Finite Sections of Periodic Schr\"odinger Operators

Abstract

We study discrete Schr\"odinger operators H with periodic potentials as they are typically used to approximate aperiodic Schr\"odinger operators like the Fibonacci Hamiltonian. We prove an efficient test for applicability of the finite section method, a procedure that approximates H by growing finite square submatrices Hn. For integer-valued potentials, we show that the finite section method is applicable as soon as H is invertible. This statement remains true for \0, λ\-valued potentials with fixed rational λ and period less than nine as well as for arbitrary real-valued potentials of period two.

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