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| Format: | Preprint |
| Published: |
2023
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| Subjects: | |
| Online Access: | https://arxiv.org/abs/2303.11468 |
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Table of Contents:
- In the setting of a Drinfeld module $ϕ$ over a curve $X/\mathbb{F}_q$, we use a functorial point of view to define $\textit{Anderson eigenvectors}$, a generalization of the so called "special functions" introduced by Anglès, Ngo Dac and Tavares Ribeiro, and prove the existence of a universal object $ω_ϕ$. We adopt an analogous approach with the dual Drinfeld module $ϕ^*$ to define $\textit{dual Anderson eigenvectors}$. The universal object of this functor, denoted by $ζ_ϕ$, is a generalization of Pellarin zeta functions, can be expressed as an Eisenstein-like series over the period lattice, and its coordinates are analytic functions from $X(\mathbb{C}_\infty)\setminus\infty$ to $\mathbb{C}_\infty$. For all integers $i$ we define dot products $ζ_ϕ\cdotω_ϕ^{(i)}$ as certain meromorphic differential forms over $X_{\mathbb{C}_\infty}\setminus\infty$, and prove they are actually rational. This amounts to a generalization of Pellarin's identity for the Carlitz module, and is linked to the pairing of the $A$-motive and the dual $A$-motive defined by Hartl and Juschka. Finally, we develop an algorithm to compute the forms $ζ_ϕ\cdotω_ϕ^{(i)}$ when $X=\mathbb{P}^1$, and prove a conjecture of Gazda and Maurischat about the invertibility of special functions for Drinfeld modules of rank $1$.