I tiakina i:
| Kaituhi matua: | |
|---|---|
| Hōputu: | Preprint |
| I whakaputaina: |
2023
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| Ngā marau: | |
| Urunga tuihono: | https://arxiv.org/abs/2302.07073 |
| Ngā Tūtohu: |
Tāpirihia he Tūtohu
Kāore He Tūtohu, Me noho koe te mea tuatahi ki te tūtohu i tēnei pūkete!
|
Rārangi ihirangi:
- For any $θ>\frac13$, we show that there are constants $c_1,c_2>0$ that depend only on $θ$ for which the following property holds. If $χ_1,χ_2$ are two distinct primitive Dirichlet characters modulo $q$, and $T\ge c_1q^θ$, then $L(s,χ_1)$ and $L(s,χ_2)$ do not have the same zeros in the region $$\big\{s=σ+it\in{\mathbb C}:0<σ<1,~T<t<T+c_2q^θ\log T\big\}.$$ For cubefree moduli $q$, the same result holds for any $θ>\frac14$.