Critical Lieb-Thirring Bounds in Gaps and the Generalized Nevai Conjecture for Finite Gap Jacobi Matrices
Abstract
We prove bounds of the form Σe∈ Iσ (H) (e,σ (H))1/2 ≤ L1-norm of a perturbation, where I is a gap. Included are gaps in continuum one-dimensional periodic Schr\"odinger operators and finite gap Jacobi matrices where we get a generalized Nevai conjecture about an L1 condition implying a Szego condition. One key is a general new form of the Birman--Schwinger bound in gaps.
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