Аннотация:
To prove the ergodicity for Hamiltonian systems of big or
infinite dimension is a notoriously complicated problem of
high importance. But what we often have in physics are not
Hamiltonian systems, but systems of the form <Hamiltonian
system> + <small dissipation> + <small random forcing>,
where the random forcing may be very degenerate (i.e. it
affects only a few modes). For such systems an analogy of
the ergodicity is called the mixing. In my talk I will remind
the definition of the mixing and explain how the KAM-theory
provides a powerful tool to prove the mixing for the systems
above. The talk is based on a joint work with Armen Shirikyan
and Vahagn Nersesyan [1]
Язык доклада: английский
Список литературы
Nersesyan, V.; Shirikyan, A.R.; Kuksin, S.B., Exponential mixing for a class of dissipative PDEs with bounded degenerate noise, arXiv: 1802.03250