| 带位移奇异积分方程组的Noether可解性和正则化 |
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| 引用本文: | 郑神州.带位移奇异积分方程组的Noether可解性和正则化[J].上海交通大学学报,1995,29(5):129-135. |
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| 作者姓名: | 郑神州 |
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| 基金项目: | 国家自然科学基金,上海交通大学自然科学基金 |
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| 摘 要: | 文中研究了一类带有Carleman位移项的一般形式奇异积分方程组,与之等价的是一个含有四个元素的边值问题。对其特征方程组。对其特征方程组,得到在某些条件下的Noether可解性结果;而对于含弱奇核项的一般形式方程组,则解决了其方程组的正则化问题,从而建立了广义Noether可解性定理。
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| 关 键 词: | Noether可解性 正则化算子 奇异积分方程 |
The Noether's Solubility and Regularization of these Systems of Singular Integral Equation with Shift |
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| Zheng Shenzhou.The Noether''''s Solubility and Regularization of these Systems of Singular Integral Equation with Shift[J].Journal of Shanghai Jiaotong University,1995,29(5):129-135. |
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| Authors: | Zheng Shenzhou |
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| Institution: | Zheng Shenzhou |
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| Abstract: | In this paper, one will consider a class of these systems of singular integral equation with Carleman's shift, which are equivalent to a boundary value problem of quaternion numbers. For their eigen-equation systems, one will obtain Noether's solubility under some conditions. For general forms of equation systems with these terms of weak-singularity, one will resolve their regularization and establish the theorem of generalized Noether's solubility. |
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| Keywords: | boundary value problem of quaternion numbers correspounding equation systems Noether's solubility regularization operator |
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