Abstract:
We consider a non-self-adjoint Schrödinger operator describing the motion
of a particle in a one-dimensional space with an analytic potential $iV(x)$
that is periodic with a real period $T$ and is purely imaginary on the real
axis. We study the spectrum of this operator in the semiclassical limit and
show that the points of its spectrum asymptotically belong to the so-called
spectral graph. We construct the spectral graph and evaluate the asymptotic
form of the spectrum. A Riemann surface of the particle energy-conservation
equation can be constructed in the phase space. We show that both the spectral
graph and the asymptotic form of the spectrum can be evaluated in
terms of integrals of the $p\,dx$ form (where $x\in\mathbb C/T\mathbb Z$ and
$p\in\mathbb C$ are the particle coordinate and momentum) taken along basis cycles on
this Riemann surface. We use the technique of Stokes lines to construct the asymptotic
form of the spectrum.
Fulltext:
PDF file (700 kB)