Riesz basis property of Hill operators with potentials in weighted spaces

Abstract

Consider the Hill operator L(v) = - d2/dx2 + v(x) on [0,π] with Dirichlet, periodic or antiperiodic boundary conditions; then for large enough n close to n2 there are one Dirichlet eigenvalue μn and two periodic (if n is even) or antiperiodic (if n is odd) eigenvalues λn-, \, λn+ (counted with multiplicity). We describe classes of complex potentials v(x)= Σ2Z V(k) eikx in weighted spaces (defined in terms of the Fourier coefficients of v) such that the periodic (or antiperiodic) root function system of L(v) contains a Riesz basis if and only if V(-2n) V(2n) as \;\; n ∈ 2N\;\; (or \; n ∈ 1+ 2N), \;\; n ∞. For such potentials we prove that λn+ - λn- 2V(-2n)V(2n) and μn - 12(λn+ + λn-) -12 (V(-2n) + V(2n)).