Sequential gradient dynamics in real analytic Morse systems
Abstract
Let in be a compact connected -dimensional real analytic domain with boundary and be a primal navigation function; i.e. a real analytic Morse function on with a unique minimum and with minus gradient vector field of on the boundary of pointed inwards along each coordinate. Related to a robotics problem, we define a sequential hybrid process on for starting from any initial point in the interior of as follows: at each step we restrict ourselves to an affine subspace where a collection of coordinates are fixed and allow the other coordinates change along an integral curve of the projection of onto the subspace. We prove that provided each coordinate appears infinitely many times in the coordinate choices during the process, the process converges to a critical point of . That critical point is the unique minimum for a dense subset in primal navigation functions. We also present an upper bound for the total length of the trajectories close to a critical point.
Cite
@article{arxiv.1510.02133,
title = {Sequential gradient dynamics in real analytic Morse systems},
author = {Ferit Öztürk and H. Işıl Bozma},
journal= {arXiv preprint arXiv:1510.02133},
year = {2018}
}
Comments
14 pages, 3 figures