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Resonances for open quantum maps and a fractal uncertainty principle

Published 7 Aug 2016 in math.SP, math-ph, math.AP, math.MP, and nlin.CD | (1608.02238v3)

Abstract: We study eigenvalues of quantum open baker's maps with trapped sets given by linear arithmetic Cantor sets of dimensions $\delta\in (0,1)$. We show that the size of the spectral gap is strictly greater than the standard bound $\max(0,{1\over 2}-\delta)$ for all values of $\delta$, which is the first result of this kind. The size of the improvement is determined from a fractal uncertainty principle and can be computed for any given Cantor set. We next show a fractal Weyl upper bound for the number of eigenvalues in annuli, with exponent which depends on the inner radius of the annulus.

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