Spectral asymptotics for large skew-symmetric perturbations of the harmonic oscillator

Abstract

Originally motivated by a stability problem in Fluid Mechanics, we study the spectral and pseudospectral properties of the differential operator Hε = -∂x2 + x2 + iε-1f(x) on L2(R), where f is a real-valued function and ε > 0 a small parameter. We define (ε) as the infimum of the real part of the spectrum of Hε, and (ε)-1 as the supremum of the norm of the resolvent of Hε along the imaginary axis. Under appropriate conditions on f, we show that both quantities (ε), (ε) go to infinity as ε 0, and we give precise estimates of the growth rate of (ε). We also provide an example where (ε) is much larger than (ε) if ε is small. Our main results are established using variational "hypocoercive" methods, localization techniques and semiclassical subelliptic estimates.