Mills' constant
From specialfunctionswiki
Mills' constant is the smallest positive real number $M$ such that $\left\lfloor M^{3^n} \right\rfloor$ is prime for every positive $n$.
Mills' constant is the smallest positive real number $M$ such that $\left\lfloor M^{3^n} \right\rfloor$ is prime for every positive $n$.
