Stephens' constant
Stephens' constant expresses the density of certain subsets of the prime numbers.[1][2] Let and be two multiplicatively independent integers, that is, except when both and equal zero. Consider the set of prime numbers such that evenly divides for some power . The density of the set relative to the set of all primes is a rational multiple of
Stephens' constant is closely related to the Artin constant that arises in the study of primitive roots.[3][4]
See also
- Euler product
- Twin prime constant
References
- Stephens, P. J. (1976). "Prime Divisor of Second-Order Linear Recurrences, I.". Journal of Number Theory. 8: 313–332. doi:10.1016/0022-314X(76)90010-X.
- Weisstein, Eric W. "Stephens' Constant". MathWorld.
- Moree, Pieter; Stevenhagen, Peter (2000). "A two-variable Artin conjecture". Journal of Number Theory. 85: 291–304. arXiv:math/9912250. doi:10.1006/jnth.2000.2547.
- Moree, Pieter (2000). "Approximation of singular series and automata". manuscripta mathematica. 101: 385–399. doi:10.1007/s002290050222.
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