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University proceedings. Volga region. Physical and mathematical sciences, 2009, Issue 1, Pages 25–43
(Mi ivpnz668)
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Mathematics
Optimal methods for restoring Laplace fields
I. V. Boykov, M. V. Kravchenko
Penza State University, Penza
Abstract:
In the paper considered optimal with respect to accuracy methods for approximation Laplace vector fields. For this purpuse the smooth Laplace vector fields is investigated. Introduced the new functional class $\bar{B}_{\alpha,1}(\Omega,M)$, $\Omega[-1,1]^l$, $l=1,2,...$, $M=const$. Evaluated Kolmogorov widths and Babenko widths for this class of functions. Constructed local splines and shown that this splines are optimal with respect to accuracy methods for approximation Laplace fields.
Keywords:
Laplase vector fields, elliptic equations, spline, Kolmogorov and Babenko widths, direct problems of gravity.
Citation:
I. V. Boykov, M. V. Kravchenko, “Optimal methods for restoring Laplace fields”, University proceedings. Volga region. Physical and mathematical sciences, 2009, no. 1, 25–43
Linking options:
https://www.mathnet.ru/eng/ivpnz668 https://www.mathnet.ru/eng/ivpnz/y2009/i1/p25
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