| Poisson公式的推广 |
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| 引用本文: | 黄洪艺.Poisson公式的推广[J].厦门大学学报(自然科学版),2005,44(5):610-612. |
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| 作者姓名: | 黄洪艺 |
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| 作者单位: | 厦门大学计算机科学系,福建厦门,361005 |
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| 摘 要: | 首先介绍一种更一般的Moebius变换及其实数形式,接着引人半径为r的球变形为半径为R的球的映射.在该映射下,证明了一偏微分方程在形式上保持不变,这可看作拓广的Laplace方程不变性的证明.此外,将单位球上Poisson核的4个重要性质推广至半径为r的球上.利用拓广的Laplace方程不变性与Poisson核满足拓广的Laplace方程的特性,证明了半径为r的球上的Poisson积分公式在球内适合于拓广的Laplace方程;利用Poisson核的其它特性,证明积分结果满足一极限条件.从而完全求得半径为r的球上Dirichlet问题的解.
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| 关 键 词: | Moebius变换 实数形式 Poisson公式 |
| 文章编号: | 0438-0479(2005)05-0610-03 |
| 收稿时间: | 09 24 2004 12:00AM |
| 修稿时间: | 2004年9月24日 |
The Generalization of Poisson Formula |
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| HUANG Hong-yi.The Generalization of Poisson Formula[J].Journal of Xiamen University(Natural Science),2005,44(5):610-612. |
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| Authors: | HUANG Hong-yi |
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| Abstract: | First of all, MObius transformation and the real number form of it were introduced in the n-dimensional space. Then a mapping y of a sphere of radius r to a sphere of radius R was introduced. Under the mapping,a partial derivatives equation keeps the same form. This can be considered as the invariability of a generalized Laplace equation. Moreover,four important properties of generalized Poisson kernel on a sphere of radius r were obtained. With all these characteristic properties,it was proved that a generalized Poisson integral formula in a sphere of radius r satisfies all requirements,which Dirichlet problems in a sphere of radius r provides. |
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| Keywords: | Moebius transformation real number form Poisson formula |
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