Characterization of potential smoothness and Riesz basis property of the Hill-Scr\"odinger operator in terms of periodic, antiperiodic and Neumann spectra

Abstract

The Hill operators Ly=-y"+v(x)y, considered with complex valued π-periodic potentials v and subject to periodic, antiperiodic or Neumann boundary conditions have discrete spectra. For sufficiently large n, close to n2 there are two periodic (if n is even) or antiperiodic (if n is odd) eigenvalues λn-, λn+ and one Neumann eigenvalue n. We study the geometry of "the spectral triangle" with vertices (λn+,λn-,n), and show that the rate of decay of triangle size characterizes the potential smoothness. Moreover, it is proved, for v∈ Lp ([0,π]), \; p>1, that the set of periodic (antiperiodic) root functions contains a Riesz basis if and only if for even n (respectively, odd n) \; λn+≠ λn-\|λn+-n|/|λn+-λn-| \ < ∞.