Hypergeometric Differential Equation

According to §9.151 (p. 1045) of Gradshteyn & Ryzhik, "… a hypergeometric series is one of the solutions of the differential equation,

$0$

$=$

$z (1 - z) \frac{d^{2} u}{d z^{2}} + [γ - (α + β + 1) z] \frac{d u}{d z} - α β u,$

which is called the hypergeometric equation. And, according to §9.10 (p. 1039) of Gradshteyn & Ryzhik, "A hypergeometric series is a series of the form,

$F (α, β; γ; z)$

$=$

$1 + [\frac{α \cdot β}{γ \cdot 1}] z + [\frac{α (α + 1) β (β + 1)}{γ (γ + 1) \cdot 1 \cdot 2}] z^{2} + [\frac{α (α + 1) (α + 2) β (β + 1) (β + 2)}{γ (γ + 1) (γ + 2) \cdot 1 \cdot 2 \cdot 3}] z^{3} + \dots$

Among other attributes, Gradshteyn & Ryzhik note that this, "… series terminates if $α$ or $β$ is equal to a negative integer or to zero."

Appendix/Mathematics/Hypergeometric

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Hypergeometric Differential Equation

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Appendix/Mathematics/Hypergeometric

Hypergeometric Differential Equation

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