A numerical differentiation method based on legendre expansion with super order Tikhonov regularization

Zhao Zhenyu; You Lei

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A numerical differentiation method based on legendre expansion with super order Tikhonov regularization

机译：基于Legendre扩展的数值分化方法与超级秩序Tikhonov规范化

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The aim of this paper is to develop a method based on Legendre expansion to compute numerical derivatives of a function from its perturbed data. The Tikhonov regularization combined with a new penalty term is used to deal with the ill posed-ness of the problem. It has been shown that the solution process is uniform for various smoothness of functions. Moreover, the convergence rates can be obtained self-adaptively when we choose the regularization parameter by a discrepancy principle. Numerical tests show that the method gives good results. (C) 2020 Elsevier Inc. All rights reserved.

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来源
《Applied mathematics and computation》 |2021年第1期|共11页
作者
Zhao Zhenyu; You Lei;
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作者单位

Shandong Univ Technol Sch Math &

Stat Zibo 255049 Peoples R China;

Guangdong Ocean Univ Fac Math &

Comp Sci Zhanjiang 524088 Peoples R China;

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原文格式 PDF
正文语种 eng
中图分类数值分析;
关键词
Numerical differentiation; Ill posed problem; Super order Tikhonov regularization; Legendre approximation; Discrepancy principle;

机译：数值微分;不适定问题;超阶Tikhonov正则化;勒让德近似;差异原则;

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4. Numerical differentiation by a Tikhonov regularization method based on the discrete cosine transform [J] . Bang Hu, Shuai Lu Applicable Analysis . 2012,第3a4期

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A numerical differentiation method based on legendre expansion with super order Tikhonov regularization

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