Constrained interpolation with rational cubics

Explicit formulae are found that give the unique Tschirnhausen cubic that solves a geometric Hermite interpolation problem. That solution is used to create a planar G1 spline by joining segments of Tschirnhausen cubits. If the geometric Hermite data is from a smooth function, the Tschirnhausen cubic

A rational spline based on function values only was constructed in the authors' earlier works. This paper deals with the properties of the interpolation and the local control of the interpolant curves. The methods of value control, convex control and inflection-point control of the interpolation at

The construction of range restricted univariate and bivariate interpolants to gridded data is considered. We apply Gregory's rational cubic C 1 splines as well as related rational quintic C 2 splines. Assume that the lower and upper obstacles are compatible with the data set. Then the tension parame