given the Xi function on the critical line $ \xi ( 1/2+iz) $
then for big $ z \to \infty $
would be the following asymptotic be valid ?
$$ \xi( 1/2+iz) \sim g(z) $$
where $ g(x)$ is a real function with real roots and the roots of 'g' satify the following asymptotic condition
$ f(c_n ) =0 $ , $ c_{n} = \frac{2\pi n}{W(ne^{-1})}$
here $ W(z)$ is the Lambert function
for the case of Bessel function and Airy function in Quantum (semiclassical) mechanics this seems to work
