刘维尔公式

刘维尔公式（Liouville's Formula）是一个关于多重积分和欧拉积分（ $Γ$ 函数）的公式，其形式如下：

\int . . . \iint_{x_{1}, x_{2}, . . ., x_{n} ⩾ 0; x_{1} + x_{2} + . . . + x_{n} ⩽ 1} f (x_{1} + x_{2} + . . . + x_{n}) x_{1}^{p_{1} - 1} x_{2}^{p_{2} - 1} . . . x_{n}^{p_{n} - 1} d x_{1} d x_{2} . . . d x_{n}

$= \frac{Γ (p_{1}) Γ (p_{2}) . . . Γ (p_{n})}{Γ (p_{1} + p_{2} + . . . + p_{n})} \int_{0}^{1} f (u) u^{p_{1} + p_{2} + . . . + p_{n} - 1} d u$

其中 $p_{1}, p_{2}, . . ., p_{n} > 0$ ， $f (u)$ 为连续函数。^[1]

证明

用数学归纳法。当n=1时，公式显然成立。

当n=2时，公式也成立，即

\iint_{x_{1}, x_{2} ⩾ 0; x_{1} + x_{2} ⩽ 1} f (x_{1} + x_{2}) x_{1}^{p_{1} - 1} x_{2}^{p_{2} - 1} d x_{1} d x_{2} = \frac{Γ (p_{1}) Γ (p_{2})}{Γ (p_{1} + p_{2})} \int_{0}^{1} f (u) u^{p_{1} + p_{2} - 1} d u

事实上，令 $Ω$ 表示区域： $x_{1} ⩾ 0, x_{2} ⩾ 0, x_{1} + x_{2} ⩽ 1$ ，作代换 $x_{1} = ξ_{1}, x_{1} + x_{2} = ξ_{2}$ ，以及 $t = \frac{ξ_{1}}{ξ_{2}}$ ，则有

\iint_{x_{1}, x_{2} ⩾ 0; x_{1} + x_{2} ⩽ 1} f (x_{1} + x_{2}) x_{1}^{p_{1} - 1} x_{2}^{p_{2} - 1} d x_{1} d x_{2} = \int_{0}^{1} f (ξ_{2}) d ξ_{2} \int_{0}^{ξ_{2}} ξ_{1}^{p_{1} - 1} {(ξ_{2} - ξ 1)}^{p_{2} - 1} d ξ_{1}

\int_{0}^{1} f (ξ_{2}) d ξ_{2} \int_{0}^{1} t^{p_{1} - 1} {(1 - t)}^{p_{2} - 1} ξ_{2}^{p_{1} + p_{2} - 1} d t = \frac{Γ (p_{1}) Γ (p_{2})}{Γ (p_{1} + p_{2})} \int_{0}^{1} f (ξ_{2}) ξ_{2}^{p_{1} + p_{2} - 1} d ξ_{2} = \frac{Γ (p_{1}) Γ (p_{2})}{Γ (p_{1} + p_{2})} \int_{0}^{1} f (u) u^{p_{1} + p_{2} - 1} d u

设公式对于n-1成立，今证对于n公式也成立。为此，将公式左端写为

\int . . . \iint_{x_{1}, x_{2}, . . ., x_{n - 1} ⩾ 0; x_{1} + x_{2} + . . . + x_{n - 1} ⩽ 1} x_{1}^{p_{1} - 1} x_{2}^{p_{2} - 1} . . . x_{n - 1}^{p_{n - 1} - 1} d x_{1} d x_{2} . . . d x_{n - 1} \int_{0}^{1 - (x_{1} + x_{2} + . . . + x_{n - 1})} f (x_{1} + x_{2} + . . . + x_{n}) x_{n}^{p_{n} - 1} d x_{n}

令 $ψ (s) = \int_{0}^{1 - s} f (s + x_{n}) x_{n}^{p_{n} - 1} d x_{n}$

代入上式，并利用公式对Template:Mvar-1成立的假定，得知上式为

\frac{Γ (p_{1}) Γ (p_{2}) . . . Γ (p_{n - 1})}{Γ (p_{1} + p_{2} + . . . + p_{n - 1})} \int_{0}^{1} ψ (s) s^{p_{1} + p_{2} + . . . + p_{n - 1} - 1} d s

利用上面已证的Template:Mvar=2时的公式，于是即得

\int . . . \iint_{x_{1}, x_{2}, . . ., x_{n} ⩾ 0; x_{1} + x_{2} + . . . + x_{n} ⩽ 1} f (x_{1} + x_{2} + . . . + x_{n}) x_{1}^{p_{1} - 1} x_{2}^{p_{2} - 1} . . . x_{n}^{p_{n} - 1} d x_{1} d x_{2} . . . d x_{n}

$= \frac{Γ (p_{1}) Γ (p_{2}) . . . Γ (p_{n - 1})}{Γ (p_{1} + p_{2} + . . . + p_{n - 1})} \int_{0}^{1} d s \int_{0}^{1 - s} f (s + x_{n}) s^{p_{1} + p_{2} + . . . + p_{n - 1} - 1} x_{n}^{p_{n} - 1} d x_{n}$

$= \frac{Γ (p_{1}) Γ (p_{2}) . . . Γ (p_{n - 1})}{Γ (p_{1} + p_{2} + . . . + p_{n - 1})} \iint_{s, x_{n} ⩾ 0; s + x_{n} ⩽ 1} f (s + x_{n}) s^{p_{1} + p_{2} + . . . + p_{n - 1} - 1} x_{n}^{p_{n} - 1} d x_{n}$

$= \frac{Γ (p_{1}) Γ (p_{2}) . . . Γ (p_{n - 1})}{Γ (p_{1} + p_{2} + . . . + p_{n - 1})} \cdot \frac{Γ (p_{1} + p_{2} + . . . + p_{n - 1}) Γ (p_{n})}{Γ (p_{1} + p_{2} + . . . + p_{n})} \int_{0}^{1} f (u) u^{p_{1} + p_{2} + . . . + p_{n} - 1} d u$

$= \frac{Γ (p_{1}) Γ (p_{2}) . . . Γ (p_{n})}{Γ (p_{1} + p_{2} + . . . + p_{n})} \int_{0}^{1} f (u) u^{p_{1} + p_{2} + . . . + p_{n} - 1} d u$

证明完毕。^[1]

参考资料

Template:Reflist

↑ ^1.0 ^1.1 Б.П.吉米多维奇. 《吉米多维奇数学分析习题集题解》. 济南: 山东科学技术出版社. 2014. ISBN 978-7-5331-5895-8.

[a1-1] 1.0 ^1.1 Б.П.吉米多维奇. 《吉米多维奇数学分析习题集题解》. 济南: 山东科学技术出版社. 2014. ISBN 978-7-5331-5895-8.

[1]

刘维尔公式

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