OPTIMAL METHODS FOR RECOVERING MIXED DERIVATIVES OF NON-PERIODIC FUNCTIONS

Y. V. Semenova, S. G. Solodky
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Abstract

The problem of numerical differentiation for non-periodic bivariate functions is investigated. For the recovering mixed derivatives of such functions an approach on the base of truncation method is proposed. The constructed algorithms deal with Legendere polynomials, the degree of which is chosen so as to minimize the approximation error. It is established that these algorithms are order-optimal both in terms of accuracy and in the sense of the amount of Galerkin information involved.
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非周期函数混合导数的最优恢复方法
研究了非周期二元函数的数值微分问题。对于这类函数的混合导数的恢复,提出了一种基于截断法的方法。所构建的算法处理Legendere多项式,选择多项式的阶以使逼近误差最小化。这些算法在精度和涉及的伽辽金信息量方面都是有序最优的。
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