Author:
Marklof Jens,Welsh Matthew
Abstract
AbstractTheta sums are finite exponential sums with a quadratic form in the oscillatory phase. This paper establishes new upper bounds for theta sums in the case of smooth and box truncations. This generalises a classic 1977 result of Fiedler, Jurkat and Körner for one-variable theta sums and, in the multi-variable case, improves previous estimates obtained by Cosentino and Flaminio in 2015. Key steps in our approach are the automorphic representation of theta functions and their growth in the cusps of the underlying homogeneous space.
Publisher
Springer Science and Business Media LLC
Subject
General Mathematics,Analysis
Reference19 articles.
1. P. Buterus, F. Götze, T. Hille and G. Margulis, Distribution of values of quadratic forms at integral points, Invent. Math. 227 (2022), 857–961.
2. F. Cellarosi and J. Marklof, Quadratic Weyl sums, automorphic functions and invariance principles, Pröc. Lönd. Math. Söc. (3) 113 (2016), 775–828.
3. S. Cosentino and L. Flaminio, Equidistribution for higher-rank Abelian actions on Heisenberg nilmanifolds, J. Mod. Dyn. 9 (2015), 305–353.
4. A. Fedotov and F. Klopp, An exact renormalization formula for Gaussian exponential sums and applications, Amer. J. Math. 134 (2012), 711–748.
5. H. Fiedler, W. Jurkat and O. Körner, Asymptotic expansions of finite theta series, Acta Arith. 32 (1977), 129–146.
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