A generalization of Gordon's theorem and applications to quasiperiodic Schrodinger operators

Authors :: David Damanik
Gunter Stolz
Source :: Electronic Journal of Differential Equations, Vol 2000, Iss 55, Pp 1-8 (2000)
Publication Year :: 2000
Publisher :: Texas State University, 2000.
Abstract: We present a criterion for absence of eigenvalues for one-dimensional Schrodinger operators. This criterion can be regarded as an L^1-version of Gordon's theorem and it has a broader range of application. Absence of eigenvalues is then established for quasiperiodic potentials generated by Liouville frequencies and various types of functions such as step functions, Holder continuous functions and functions with power-type singularities. The proof is based on Gronwall-type a priori estimates for solutions of Schrodinger equations.

Subjects :: Schrodinger operators
eigenvalue problem
quasiperiodic potentials.
Mathematics
QA1-939

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