Log-scale equidistribution of zeros of quantum ergodic eigensections
Abstract
Under suitable hypotheses, a symplectic map can be quantized as a sequence of unitary operators acting on the Nth powers of a positive line bundle over a K\"ahler manifold. We show that if the symplectic map has polynomial decay of correlations, then there exists a density one subsequence of eigensections whose masses and zeros become equidistributed in balls of logarithmically shrinking radii of lengths N -γ for some constant γ > 0 independent of N.
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