Motion Planning in Irreducible Path Spaces
Abstract
The motion of a mechanical system can be defined as a path through its configuration space. Computing such a path has a computational complexity scaling exponentially with the dimensionality of the configuration space. We propose to reduce the dimensionality of the configuration space by introducing the irreducible path --- a path having a minimal swept volume. The paper consists of three parts: In part I, we define the space of all irreducible paths and show that planning a path in the irreducible path space preserves completeness of any motion planning algorithm. In part II, we construct an approximation to the irreducible path space of a serial kinematic chain under certain assumptions. In part III, we conduct motion planning using the irreducible path space for a mechanical snake in a turbine environment, for a mechanical octopus with eight arms in a pipe system and for the sideways motion of a humanoid robot moving through a room with doors and through a hole in a wall. We demonstrate that the concept of an irreducible path can be applied to any motion planning algorithm taking curvature constraints into account.
Cite
@article{arxiv.1809.05322,
title = {Motion Planning in Irreducible Path Spaces},
author = {Andreas Orthey and Olivier Roussel and Olivier Stasse and Michel Taïx},
journal= {arXiv preprint arXiv:1809.05322},
year = {2018}
}
Comments
Robotics and Autonomous Systems, Elsevier, In press