English

Higher topological complexity of a map

Algebraic Topology 2023-03-24 v2

Abstract

The higher topological complexity of a space XX, TCr(X)\text{TC}_r(X), r=2,3,r=2,3,\ldots, and the topological complexity of a map ff, TC(f)\text{TC}(f), 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~ff, TCr,s(f)\text{TC}_{r,s}(f), for 1sr21\leq s\leq r\geq2, which simultaneously extends Rudyak's and Pave\v{s}i\'{c}'s notions. Our unified concept is relevant in the rr-multitasking motion planning problem associated to a robot devise when the forward kinematics map plays a role in ss prescribed stages of the motion task. We study the homotopy invariance and the behavior of TCr,s\text{TC}_{r,s} under products and compositions of maps, as well as the dependence of TCr,s\text{TC}_{r,s} on rr and ss. We draw general estimates for TCr,s(f ⁣:XY)\text{TC}_{r,s}(f\colon X\to Y) in terms of categorical invariants associated to XX, YY and ff. In particular, we describe within one the value of TCr,s\text{TC}_{r,s} in the case of the non-trivial double covering over real projective spaces, as well as for their complex counterparts.

Keywords

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

R2 v1 2026-06-28T07:24:25.236Z