# A uniqueness property of general Dirichlet series

**Authors:** Anup B. Dixit

arXiv: 1905.04193 · 2019-08-09

## TL;DR

This paper proves a uniqueness property of general Dirichlet series, showing that such series are uniquely determined by their degree, conductor, and residue at s=1, under certain analytic and growth conditions.

## Contribution

It establishes a bound on the number of Dirichlet series with given invariants and shows that elements in the extended Selberg class are uniquely determined by key parameters.

## Key findings

- At most 2d_F Dirichlet series share the same invariants for given degree, conductor, and residue.
- Elements in the extended Selberg class with positive coefficients are uniquely identified by their invariants.
- The paper provides a new characterization of Dirichlet series based on their invariants.

## Abstract

Let $F(s)=\sum_n a_n/\lambda_n^s$ be a general Dirichlet series which is absolutely convergent on $\Re(s)>1$. Assume that $F(s)$ has an analytic continuation and satisfies a growth condition, which gives rise to certain invariants namely the degree $d_F$ and conductor $\alpha_F$. In this paper, we show that there are at most $2d_F$ general Dirichlet series with a given degree $d_F$, conductor $\alpha_F$ and residue $\rho_F$ at $s=1$. As a corollary, we get that elements in the extended Selberg class with positive Dirichlet coefficients are determined by their degree, conductor and the residue at $s=1$.

## Full text

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## References

15 references — full list in the complete paper: https://tomesphere.com/paper/1905.04193/full.md

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Source: https://tomesphere.com/paper/1905.04193