Sequential parametrized topological complexity and related invariants
Abstract
Parametrized motion planning algorithms \cite{CFW} have a high degree of universality and flexibility; they generate the motion of a robotic system under a variety of external conditions. The latter are viewed as parameters and constitute part of the input of the algorithm. The concept of sequential parametrized topological complexity is a measure of the complexity of such algorithms. It was studied in \cite{CFW, CFW2} for and in \cite{FP} for . In this paper we analyse the dependence of the complexity on an initial bundle with structure group and on its fibre viewed as a -space. Our main results estimate in terms of certain invariants of the bundle and the action on the fibre. Moreover, we also obtain estimates depending on the base and the fibre. Finally, we develop a calculus of sectional categories featuring a new invariant which plays an important role in the study of sectional category of towers of fibrations.
Cite
@article{arxiv.2209.01990,
title = {Sequential parametrized topological complexity and related invariants},
author = {Michael Farber and John Oprea},
journal= {arXiv preprint arXiv:2209.01990},
year = {2024}
}