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Abstract

We provide eigenvalue asymptotics for a Dirac-type operator on $Z^{n}$ , $n ⩾ 2$ , perturbed by multiplication operators that decay as $| μ |^{- γ}$ with $γ < n$ . We show that the eigenvalues accumulate near the value of the flat band at a “semiclassical” rate with a constant that encodes the structure of the flat band. Similarly, we show that this behavior can be obtained also for a Laplace operator on a periodic graph.

Keywords

Discrete Dirac operator eigenvalue asymptotics flat band

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Eigenvalue Asymptotics Near a Flat Band in the Presence of a Slowly Decaying Potential

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