Perturbation of an Eigen-Value from a Dense Point Spectrum : An Example

Abstract

We study a perturbed Floquet Hamiltonian K+β V depending on a coupling constant β. The spectrum σ(K) is assumed to be pure point and dense. We pick up an eigen-value, namely 0∈σ(K), and show the existence of a function λ(β) defined on I⊂ such that λ(β) ∈ σ(K+β V) for all β∈ I, 0 is a point of density for the set I, and the Rayleigh-Schr\"odinger perturbation series represents an asymptotic series for the function λ(β). All ideas are developed and demonstrated when treating an explicit example but some of them are expected to have an essentially wider range of application.

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