Complete monotonicity of a family of functions involving the tri- and tetra-gamma functions
arXiv:1301.0156 · doi:10.17777/pjms.2015.18.2.253
Abstract
The psi function $Ï(x)$ is defined by $Ï(x)=\frac{Î'(x)}{Î(x)}$ and $Ï^{(i)}(x)$ for $i\in\mathbb{N}$ denote polygamma functions, where $Î(x)$ is the gamma function. In this paper, we prove that the function $$ [Ï'(x)]^2+Ï"(x)-\frac{x^2+λx+12}{12x^4(x+1)^2} $$ is completely monotonic on $(0,\infty)$ if and only if $λ\le0$, and so is its negative if and only if $λ\ge4$. From this, some inequalities are refined and sharpened.
11 pages