Relative Topological Complexity and Configuration Spaces
Abstract
Given a space , the topological complexity of , denoted by , can be viewed as the minimum number of "continuous rules" needed to describe how to move between any two points in . Given subspaces and of , there is a "relative" version of topological complexity, denoted by , in which one only considers paths starting at a point and ending at a point , but the path from to can pass through any point in . We discuss general results that provide relative analogues of well-known results concerning before focusing on the case in which we have , the configuration space of points in some space , and , the configuration space of points in , where denotes the interval . Our main result shows is bounded above by and under certain hypotheses is bounded below by .
Cite
@article{arxiv.2108.02895,
title = {Relative Topological Complexity and Configuration Spaces},
author = {Bryan Boehnke and Steven Scheirer and Shuhang Xue},
journal= {arXiv preprint arXiv:2108.02895},
year = {2021}
}
Comments
14 pages