Clothoid fitting and geometric Hermite subdivision

Abstract: We consider geometric Hermite subdivision for planar curves, i.e., iteratively refining an input polygon with additional tangent or normal vector information sitting in the vertices. The building block for the (nonlinear) subdivision schemes we propose is based on clothoidal averaging, i.e., averaging w.r.t. locally interpolating clothoids, which are curves of linear curvature. To this end, we derive a new strategy to approximate Hermite interpolating clothoids. We employ the proposed approach to define the ge… Show more

Non-linear Refinement of Point-Normal Data Using Conics

Non-linear Refinement of Point-Normal Data Using Conics

Geometric Hermite interpolation in $$\mathbb {R}^{n}$$ by refinements

Manoeuvring speed estimation of a lane-change system using geometric hermite interpolation