Endomorphism of Abelian Groups as Modules over Their Endomorphism Rings

В статье определяются ряды Дирихле $\zeta_{u_T j}(s)$, $j=1,…,r$, абсолютно сходящиеся в полуплоскости $\operatorname{Re} s>1/2$ и доказывается, что множество сдвигов $(\zeta_{u_T 1}(s+ia_1\tau),…,\zeta_{u_T r}(s+ia_r\tau))$, приближающих данный набор аналитических функций, на промежутке $[T,T+H]$, $H=o(T)$ при $T\to\infty$, имеет положительную плотность. Здесь $a_1,…,a_r\in \mathbb{R}$ - алгебраические числа, линейно независимые над $\mathbb{Q}$, а $u_T\to\infty$ при $T\to\infty$. Библиография: 21 название.

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Joint Universality of Certain Dirichlet Series

Гарбаляускене

Garbaliauskienė

Шяучюнас³

et al. 2021

Matematicheskie Zametki

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Endomorphism of Abelian Groups as Modules over Their Endomorphism Rings

Cited by 1 publication

References 12 publications

Joint Universality of Certain Dirichlet Series

Joint Universality of Certain Dirichlet Series

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