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Line 11: The substitution <math>x \rightarrow \arccos(x)</math> transforms Matheiu's equation to the ''rational form'' :<math> \frac{d^2y}{dx^2} = \frac{x}{1-x^2} \, \frac{d y}{dx} + \frac{( 4x^2-2) \, q -a}{1-x^2} \, y</math> This has two regular singularities at x = -1,1 and one irregularity singularity at infinity, ~~whic~~which ~~impleis~~implies that in general (unlike many other special functions), the solutions of Mathieu's equation ''cannot'' be expressed in terms of [[hypergeometric function]]s. ==Floquet solution==

Mathieu function: Difference between revisions