an:01407587
Zbl 0952.37013
Boutet de Monvel, A.; Dobrokhotov, S. Yu.
Random perturbations of invariant Lagrangian tori of Hamiltonian vector fields
EN
Math. Notes 64, No. 5, 674-679 (1998); translation from Mat. Zametki 64, No. 5, 783-787 (1998).
00056787
1998
j
37J25 60H10 58J37
random perturbations; Hamiltonian systems; Lagrangian tori
The authors consider diffusion type random perturbations of Hamiltonian systems (possibly nonintegrable) having invariant Lagrangian tori (i.e. the form \(dp\wedge dq\) vanishes there) with quasiperiodic motion on them. They consider the corresponding small parameter parabolic problem for distributions with the initial condition \(\delta_{\Lambda,d\mu}\) where \((\delta_{\Lambda,d\mu}\psi(x))=\int_\Lambda\psi d\mu\) and \(\Lambda\) is the corresponding torus. Applying Maslov's theory of complex germs the authors obtain the leading term of the asymptotics of the solution of the above problem which is completely determined by the torus \(\Lambda.\)
Yu.Kifer (Jerusalem)