate anisotropic elliptic operators which could not be considered using the previous methodology.
MSC:
| 37J25 | Stability problems for finite-dimensional Hamiltonian and Lagrangian systems |
| 35B40 | Asymptotic behavior of solutions to PDEs |
| 35J25 | Boundary value problems for second-order elliptic equations |
| 37J99 | Dynamical aspects of finite-dimensional Hamiltonian and Lagrangian systems |
| 37H99 | Random dynamical systems |
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