Abstract
The authors propose, theoretically substantiate, and programmatically implement high-precision numerical-analytical algorithms for approximation of problems solutions in inhomogeneous media on the basis of linear polynomial operators.
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References
V. S. Deineka and I. V. Sergienko, Models and Methods to Solve Problems in Inhomogeneous Media [in Russian], Naukova Dumka, Kyiv (2001).
I. V. Sergienko, Methods of Optimization and Systems Analysis for Problems of Transcomputational Complexity [in Russian], Akademperiodika, Kyiv (2010).
V. K. Dzyadyk, Approximation Methods to Solve Differential and Integral Equations [in Russian], Naukova Dumka, Kyiv (1988).
V. I. Bilenko, K. V. Bozhonok, S. Yu. Dzyadyk, and O. B. Stelya, “Polynomial approximation of solutions of algebraically nonlinear equations of mathematical physics,” Collection of Papers of the Institute of Mathematics, NAS of Ukraine, Vol. 13, No. 3, 7–27 (2016).
V. V. Ivanov, Calculation Methods Using Computers: A Handbook [in Russian], Naukova Dumka, Kyiv (1986).
I. V. Sergienko and V. S. Deineka, “Numerical systems analysis of multicomponent distributed systems,” Cybern. Syst. Analysis, Vol. 49, No. 4, 526–540 (2013).
I. V. Sergienko, V. K. Zadiraka, and O. M. Litvin, Elements of the General Theory of Optimal Algorithms and Related Problems [in Russian], Naukova Dumka, Kyiv (2012).
I. V. Sergienko, A. N. Khimich, and M. F. Yakovlev, “Methods for obtaining reliable solutions to systems of linear algebraic equations,” Cybern. Syst. Analysis, Vol. 47, No. 1, 62–73 (2011).
M. D. Babich, V. K. Zadiraka, V. A. Lyudvichenko, and I. V. Sergienko, “On the use of computation optimization opportunities in computer technologies for applied and computational mathematics problems with prescribed quality characteristics,” Comp. Math. Math. Physics, Vol. 50, No. 12, 2166–2174 (2010).
K. I. Babenko, “Saturation phenomenon in the numerical analysis,” Doklady AN UkrSSR, Vol. 241, No. 3, 505–508 (1978).
I. P. Gavrilyuk and V. L. Makarov, Strongly Positive Operators and Numerical Algorithms without Accuracy Saturation [in Russian], Inst. Mathem. NASU (2004).
A. A. Letichevsky, O. O. Letychevskyi, V. S. Peschanenko, and A. A. Huba, “Generating symbolic traces in the insertion modeling system,” Cybern. Syst. Analysis, Vol. 51, No. 1, 5–15 (2015).
P. Ya. Polubarinova-Kochina, The Theory of Motion of Ground Waters [in Russian], Nauka, Moscow (1977).
A. A. Letichevskii, P. N. Denisenko, V. I. Bilenko, and V. A. Volkov, “Implementation of numerical-analytical approximation methods for functions defined by ordinary differential equations,” Cybern. Syst. Analysis, Vol. 33, No. 1, 85–88 (1997).
V. I. Bilenko, “An approximation method to solve the Volterra–Urysohn integral equations with polynomial nonlinearities,” Zhurn. Vych. Mat. Mat. Fiz., Vol. 29, No. 10, 1577–1581 (1989).
V. I. Bilenko, A. I. Derienko, and N. G. Kyrylakha, “Piecewise polynomial approximations of solutions of rigid problems on the basis of Dzyadyk’s approximation method,” Zhurn. Obchysl. Prykl. Matem., No. 2, 68–77 (2013).
O. B. Stelya, “Solving boundary-value problems for ordinary differential equations by means of parabolic splines,” Zhur. Obchysl. Ta Prykl. Matem., Vol. 1 (94), 91–98 (2007).
O. B. Stelya, “A modeling complex for calculation of a flow of ground waters under complex hydro-geological conditions,” Matem. Modelirovanie, Vol. 23, No. 4, 120–130 (2011).
E. V. Bozhonok, “Some existence conditions for the compact extrema of variational functionals of several variables in Sobolev space W 2 1,” Operator Theory: Advances and Applications, Vol. 190, 141–155 (2009).
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Translated from Kibernetika i Sistemnyi Analiz, No. 4, July–August, 2018, pp. 135–141.
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Bilenko, V.I., Bozhonok, K.V., Dzyadyk, S.Y. et al. Piecewise Polynomial Algorithms for the Analysis of Processes in Inhomogeneous Media. Cybern Syst Anal 54, 636–642 (2018). https://doi.org/10.1007/s10559-018-0064-6
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DOI: https://doi.org/10.1007/s10559-018-0064-6