HypergeometricU
HypergeometricU[a,b,z]
为 Tricomi 合流超几何函数 ![TemplateBox[{a, b, z}, HypergeometricU]](Files/HypergeometricU.zh/1.png "TemplateBox[{a, b, z}, HypergeometricU]"){kind=small}
.
更多信息
- 数学函数,同时适合于符号和数值运算.
- 函数
![TemplateBox[{a, b, z}, HypergeometricU]](Files/HypergeometricU.zh/2.png "TemplateBox[{a, b, z}, HypergeometricU]")
有积分表达式 ![TemplateBox[{a, b, z}, HypergeometricU]=1/TemplateBox[{a}, Gamma]int_0^inftye^(-zt)t^(a-1)(1+t)^(b-a-1) dt](Files/HypergeometricU.zh/3.png "TemplateBox[{a, b, z}, HypergeometricU]=1/TemplateBox[{a}, Gamma]int_0^inftye^(-zt)t^(a-1)(1+t)^(b-a-1) dt")
. - HypergeometricU[a,b,z] 在复平面
上从 
到 
有一个不连续分支切割. - 对某些特定变量值,HypergeometricU 会自动运算出精确值.
- HypergeometricU 可计算到任意数值精度.
- HypergeometricU 自动逐项作用于列表.
- HypergeometricU 可与 Interval 和 CenteredInterval 对象一起使用. »
范例
打开所有单元关闭所有单元基本范例 (5)
范围 (39)
数值计算 (5)
在高精度条件下高效计算 HypergeometricU:
用 Interval 和 CenteredInterval 对象计算最坏情况下的区间:
或用 Around 计算一般情况下的统计区间:
或用 MatrixFunction 计算矩阵形式的 HypergeometricU 函数:
特殊值 (3)
![TemplateBox[{3, 2, x}, HypergeometricU]=1](Files/HypergeometricU.zh/8.png "TemplateBox[{3, 2, x}, HypergeometricU]=1"){kind=small}
可视化 (3)
![TemplateBox[{{1, /, 2}, {sqrt(, 3, )}, z}, HypergeometricU]](Files/HypergeometricU.zh/10.png "TemplateBox[{{1, /, 2}, {sqrt(, 3, )}, z}, HypergeometricU]"){kind=small}
![TemplateBox[{{1, /, 2}, {sqrt(, 3, )}, z}, HypergeometricU]](Files/HypergeometricU.zh/11.png "TemplateBox[{{1, /, 2}, {sqrt(, 3, )}, z}, HypergeometricU]"){kind=small}
函数属性 (9)
![TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]](Files/HypergeometricU.zh/12.png "TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]"){kind=small}
![TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]](Files/HypergeometricU.zh/13.png "TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]"){kind=small}
![TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]](Files/HypergeometricU.zh/14.png "TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]"){kind=small}
![TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]](Files/HypergeometricU.zh/15.png "TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]"){kind=small}
![TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]](Files/HypergeometricU.zh/16.png "TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]"){kind=small}
![TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]](Files/HypergeometricU.zh/17.png "TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]"){kind=small}
![TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]](Files/HypergeometricU.zh/18.png "TemplateBox[{{sqrt(, 3, )}, {sqrt(, 2, )}, z}, HypergeometricU]"){kind=small}
阶导数的公式:积分 (3)
级数展开式 (3)
![TemplateBox[{{1, /, 2}, {sqrt(, 3, )}, x}, HypergeometricU]](Files/HypergeometricU.zh/23.png "TemplateBox[{{1, /, 2}, {sqrt(, 3, )}, x}, HypergeometricU]"){kind=small}
积分变换 (3)
函数表示 (5)
用 Gamma 和 Hypergeometric1F1 来表示:
可用 MeijerG 来表示 HypergeometricU:
HypergeometricU 可以表示为 DifferentialRoot:
TraditionalForm 格式:
应用 (3)
函数的发散级数的 Borel 求和给出 HypergeometricU:
使用 Sum 的 Regularization 选项也可以得到同样的结果:
定义 WishartMatrixDistribution 的比例条件数的分布:
属性和关系 (4)
用 FunctionExpand 把 HypergeometricU 展开为简单函数:
Integrate 可能给出包含 HypergeometricU 的结果:
HypergeometricU 可以表示为 DifferentialRoot:
HypergeometricU 可以表示为 DifferenceRoot:
可能存在的问题 (1)
![TemplateBox[{TemplateBox[{a, {a, -, b, +, 1}, c, {1, -, {c, /, z}}}, Hypergeometric2F1], c, infty}, Limit2Arg]z^(-a)=TemplateBox[{a, b, z}, HypergeometricU]](Files/HypergeometricU.zh/27.png "TemplateBox[{TemplateBox[{a, {a, -, b, +, 1}, c, {1, -, {c, /, z}}}, Hypergeometric2F1], c, infty}, Limit2Arg]z^(-a)=TemplateBox[{a, b, z}, HypergeometricU]"){kind=small}
![TemplateBox[{{1, /, 2}, {2, /, 3}, z}, HypergeometricU]](Files/HypergeometricU.zh/28.png "TemplateBox[{{1, /, 2}, {2, /, 3}, z}, HypergeometricU]"){kind=small}
文本
Wolfram Research (1988),HypergeometricU,Wolfram 语言函数,https://reference.wolfram.com/language/ref/HypergeometricU.html (更新于 2022 年).
CMS
Wolfram 语言. 1988. "HypergeometricU." Wolfram 语言与系统参考资料中心. Wolfram Research. 最新版本 2022. https://reference.wolfram.com/language/ref/HypergeometricU.html.
APA
Wolfram 语言. (1988). HypergeometricU. Wolfram 语言与系统参考资料中心. 追溯自 https://reference.wolfram.com/language/ref/HypergeometricU.html 年