Riesz bases consisting of root functions of 1D Dirac operators

Abstract

For one-dimensional Dirac operators Ly= i pmatrix 1 & 0 \\ 0 & -1 pmatrix dydx + v y, v= pmatrix 0 & P \\ Q & 0 pmatrix, \;\; y=pmatrix y1 \\ y2 pmatrix, subject to periodic or antiperiodic boundary conditions, we give necessary and sufficient conditions which guarantee that the system of root functions contains Riesz bases in L2 ([0,π], C2). In particular, if the potential matrix v is skew-symmetric (i.e., Q =-P), or more generally if Q =t P for some real t ≠ 0, then there exists a Riesz basis that consists of root functions of the operator L.