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This article is cited in 3 scientific papers (total in 3 papers)
On reduction of equations' number for cubic splines
Cs. Török Pavol Jozef Šafárik University in Košice, Slovak Republic
Abstract:
The paper proposes a new approach for computation of cubic splines that needs two times less equations than the existing ones. The technique utilizes an unexpected approximation result between polynomials of order four and three that resembles the well known result of Chebyshev on approximating power functions $x^n$.
Keywords:
Hermit and B-splaines, calculation and smoothong.
Received: 21.03.2014
Citation:
Cs. Török, “On reduction of equations' number for cubic splines”, Matem. Mod., 26:11 (2014), 33–36
Linking options:
https://www.mathnet.ru/eng/mm3536 https://www.mathnet.ru/eng/mm/v26/i11/p33
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Abstract page: | 231 | Full-text PDF : | 106 | References: | 51 | First page: | 19 |
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