Possible Duplicate:
Derivate Bessel Function with respect to order

Dear colleagues, I have a question about the modified Bessel function of the second kind, $I_\nu(x)$ and $K_\nu(x)$. I want to know if there is any result on the derivatives with respect to the parameter $\nu$ of $I_\nu(x)$ and $K_\nu(x)$. That is I want to know where I can find some reference about $\partial_\nu I_\nu (x)$ and $\partial_\nu K_\nu (x)$.

Thank you in advance!

Possible Duplicate:
Derivate Bessel Function with respect to order

Dear colleagues, I have a question about the modified Bessel function of the second kind, $I_\nu(x)$ and $K_\nu(x)$. I want to know if there is any result on the derivatives with respect to the parameter $\nu$ of $I_\nu(x)$ and $K_\nu(x)$. That is I want to know where I can find some reference about $\partial_\nu I_\nu (x)$ and $\partial_\nu K_\nu (x)$.

Thank you in advance!

Dear colleagues, I have a question about the modified Bessel function of the second kind, $I_\nu(x)$ and $K_\nu(x)$. I want to know if there is any result on the derivatives with respect to the parameter $\nu$ of $I_\nu(x)$ and $K_\nu(x)$. That is I want to know where I can find some reference about $\partial_\nu I_\nu (x)$ and $\partial_\nu K_\nu (x)$.

Thank you in advance!

Possible Duplicate:
Derivate Bessel Function with respect to order

Dear colleagues, I have a question about the modified Bessel function of the second kind, $I_\nu(x)$ and $K_\nu(x)$. I want to know if there is any result on the derivatives with respect to the parameter $\nu$ of $I_\nu(x)$ and $K_\nu(x)$. That is I want to know where I can find some reference about $\partial_\nu I_\nu (x)$ and $\partial_\nu K_\nu (x)$.

Thank you in advance!