Geometric Hermite interpolation with circular precision

Recently some G 1 Hermite-type interpolation methods using a rational parametric cubic were proposed; the methods reproduce a circular arc when the input data come from it. A G 2 Hermite-type interpolation method is now proposed which reproduces a circular arc when the input data come from it.

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

This paper considers the geometric Hermite interpolation for spacial curves by parametric quartic Bézier curve. In additon to position and tangent direction, the curvature vector is prescribed at each knot. We prove that under appropriate assumptions the interpolant exists locally with one degree of

## Construction methods are presented that generate Hermite interpolation quaternion curves on SO(3). lLvo circular curves Cl(t) and C2(t), 0 5 t 5 1, are generated that interpolate two orientations ql and q 2 , and have boundary angular velocities: Cl(0) = w1 and Ci(1) = w2, respectively. They ar