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Euler products associated to multivariate rational functions: maximal domain of meromorphy, zeros and poles

Volume 611 / 2026

Arnaud Chadozeau, Oswaldo Velásquez Castañón Dissertationes Mathematicae 611 (2026), 80 pp. MSC: Primary 11M32; Secondary 52B20, 13F25, 32D15. DOI: 10.4064/dm240206-23-2 Published online: 7 May 2026

Abstract

We determine the maximal domain of meromorphy of any Euler product $$f(s_1,\dots,s_k) = \prod_p h(p^{-s_1}, \ldots, p^{-s_k}),$$ where $h$ is the quotient of two polynomials in $k$ variables, with integer coefficients and with constant term equal to $1$. More precisely, we define a domain $\Gamma \subseteq \mathbb C^k$, on which $f$ admits a meromorphic extension, and such that for any $\boldsymbol z$ in $\partial \Gamma$, there is no neighborhood of $\boldsymbol z$ on which $f$ admits a meromorphic extension. This maximal domain $\Gamma$ is described as $\mathring K + \mathrm i \mathbb R^k$, where $K \subseteq \mathbb R^k$ is a rational cone, computed from the set of exponents of the two polynomials defining $h$. We also describe the divisor of $f$ over $\Gamma$, which comes from the local factors $h(p^{-s_1}, \ldots, p^{-s_k})$, and from the zeta factors $\zeta (\alpha_1 s_1 + \cdots +\alpha_k s_k)^{-c_{\boldsymbol{\alpha}}}$, where $\zeta$ denotes the Riemann $\zeta$-function, corresponding to terms in the expansion of $h$ as a formal infinite product $\prod_{\boldsymbol{\alpha}} (1-X_1^{\alpha_1}\cdots X_k^{\alpha_k})^{c_{\boldsymbol{\alpha}}}$. We focus our study on the hyperplanes in the divisor, allowing us to use tools developed for the single variable case. We complete our study by giving a geometric and arithmetic description of the set of exponents occurring in the infinite product expansion of $h$, and by showing a new result on the geometric nature of the set of singular points of a holomorphic function defined over a tubular domain.

Authors

  • Arnaud ChadozeauCNRS UMR 7586
    Institut de Mathématiques de Jussieu – Paris Rive Gauche (IMJ-PRG)
    Université de Paris
    75205 Paris, France
    e-mail
  • Oswaldo Velásquez CastañónInstituto de Matemática y Ciencias Afines
    Universidad Nacional de Ingeniería
    Lima 15012, Peru
    e-mail

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