i have a qustion on the integration of a modified bessel function. According to the reference:
Werner Rosenheinrich,"TABLES OF SOME INDEFINITE INTEGRAL OF BESSEL FUNCTIONS OF INTEGER ORDER", 2017
$\int x^2 I_0(x)=x^2I_1(x)+\frac {\pi x}{2} (K_0(x)L_1(x)+K_1(x)L_0(x)) $
,where $I_v(x), K_v(x), L_v(x)$ is a modified bessel function of a first kind, that of a second kind, and a modified struve function respectively.
Is is possible to expand the solution of $\int x^2 I_0(ax)$ in analytical way as the above equation?