I have mailed my results to a few professors ,none of whom have responded.
applying mellins transform to get:
[tex] \zeta (s) = \frac{1}{s1} 
s \int_0^1 h(x) x^{s1} \, dx [/tex]
[tex] \phi : \kappa \longrightarrow\sigma [/tex]
where h(x) is the gauss kuzmin wirsing operator
[tex] \int_0^(pi/2)\ 1\fract 1\ sqrt{sin\theta  1 }{2!cos\theta1}... \dx ~ 1/ log 3! + 1/ log 5! + 1/ log 7![/tex] in continued fractions.
is this known ?
