Bari-Markus property for Riesz projections of 1D periodic Dirac operators

Abstract

The Dirac operators Ly = i 1 & 0 0 & -1 dydx + v(x) y, y = y1 y2, x∈[0,π], with L2-potentials v(x) = 0 & P(x) Q(x) & 0, P,Q ∈ L2 ([0,π]), considered on [0,π] with periodic, antiperiodic or Dirichlet boundary conditions (bc), have discrete spectra, and the Riesz projections SN = 12π i ∫|z|= N-1/2 (z-Lbc)-1 dz, Pn = 12π i ∫|z-n|= 1/4 (z-Lbc)-1 dz are well--defined for |n| ≥ N if N is sufficiently large. It is proved that Σ|n| > N \|Pn - Pn0\|2 < ∞, where Pn0, n ∈ Z, are the Riesz projections of the free operator. Then, by the Bari--Markus criterion, the spectral Riesz decompositions f = SN f + Σ|n| >N Pn f, ∀ f ∈ L2; converge unconditionally in L2.