Generalized piecewise-Hermitian interpolation

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O. G. Grushko, O. M. Litvin, A. M. Pidgornii, and V. V. Ved'ko, “An expansion formula in a neighborhood of a parallelepiped in R^m,” Dopov, Akad., Nauk URSR, Ser. A. No. 1, 15–18 (1974).
Google Scholar
W. J. Gordon and C. A. Hall, “Transfinite element methods: blending-function interpolation over arbitrary curved element domains,” Numer. Math.,21 (1973).
J. A. Marshall and A. R. Mitchell, “An exact boundary technique for improved accuracy in the finite-element method,” J. Inst. Maths. Applic.,12 (1973).
G. Birkhoff, M. H. Schultz, and R. S. Varga, “Piecewise-Hermite interpolation in one and two variables with applications to partial differential equations,” Numer. Math.,11 (1968).
P. G. Ciarlet, M. H. Schultz, and R. S. Varga, “Numerical methods of high-order accuracy for nonlinear boundary-value problems. I. One-dimensional problem,” Numer. Math.,9 (1967).
E. F. Beckenbach and R. Bellman, Inequalities, Springer-Verlag (1971).

Institute for Problems in Mechanical Engineering, Academy of Sciences of the Ukrainian SSR, USSR
O. N. Litvin & V. V. Fed'ko
Section of Industrial Water Economy VNIIVODGEO, Kharkov
O. N. Litvin & V. V. Fed'ko

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O. N. Litvin
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V. V. Fed'ko
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Translated from Ukrainskii Matematicheskii Zhurnal, Vol. 28, No. 6, pp. 812–818, November–December, 1976.

Litvin, O.N., Fed'ko, V.V. Generalized piecewise-Hermitian interpolation. Ukr Math J 28, 624–629 (1976). https://doi.org/10.1007/BF01094131

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