Higher topological complexity of a map
Abstract
The higher topological complexity of a space , , , and the topological complexity of a map , , have been introduced by Rudyak and Pave\v{s}i\'{c}, respectively, as natural extensions of Farber's topological complexity of a space. In this paper we introduce a notion of higher topological complexity of a map~, , for , which simultaneously extends Rudyak's and Pave\v{s}i\'{c}'s notions. Our unified concept is relevant in the -multitasking motion planning problem associated to a robot devise when the forward kinematics map plays a role in prescribed stages of the motion task. We study the homotopy invariance and the behavior of under products and compositions of maps, as well as the dependence of on and . We draw general estimates for in terms of categorical invariants associated to , and . In particular, we describe within one the value of in the case of the non-trivial double covering over real projective spaces, as well as for their complex counterparts.
Cite
@article{arxiv.2212.03441,
title = {Higher topological complexity of a map},
author = {Cesar A. Ipanaque Zapata and Jesús González},
journal= {arXiv preprint arXiv:2212.03441},
year = {2023}
}
Comments
27 pages. Improved presentation