| 积分算子方程的连续型配置方法 |
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| 引用本文: | 胡齐芽.积分算子方程的连续型配置方法[J].计算数学,1998,20(3):261-266. |
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| 作者姓名: | 胡齐芽 |
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| 作者单位: | 湘潭大学数学系计算与应用数学研究所!中国科学院数学研究所 |
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| 摘 要: | 1.引言由于对积分算子方程来说,配置法比Galerkin法具计算量小的优点(少算一重积分),故配置法更受人们重视.但已有的文献几乎都是将配置空间取作非连续的分片多项式样条空间,以得到某种超收敛结果(如[1,2]).这种方法存在下列不足:(a)光滑核Volterra积分方程与光滑核Fredholm积分方程具完全不同的收敛性质[1],且需用不同的方法获得其加速收敛结果(比较[31与[4]),尽管Volterra积分方程在理论上被看作是Fredholm积分方程的特殊情形;(b)光滑核Volterra积分方程的配置解不具任何超收敛性,其迭代配置解也只在结点…
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| 关 键 词: | 积分算子方程 连续型配置 多层校正 积分方程 |
CONTINUATION-TYPE COLLOCATION METHOD FORINTEGRAL OPERATOR EQUATIONS |
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| Hu Qi-ya.CONTINUATION-TYPE COLLOCATION METHOD FORINTEGRAL OPERATOR EQUATIONS[J].Mathematica Numerica Sinica,1998,20(3):261-266. |
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| Authors: | Hu Qi-ya |
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| Institution: | Hu Qi-ya(Institute of Mathematics Chinese Academy of Science, Beijing) |
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| Abstract: | In this paper we discuss the continuous piecewise polynomial spline collocation method for a kind of integral operator equations, which include smooth kernel Fredholm equations and Volterra equations as well as Green's kernel integral equations. It will be shown that the collocation solution itself may admit an ideal error expansion at the knots. Based on this expanison, the multilevel corrected global estimates can be obtained by using the "higher order interpolation" technique. |
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| Keywords: | integral operator equation continuation-type collocation multilevel correction |
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