Category:Examples of Use of Recurrence Relation for Polygamma Function

This category contains examples of use of Recurrence Relation for Polygamma Function.

$\map {\psi_n} {z + 1} = \map {\psi_n} z + \paren {-1}^n n! z^{-n - 1}$

where:

$\psi_n$ denote the $n$th polygamma function

$z \in \C \setminus \Z_{\le 0}$.