| 插值多项式在一重积分Wiener空间下的同时逼近平均误差 |
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| 引用本文: | 许贵桥.插值多项式在一重积分Wiener空间下的同时逼近平均误差[J].中国科学:数学,2011,41(5):407-426. |
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| 作者姓名: | 许贵桥 |
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| 作者单位: | 天津师范大学数学学院, 天津300387 |
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| 基金项目: | 国家自然科学基金(批准号:10471010)资助项目 |
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| 摘 要: | 本文在加权Lp范数逼近意义下确定了基于第一类Chebyshev 结点组的Lagrange 插值多项式列在一重积分Wiener 空间下同时逼近平均误差的渐近阶. 结果显示在Lp范数逼近意义下Lagrange 插值多项式列的平均误差弱等价于相应的最佳逼近多项式列的平均误差. 同时, 当2≤p≤4 时,Lagrange 插值多项式列导数逼近的平均误差弱等价于相应的导数最佳逼近多项式列的平均误差. 作为对比, 本文也确定了相应的Hermite-Fejér 插值多项式列在一重积分Wiener空间下逼近的平均误差的渐近阶.
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| 关 键 词: | Lagrange 插值一重积分 Wiener 空间平均误差 |
The simultaneous approximation average errors for interpolation polynomials on the 1-fold integrated Wiener space |
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| XU GuiQiao.The simultaneous approximation average errors for interpolation polynomials on the 1-fold integrated Wiener space[J].Scientia Sinica Mathemation,2011,41(5):407-426. |
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| Authors: | XU GuiQiao |
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| Abstract: | For the weighted Lp-norm approximation,we determine the asymptotical order for the simultaneous approximation average errors of Lagrange interpolation sequence based on the Chebyshev nodes on the 1-fold integrated Wiener space.By our results we know that the average errors of Lagrange interpolation sequence are weakly equivalent to the average errors of the corresponding best polynomial approximation sequence for Lp-norm approximation.At the same time,the average errors of the derivative approximation by La... |
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| Keywords: | Lagrange interpolation 1-fold integrated Wiener space average error |
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