Non-Self-Adjoint Hill Operators whose Spectrum is a Real Interval

Abstract

Let H = -d2/dx2 + q(x), x ∈ R, where q(x) is a periodic potential, and suppose that the spectrum σ(H) of H is the positive semi-axis [0, ∞). In the case where q(x) is real-valued (and locally square-integrable) a well-known result of G. Borg states that q(x) must vanish almost everywhere. However, as it was first observed by M.G. Gasymov, there is an abundance of complex-valued potentials for which σ(H) = [0, ∞). In this article we conjecture a characterization of all complex-valued entire potentials whose spectrum is [0, ∞). We also present an analog of Borg's result for complex potentials.