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2011 Generalization of Selberg’s $ \frac{3}{{16}} $ theorem and affine sieve
Jean Bourgain, Alex Gamburd, Peter Sarnak
Author Affiliations +
Acta Math. 207(2): 255-290 (2011). DOI: 10.1007/s11511-012-0070-x

Abstract

An analogue of the well-known $ \frac{3}{{16}} $ lower bound for the first eigenvalue of the Laplacian for a congruence hyperbolic surface is proven for a congruence tower associated with any non-elementary subgroup L of SL(2, Z). The proof in the case that the Hausdorff of the limit set of L is bigger than $ \frac{1}{2} $ is based on a general result which allows one to transfer such bounds from a combinatorial version to this archimedian setting. In the case that delta is less than $ \frac{1}{2} $ we formulate and prove a somewhat weaker version of this phenomenon in terms of poles of the corresponding dynamical zeta function. These “spectral gaps” are then applied to sieving problems on orbits of such groups.

Note

Dedicated to the memory of Atle Selberg.

Citation

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Jean Bourgain. Alex Gamburd. Peter Sarnak. "Generalization of Selberg’s $ \frac{3}{{16}} $ theorem and affine sieve." Acta Math. 207 (2) 255 - 290, 2011. https://doi.org/10.1007/s11511-012-0070-x

Information

Received: 29 December 2009; Revised: 6 March 2011; Published: 2011
First available in Project Euclid: 31 January 2017

zbMATH: 1276.11081
MathSciNet: MR2892611
Digital Object Identifier: 10.1007/s11511-012-0070-x

Rights: 2011 © Institut Mittag-Leffler

Vol.207 • No. 2 • 2011
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