So,
g_{\mu \nu} = \eta_{\mu \nu} + fk_{\mu}k_{\nu} \!.
f = \frac{Gr^2}{r^4 + a^2z^2}\left[2Mr - Q^2 \right].
k_{x} = \frac{rx+ay}{r^2 + a^2}..
k_{y} = \frac{ry-ax}{r^2 + a^2}..
k_{z} = \frac{z}{r}..
k_{0} = 1.
And (with "r" being my weight with gear,
1 = \frac{x^2+y^2}{r^2 + a^2} + \frac{z^2}{r^2}
Taking into account,
A_{\mu} = \frac{Qr^3}{r^4 + a^2z^2}k_{\mu}
\vec{E} + i\vec{B} = -\vec{\nabla}\Omega\,
\Omega = \frac{Q}{\sqrt{(\vec{R}-i\vec{a})^2}} \,
with my weight of 275 lbs means that I need to add one line of pre-load on my front forks and subtract two threads on my shock.
Thanks,Guys!!!
