"Infinitely Often" Transcendence of Gamma-Function Derivatives

Abstract

Relatively little is known about the arithmetic properties of Gamma-function derivatives evaluated at arbitrary points q∈Q≤0. In recent work, we showed that the sequence \(n)(1)\n≥1 contains transcendental elements infinitely often. That result is now generalized to all sequences \(n)(q)\n≥1 for q∈12Z≤0. Moreover, for all such q we derive a lower bound, β(N)=\ 0,N-5/2\/N, for the density of transcendental elements (n)(q) among n∈\1,2,…,N\, where β(N) N-1/2→0 as N→∞. For q∈Q12Z, we find the somewhat weaker result that at least one of the sequences \(n)(q)\n≥1, \(n)(1-q)\n≥1 contains infinitely many transcendental elements.