Аннотация:
We consider Schrödinger equation for a particle on a flat $n$-torus in a bounded potential, depending on time. Mass of
the particle equals $1/\mu^2$, where $\mu$ is a small parameter. We show that the Sobolev $H^{\nu}$-norms of the wave function grow approximately as $t^{\nu}$ on the time interval $t \in [-t_*,t_*]$, where $t_*$ is slightly less than $O(1/\mu)$.
Обратная связь: