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Piatetski-Shapiro primes in the intersection of multiple Beatty sequences

Published 1 Sep 2021 in math.NT | (2109.00461v1)

Abstract: Suppose that $\alpha_1, \alpha_2,\beta_1, \beta_2 \in\mathbb{R}$. Let $\alpha_1, \alpha_2 > 1$ be irrational and of finite type such that $1, \alpha_1{-1}, \alpha_2{-1}$ are linearly independent over $\mathbb{Q}$. Let $c$ be a real number in the range $1 < c < 12/11$. In this paper, it is proved that there exist infinitely many primes in the intersection of Beatty sequences $\mathcal{B}{\alpha_1,\beta_1} = \lfloor\alpha_1 n + \beta_1\rfloor, \mathcal{B}{\alpha_2, \beta_2} = \lfloor\alpha_2 n + \beta_2\rfloor$ and the Piatetski-Shapiro sequence $\mathscr{N}{(c)} = \lfloor nc\rfloor$. Moreover, we also give a sketch proof of Piatetski-Shapiro primes in the intersection of multiple Beatty sequences.

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