4. Local Expansions at Singularities and at Infinity[-]

The differential equation above has 0 non-zero
finite singular pointsA complex numberĀ z_0 is a singular point (or singularity of a linear ordinary differential equation with polynomial coefficients, if the leading coefficient of the equation vanishes atĀ z_0..

The modified Bessel function of the first kind {I_{\nu}\left(x\right)} depends on the parameter \nu. The box below can be used to rename or instantiate this parameter.

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