Riemann Weighted Prime-Power Counting Function

The Riemann weighted prime-power counting function is defined by

$\displaystyle J_2(x)$	$\textstyle \equiv$	$\displaystyle \left\{\begin{array}{ll}\pi(x)+{\textstyle{1\over 2}}\pi(x^{1/2})... ...(x^{1/3})+\ldots & \mbox{}\\ \quad {\rm otherwise} & \mbox{}\end{array}\right.$	(1)
	$\textstyle =$	$\displaystyle \lim_{t\to\infty} {1\over 2\pi i} \int_{2-iT}^{2+iT} {x^s\over s} \ln \zeta(s)\,ds.$	(2)

The Prime Counting Function is given in terms of

$\begin{displaymath} \pi(x)=\sum_{n=1}^\infty {\mu(n)\over n} J_2(x^{1/n}). \end{displaymath}$

(3)

The function also satisfies the identity

$\begin{displaymath} {\ln \zeta(s)\over s} = \int_1^\infty J_2(x)x^{-s-1}\,dx. \end{displaymath}$

(4)