Bari-Markus property for Riesz projections of Hill operators with singular potentials

Djakov, Plamen Borissov and Mityagin, Boris (2009) Bari-Markus property for Riesz projections of Hill operators with singular potentials. In: Conference on Functional Analysis and Complex Analysis, Sabancı Üniversitesi, İstanbul, Türkiye

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Abstract

The Hill operators Ly = -y '' + v(x)y, x is an element of [0, pi], with H-1 periodic potentials, considered with periodic, antiperiodic or Dirichlet boundary conditions, have discrete spectrum, and therefore, for sufficiently large N, the Riesz projections P-n = 1/2 pi i integral(Cn) (z-L)(-1)dz, C-n = {z: |z-n(2)| = n} are well defined. It is proved that Sigma(n>N) parallel to P-n - P-n(0)parallel to(2) < infinity, where P-n(0) are the Riesz projections of the free operator.

Item Type:	Papers in Conference Proceedings
Subjects:	Q Science > QA Mathematics
ID Code:	12136
Deposited By:	Plamen Borissov Djakov
Deposited On:	08 Oct 2009 11:32
Last Modified:	09 Nov 2009 12:33

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Bari-Markus property for Riesz projections of Hill operators with singular potentials. (deposited 06 Nov 2008 11:27)
- Bari-Markus property for Riesz projections of Hill operators with singular potentials. (deposited 08 Oct 2009 11:32) [Currently Displayed]

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