阿佩尔函数

阿佩尔函数是法国数学家（Paul Apell)在1880年为推广高斯超几何函数而创建的一组雙变数函数，定义如下

F_{1} (a, b_{1}, b_{2}, c; x, y) = \sum_{m, n = 0}^{\infty} \frac{(a)_{m + n} (b_{1})_{m} (b_{2})_{n}}{(c)_{m + n} m! n!} x^{m} y^{n},

F_{2} (a, b_{1}, b_{2}, c_{1}, c_{2}; x, y) = \sum_{m, n = 0}^{\infty} \frac{(a)_{m + n} (b_{1})_{m} (b_{2})_{n}}{(c_{1})_{m} (c_{2})_{n} m! n!} x^{m} y^{n},

F_{3} (a_{1}, a_{2}, b_{1}, b_{2}, c; x, y) = \sum_{m, n = 0}^{\infty} \frac{(a_{1})_{m} (a_{2})_{n} (b_{1})_{m} (b_{2})_{n}}{(c)_{m + n} m! n!} x^{m} y^{n},

F_{4} (a, b, c_{1}, c_{2}; x, y) = \sum_{m, n = 0}^{\infty} \frac{(a)_{m + n} (b)_{m + n}}{(c_{1})_{m} (c_{2})_{n} m! n!} x^{m} y^{n} .

其中的符号 $: (a)_{m + n}$ 是阶乘幂

归递关系

(a - b_{1} - b_{2}) F_{1} (a, b_{1}, b_{2}, c; x, y) - a F_{1} (a + 1, b_{1}, b_{2}, c; x, y) + b_{1} F_{1} (a, b_{1} + 1, b_{2}, c; x, y) + b_{2} F_{1} (a, b_{1}, b_{2} + 1, c; x, y) = 0,

c F_{1} (a, b_{1}, b_{2}, c; x, y) - (c - a) F_{1} (a, b_{1}, b_{2}, c + 1; x, y) - a F_{1} (a + 1, b_{1}, b_{2}, c + 1; x, y) = 0,

c F_{1} (a, b_{1}, b_{2}, c; x, y) + c (x - 1) F_{1} (a, b_{1} + 1, b_{2}, c; x, y) - (c - a) x F_{1} (a, b_{1} + 1, b_{2}, c + 1; x, y) = 0,

c F_{1} (a, b_{1}, b_{2}, c; x, y) + c (y - 1) F_{1} (a, b_{1}, b_{2} + 1, c; x, y) - (c - a) y F_{1} (a, b_{1}, b_{2} + 1, c + 1; x, y) = 0 .

其它式子^[1]可從這四個關係導出。

c F_{3} (a_{1}, a_{2}, b_{1}, b_{2}, c; x, y) + (a_{1} + a_{2} - c) F_{3} (a_{1}, a_{2}, b_{1}, b_{2}, c + 1; x, y) - a_{1} F_{3} (a_{1} + 1, a_{2}, b_{1}, b_{2}, c + 1; x, y) - a_{2} F_{3} (a_{1}, a_{2} + 1, b_{1}, b_{2}, c + 1; x, y) = 0,

c F_{3} (a_{1}, a_{2}, b_{1}, b_{2}, c; x, y) - c F_{3} (a_{1} + 1, a_{2}, b_{1}, b_{2}, c; x, y) + b_{1} x F_{3} (a_{1} + 1, a_{2}, b_{1} + 1, b_{2}, c + 1; x, y) = 0,

c F_{3} (a_{1}, a_{2}, b_{1}, b_{2}, c; x, y) - c F_{3} (a_{1}, a_{2} + 1, b_{1}, b_{2}, c; x, y) + b_{2} y F_{3} (a_{1}, a_{2} + 1, b_{1}, b_{2} + 1, c + 1; x, y) = 0,

c F_{3} (a_{1}, a_{2}, b_{1}, b_{2}, c; x, y) - c F_{3} (a_{1}, a_{2}, b_{1} + 1, b_{2}, c; x, y) + a_{1} x F_{3} (a_{1} + 1, a_{2}, b_{1} + 1, b_{2}, c + 1; x, y) = 0,

c F_{3} (a_{1}, a_{2}, b_{1}, b_{2}, c; x, y) - c F_{3} (a_{1}, a_{2}, b_{1}, b_{2} + 1, c; x, y) + a_{2} y F_{3} (a_{1}, a_{2} + 1, b_{1}, b_{2} + 1, c + 1; x, y) = 0 .

\frac{\partial}{\partial x} F_{1} (a, b_{1}, b_{2}, c; x, y) = \frac{a b_{1}}{c} F_{1} (a + 1, b_{1} + 1, b_{2}, c + 1; x, y),

\frac{\partial}{\partial y} F_{1} (a, b_{1}, b_{2}, c; x, y) = \frac{a b_{2}}{c} F_{1} (a + 1, b_{1}, b_{2} + 1, c + 1; x, y) .

(x (1 - x) \frac{\partial^{2}}{\partial x^{2}} + y (1 - x) \frac{\partial^{2}}{\partial x \partial y} + [c - (a + b_{1} + 1) x] \frac{\partial}{\partial x} - b_{1} y \frac{\partial}{\partial y} - a b_{1}) F_{1} (x, y) = 0,

(y (1 - y) \frac{\partial^{2}}{\partial y^{2}} + x (1 - y) \frac{\partial^{2}}{\partial x \partial y} + [c - (a + b_{2} + 1) y] \frac{\partial}{\partial y} - b_{2} x \frac{\partial}{\partial x} - a b_{2}) F_{1} (x, y) = 0 .

\frac{\partial}{\partial x} F_{3} (a_{1}, a_{2}, b_{1}, b_{2}, c; x, y) = \frac{a_{1} b_{1}}{c} F_{3} (a_{1} + 1, a_{2}, b_{1} + 1, b_{2}, c + 1; x, y),

\frac{\partial}{\partial y} F_{3} (a_{1}, a_{2}, b_{1}, b_{2}, c; x, y) = \frac{a_{2} b_{2}}{c} F_{3} (a_{1}, a_{2} + 1, b_{1}, b_{2} + 1, c + 1; x, y) .

(x (1 - x) \frac{\partial^{2}}{\partial x^{2}} + y \frac{\partial^{2}}{\partial x \partial y} + [c - (a_{1} + b_{1} + 1) x] \frac{\partial}{\partial x} - a_{1} b_{1}) F_{3} (x, y) = 0,

(y (1 - y) \frac{\partial^{2}}{\partial y^{2}} + x \frac{\partial^{2}}{\partial x \partial y} + [c - (a_{2} + b_{2} + 1) y] \frac{\partial}{\partial y} - a_{2} b_{2}) F_{3} (x, y) = 0 .

F_{1} (a, b_{1}, b_{2}, c; x, y) = \frac{Γ (c)}{Γ (a) Γ (c - a)} \int_{0}^{1} t^{a - 1} (1 - t)^{c - a - 1} (1 - x t)^{- b_{1}} (1 - y t)^{- b_{2}} d t, ℜ c > ℜ a > 0 .

F (ϕ, k) = \int_{0}^{ϕ} \frac{d θ}{\sqrt{1 - k^{2} \sin^{2} θ}} = \sin ϕ F_{1} (\frac{1}{2}, \frac{1}{2}, \frac{1}{2}, \frac{3}{2}; \sin^{2} ϕ, k^{2} \sin^{2} ϕ), | ℜ ϕ | < \frac{π}{2},

E (ϕ, k) = \int_{0}^{ϕ} \sqrt{1 - k^{2} \sin^{2} θ} d θ = \sin ϕ F_{1} (\frac{1}{2}, \frac{1}{2}, - \frac{1}{2}, \frac{3}{2}; \sin^{2} ϕ, k^{2} \sin^{2} ϕ), | ℜ ϕ | < \frac{π}{2},

Π (n, k) = \int_{0}^{π / 2} \frac{d θ}{(1 - n \sin^{2} θ) \sqrt{1 - k^{2} \sin^{2} θ}} = \frac{π}{2} F_{1} (\frac{1}{2}, 1, \frac{1}{2}, 1; n, k^{2}) .

↑ 例如： $(y - x) F_{1} (a, b_{1} + 1, b_{2} + 1, c, x, y) = y F_{1} (a, b_{1}, b_{2} + 1, c, x, y) - x F_{1} (a, b_{1} + 1, b_{2}, c, x, y)$

Template:Cite journal (see also "Sur la série F₃(α,α',β,β',γ; x,y)" in C. R. Acad. Sci. 90, pp. 977–980)
Template:Cite journal
Template:Cite book (see p. 14)
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Template:Cite book (see p. 224)
Template:Cite book (see Chapter 9.18)
Template:Cite journal
Template:Cite journal
Template:Cite journal (see also C. R. Acad. Sci. 90 (1880), pp. 1119–1121 and 1267–1269)
Template:Cite book (there is a 2008 paperback with ISBN 978-0-521-09061-2)