Geometry and distribution of roots of $\mu ^2\equiv D\ {\rm mod\ } m$ with $D \equiv 1\ {\rm mod\ } 4$

Zonglin Li; Matthew Welsh

doi:10.4064/aa230523-8-3

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Geometry and distribution of roots of $\mu ^2\equiv D\ {\rm mod\ } m$ with $D \equiv 1\ {\rm mod\ } 4$

Zonglin Li, Matthew Welsh Acta Arithmetica MSC: Primary 11K31; Secondary 37D40, 37A44 DOI: 10.4064/aa230523-8-3 Published online: 10 July 2024

Abstract

We extend the geometric interpretation of the roots of the quadratic congruence $\mu ^2 \equiv D$ (mod $m$) as the tops of certain geodesics in the hyperbolic plane to the case when the integer $D \gt 1$ is square-free and $D\equiv 1$ (mod $4$). This allows us to establish limit laws for the fine-scale statistics of the roots using results by Marklof and the second author.

Authors

Zonglin LiSchool of Mathematics
University of Bristol
Bristol BS8 1UG, UK
e-mail
Matthew WelshDepartment of Mathematics
University of Maryland
College Park, MD 20742-5025, USA
e-mail

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Publishing house / Journals and Serials / Acta Arithmetica / Online First articles

Acta Arithmetica

Geometry and distribution of roots of $\mu ^2\equiv D\ {\rm mod\ } m$ with $D \equiv 1\ {\rm mod\ } 4$

Abstract

Authors

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