Optimal interpolation with spatial rational Pythagorean hodograph curves

02/09/2023
by   Hans-Peter Schröcker, et al.
0

Using a residuum approach, we provide a complete description of the space of the rational spatial curves of given tangent directions. The rational Pythagorean hodograph curves are obtained as a special case when the norm of the direction field is a perfect square. The basis for the curve space is given explicitly. Consequently a number of interpolation problems (G^1, C^1, C^2, C^1/G^2) in this space become linear, cusp avoidance can be encoded by linear inequalities, and optimization problems like minimal energy or optimal length are quadratic and can be solved efficiently via quadratic programming. We outline the interpolation/optimization strategy and demonstrate it on several examples.

READ FULL TEXT

Please sign up or login with your details

Forgot password? Click here to reset