论文信息 - Lagrange and hermite interpolation by bivariate splines

Lagrange and hermite interpolation by bivariate splines

We develop methods for constructing sets of points which admit Lagrange and Hermite type interpolation by spaces of bivariate splines on rectangular and triangular partitions which are uniform, in general. These sets are generated by building up a net of lines and by placing points on these lines which satisfy interlacing properties for univariate spline spaces.

Günther Nürnberger | Th. Riessinger

[1] I. J. Schoenberg,et al. ON POLYA FREQUENCY FUNCTIONS. III. THE POSITIVITY OF TRANSLATION DETERMINANTS WITH AN APPLICATION TO THE INTERPOLATION PROBLEM BY SPLINE CURVES( , 1953 .

[2] G. Nürnberger. Approximation by Spline Functions , 1989 .

[3] Samuel Karlin,et al. Chebyshevian Spline Functions , 1966 .

[4] C. K. Chui,et al. On Location of Sample Points for Interpolation by Bivariate C1 Quadratic Splines , 1987 .

[5] L. Schumaker. Spline Functions: Basic Theory , 1981 .

[6] Gerhard Heindl,et al. Interpolation and Approximation by Piecewise Quadratic C1 — Functions of Two Variables , 1979 .