# On the distribution of Salem numbers

**Authors:** Friedrich G\"otze, Anna Gusakova

arXiv: 1904.03068 · 2021-01-28

## TL;DR

This paper develops asymptotic formulas for counting Salem numbers of fixed degree within certain bounds, providing explicit constants and functions, advancing understanding of their distribution in algebraic number theory.

## Contribution

It introduces explicit asymptotic formulas for counting Salem numbers of fixed degree, including constants and density functions, and extends results to Salem numbers with bounded absolute value.

## Key findings

- Derived asymptotic count formulas for Salem numbers of fixed degree
- Provided explicit expressions for constants and density functions
- Extended results to Salem numbers with bounded absolute value

## Abstract

In this paper we study the problem of counting Salem numbers of fixed degree. Given a set of disjoint intervals $I_1,\ldots, I_{k}\subset \left[0;\pi\right]$, $1\leq k\leq m$ let $Sal_{m,k}(Q,I_1,\ldots,I_{k})$ denote the set of ordered $(k+1)$-tuples $\left(\alpha_0,\ldots,\alpha_{k}\right)$ of conjugate algebraic integers, such that $\alpha_0$ is a Salem numbers of degree $2m+2$ satisfying $\alpha\leq Q$ for some positive real number $Q$ and $\arg\alpha_i\in I_i$. We derive the following asymptotic approximation   \[   \# Sal_{m,k}(Q,I_1,\ldots,I_{k})=\omega_m\,Q^{m+1}\,\int\limits_{I_1}\ldots\int\limits_{I_{k}}\rho_{m,k}(\boldsymbol\theta)\rm d\boldsymbol\theta+O\left(Q^{m}\right),\quad Q\rightarrow\infty,   \]   providing explicit expressions for the constant $\omega_m$ and the function $\rho_{m,k}(\boldsymbol\theta)$.   Moreover we derive a similar asymptotic formula for the set of all Salem numbers of fixed degree and absolute value bounded by $Q$ as $Q\rightarrow\infty$.

## Full text

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## Figures

5 figures with captions in the complete paper: https://tomesphere.com/paper/1904.03068/full.md

## References

26 references — full list in the complete paper: https://tomesphere.com/paper/1904.03068/full.md

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Source: https://tomesphere.com/paper/1904.03068