Is there a closed form expression for an integral of the modified Bessel function of the first kind zero order including the following?
$\int_0^\infty x^a e^{-bx^2} I_0(cx)\ x \,dx$
where a is positive integer, $b$ and $c$ are positive real.
Please also clarify if integrals including such expressions can be of closed form, e.g., for specific $a$,$b$, or $c$, or if they can only be numerically evaluated for any value included. If this can be only numerically evaluated, is there any closed formed formula for approximating this expression?
Thanks in advance for both your time and patience