HERMITE INTERPOLATION BY PYTHAGOREAN HODOGRAPH QUINTICS

The Pythagorean hodograph (PH) curves are polynomial parametric curves {x(t),y(t)} whose hodograph (derivative) components satisfy the Pythagorean condition x'(2)(t)+y'(2)(t) = sigma(2)(t) for some polynomial sigma(t). Thus, unlike polynomial curves in general, PH curves have are lengths and offset curves that admit exact rational representations. The lowest-order PH curves that are sufficiently flexible for general interpolation/approximation problems are the quintics. While the PH quintics are capable of matching arbitrary first-order Hermite data, the solution procedure is not straightforward and furthermore does not yield a unique result-there are always four distinct interpolants (of which only one, in general, has acceptable ''shape'' characteristics). We show that formulating PH quintics as complex-valued functions of a real parameter leads to a compact Hermite interpolation algorithm and facilitates an identification of the ''good'' interpolant (in terms of minimizing the absolute rotation number). This algorithm establishes the PH quintics as a viable medium for the design or approximation of free-form curves, and allows a one-for-one substitution of PH quintics in lieu of the widely-used ''ordinary'' cubics.