Spectral Instability of Random Fredholm Operators
Abstract
If A D(A) ⊂ H H is an unbounded Fredholm operator of index 0 on a Hilbert space H with a dense domain D(A), then its spectrum is either discrete or the entire complex plane. This spectral dichotomy plays a central role in the study of magic angles in twisted bilayer graphene. This paper proves that if such operators (with certain additional assumptions) are perturbed by certain random trace-class operators, their spectrum is discrete with high probability.
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