Construction and optimization of predictions on the basis of first degree recurrence splines. (Russian ;English)
Sib. Zh. Vychisl. Mat. 13, No. 2, 227-241 (2010); translation in Numer. Analysis Appl. 3, No. 2, 186-198 (2010).
1
Nonlinear differential equations: Parametric identification by exact polynomial spline schemes. (English)
Autom. Remote Control 58, No.5, Pt. 1, 756-764 (1997); translation from Avtom. Telemekh. 1997, No.5, 53-63 (1997).
2
The theory of spline-schemes and its applications. (English)
Chuvakov, V. P. (ed.), Current problems of modern mathematics. Collection of scientific works. Vol. 2. Novosibirsk: NII MIOO NGU. 172-180 (1996).
3
Smooth interpolation of surfaces by second-degree parametric splines on an irregular triangular grid. (English)
Comput. Math. Math. Phys. 32, No.5, 701-705 (1992); translation from Zh. Vychisl. Mat. Mat. Fiz. 32, No.5, 802-807 (1992).
4
On the local approximation by parabolic splines. (Russian)
Vychisl. Sist. 81, 48-54 (1979).
5
Local approximation by linear splines of two variables. (Russian)
Vychisl. Sist. 75, 23-35 (1978).
6
On local approximation by splines of first degree. (Russian)
Vychisl. Sist. 75, 16-22 (1978).
7
Interpolation by cubic spline functions on analogous computers. (Russian)
Vychisl. Sist. 72, 69-73 (1977).
8
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