Reducibility of 1-d Schrödinger equation with unbounded oscillation perturbations (2003.13022v3)

Abstract: We build a new estimate for the normalized eigenfunctions of the operator $-\partial_{xx}+\mathcal V(x)$ based on the oscillatory integrals and Langer's turning point method, where $\mathcal V(x)\sim |x|^{2\ell}$ at infinity with $\ell>1$. From it and an improved reducibility theorem we show that the equation [\textstyle {\rm i}\partial_t \psi =-\partial_x^2 \psi+\mathcal V(x) \psi+\epsilon \langle x\rangle^{\mu} W(\nu x,\omega t)\psi,\quad \psi=\psi(t,x),~x\in\mathbb R, ~\mu<\min\left{\ell-\frac23,\frac{\sqrt{4\ell^2-2\ell+1}-1}2\right},] can be reduced in $L^2(\mathbb R)$ to an autonomous system for most values of the frequency vector $\omega$ and $\nu$, where $W(\varphi, \phi)$ is a smooth map from $ \mathbb T^d\times \mathbb T^n$ to $\mathbb R$ and odd in $\varphi$.