Transcendency of variants of Mills' constant

Abstract

Let x denote the integer part of x. For every sequence (Ck)k 1 of positive integers, we define (Ck) as the smallest real number >1 such that Ck is a prime number for every positive integer k. The number (3k) is called Mills' constant. Recently, the author showed that (3k) is irrational; however, the transcendency remains open. In this paper, we show that Mills' constant is transcendental under the Density Hypothesis of the Riemann zeta function. Furthermore, we obtain four classes of sequences (Ck)k 1 for which we can verify the arithmetic properties of (Ck). For simplicity, we give four representative examples belonging to each class: (A) ( bk) is irrational for every real number b 1+2; (B) ((1+2)k+(1-2)k) is transcendental; (C) (r3k-1) is transcendental for every integer r 4.003× 1014; (D) (3k- ( k)1/2 2 ( k)1/2) is transcendental.