The fractal uncertainty principle via Dolgopyat's method in higher dimensions
Abstract
We prove a fractal uncertainty principle with exponent d2 - δ + , > 0, for Ahlfors--David regular subsets of Rd with dimension δ which satisfy a suitable "nonorthogonality condition". This generalizes the application of Dolgopyat's method by Dyatlov--Jin (arXiv:1702.03619) to prove the same result in the special case d = 1. As a corollary, we get a quantitative spectral gap for the Laplacian on convex cocompact hyperbolic manifolds of arbitrary dimension with Zariski dense fundamental groups.
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