Deviations of Riesz projections of Hill operators with singular potentials

Abstract

It is shown that the deviations Pn -Pn0 of Riesz projections Pn = 12π i ∫Cn (z-L)-1 dz, Cn=\|z-n2|= n\, of Hill operators L y = - y + v(x) y, x ∈ [0,π], with zero and H-1 periodic potentials go to zero as n ∞ even if we consider Pn -Pn0 as operators from L1 to L∞. This implies that all Lp-norms are uniformly equivalent on the Riesz subspaces Ran Pn.