Relative Topological Complexity and Configuration Spaces

Abstract

Given a space X, the topological complexity of X, denoted by TC(X), can be viewed as the minimum number of "continuous rules" needed to describe how to move between any two points in X. Given subspaces Y1 and Y2 of X, there is a "relative" version of topological complexity, denoted by TCX(Y1× Y2), in which one only considers paths starting at a point y1∈ Y1 and ending at a point y2∈ Y2, but the path from y1 to y2 can pass through any point in X. We discuss general results that provide relative analogues of well-known results concerning TC(X) before focusing on the case in which we have Y1=Y2=Cn(Y), the configuration space of n points in some space Y, and X=Cn(Y× I), the configuration space of n points in Y× I, where I denotes the interval [0,1]. Our main result shows TCCn(Y× I)(Cn(Y)× Cn(Y)) is bounded above by TC(Yn) and under certain hypotheses is bounded below by TC(Y).