English

Adaptive B\'ezier Degree Reduction and Splitting for Computationally Efficient Motion Planning

Robotics 2022-01-21 v1 Computational Geometry Systems and Control Systems and Control

Abstract

As a parametric polynomial curve family, B\'ezier curves are widely used in safe and smooth motion design of intelligent robotic systems from flying drones to autonomous vehicles to robotic manipulators. In such motion planning settings, the critical features of high-order B\'ezier curves such as curve length, distance-to-collision, maximum curvature/velocity/acceleration are either numerically computed at a high computational cost or inexactly approximated by discrete samples. To address these issues, in this paper we present a novel computationally efficient approach for adaptive approximation of high-order B\'ezier curves by multiple low-order B\'ezier segments at any desired level of accuracy that is specified in terms of a B\'ezier metric. Accordingly, we introduce a new B\'ezier degree reduction method, called parameterwise matching reduction, that approximates B\'ezier curves more accurately compared to the standard least squares and Taylor reduction methods. We also propose a new B\'ezier metric, called the maximum control-point distance, that can be computed analytically, has a strong equivalence relation with other existing B\'ezier metrics, and defines a geometric relative bound between B\'ezier curves. We provide extensive numerical evidence to demonstrate the effectiveness of our proposed B\'ezier approximation approach. As a rule of thumb, based on the degree-one matching reduction error, we conclude that an nthn^\text{th}-order B\'ezier curve can be accurately approximated by 3(n1)3(n-1) quadratic and 6(n1)6(n-1) linear B\'ezier segments, which is fundamental for B\'ezier discretization.

Keywords

Cite

@article{arxiv.2201.07834,
  title  = {Adaptive B\'ezier Degree Reduction and Splitting for Computationally Efficient Motion Planning},
  author = {Ömür Arslan and Aron Tiemessen},
  journal= {arXiv preprint arXiv:2201.07834},
  year   = {2022}
}

Comments

23 pages, 13 figures, submitted to a journal publication

R2 v1 2026-06-24T08:55:44.467Z