A local quantum version of the Kolmogorov theorem
arXiv:math-ph/0406026 · doi:10.1007/s00220-005-1299-4
Abstract
Consider in $L^2 (\R^l)$ the operator family $H(ε):=P_0(\hbar,Ï)+εQ_0$. $P_0$ is the quantum harmonic oscillator with diophantine frequency vector $\om$, $Q_0$ a bounded pseudodifferential operator with symbol holomorphic and decreasing to zero at infinity, and $\ep\in\R$. Then there exists $\ep^\ast >0$ with the property that if $|\ep|<\ep^\ast$ there is a diophantine frequency $\om(\ep)$ such that all eigenvalues $E_n(\hbar,\ep)$ of $H(\ep)$ near 0 are given by the quantization formula $E_α(\hbar,\ep)= {\cal E}(\hbar,\ep)+\la\om(\ep),α\ra\hbar +|\om(\ep)|\hbar/2 + \ep O(α\hbar)^2$, where $α$ is an $l$-multi-index.
18 pages