📝 SummarXiv

Abstract

Let $\lfloor x\rfloor$ denote the integer part of $x$. For every sequence $(C_k)_{k\ge 1}$ of positive integers, we define $\xi(C_k)$ as the smallest real number $\xi>1$ such that $\lfloor \xi^{C_k} \rfloor$ is a prime number for every positive integer $k$. The number $\xi(3^k)$ is called Mills' constant. Recently, the author showed that $\xi(3^k)$ is irrational, but the transcendency of this number is still open. In this paper, we give sufficient conditions on $(C_k)_{k\ge 1}$ to determine the transcendency of $\xi(C_k)$. For example, we obtain the following three results: (A) $\xi(\lfloor b^k\rfloor)$ is irrational for every real number $b\geq 1+\sqrt{2}$; (B) $\xi((1+\sqrt{2})^k+(1-\sqrt{2})^k)$ is transcendental; (C) $\xi(r3^k-1)$ is transcendental for every integer $r\geq 4.003\times 10^{14}$. Furthermore, assuming the Riemann hypothesis, $\xi(3^k-1)$ is transcendental. However, we still do not know whether Mills' constant is transcendental.