Characterization of potential smoothness and Riesz basis property of Hill-Scr\"odinger operators with singular periodic potentials in terms of periodic, antiperiodic and Neumann spectra

Abstract

The Hill operators Ly=-y''+v(x)y, considered with singular complex valued π-periodic potentials v of the form v=Q' with Q in L2([0,π]), and subject to periodic, antiperiodic or Neumann boundary conditions have discrete spectra. For sufficiently large n, the disc z: |z-n2|<n contains two periodic (if n is even) or antiperiodic (if n is odd) eigenvalues λn-, λn+ and one Neumann eigenvalue n. We show that rate of decay of the sequence |λn+-λn-|+|λn+ - n| determines the potential smoothness, and there is a basis consisting of periodic (or antiperiodic) root functions if and only if for even (respectively, odd) n, λn+≠ λn-|λn+-n|/|λn+-λn-| < ∞.