Criteria for existence of Riesz bases consisting of root functions of Hill and 1D Dirac operators

Abstract

We study the system of root functions (SRF) of Hill operator Ly = -y +vy with a singular potential v ∈ H-1per and SRF of 1D Dirac operator Ly = i pmatrix 1 & 0 0 & -1 pmatrix dydx + vy with matrix L2-potential v=pmatrix 0 & P Q & 0 pmatrix, subject to periodic or anti-periodic boundary conditions. Series of necessary and sufficient conditions (in terms of Fourier coefficients of the potentials and related spectral gaps and deviations) for SRF to contain a Riesz basis are proven. Equiconvergence theorems are used to explain basis property of SRF in Lp-spaces and other rearrangement invariant function spaces.