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| Format: | Preprint |
| Published: |
2025
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| Subjects: | |
| Online Access: | https://arxiv.org/abs/2506.03475 |
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Table of Contents:
- In previous works joint with Lin, we proved that the Eisenstein series $E_4$ (resp. $E_2$) has at most one critical point in every fundamental domain $γ(F_0)$ of $Γ_{0}(2)$, where $γ(F_0)$ are translates of the basic fundamental domain $F_0$ via the Möbius transformation of $γ\inΓ_{0}(2)$. But the method can not work for the Eisenstein series $E_6$. In this paper, we develop a new approach to show that $E_6'(τ)$ has exactly either $1$ or $2$ zeros in every fundamental domain $γ(F_0)$ of $Γ_{0}(2)$. A criterion for $γ(F_0)$ containing exactly $2$ zeros is also given. Furthermore, by mapping all zeros of $E_6'(τ)$ into $F_0$ via the Möbius transformations of $Γ_{0}(2)$ action, the images give rise to a dense subset of the union of three disjoint smooth curves in $F_0$. A monodromy interpretation of these curves from a complex linear ODE is also given. As a consequence, we give a complete description of the distribution of the zeros of $E_6'(τ)$ in fundamental domains of $SL(2,\mathbb{Z})$.