Topological complexity of n points on a tree

Abstract

The topological complexity of a path-connected space X, denoted TC(X), can be thought of as the minimum number of continuous rules needed to describe how to move from one point in X to another. The space X is often interpreted as a configuration space in some real-life context. Here, we consider the case where X is the space of configurations of n points on a tree . We will be interested in two such configuration spaces. In the, first, denoted Cn(), the points are distinguishable, while in the second, UCn(), the points are indistinguishable. We determine TC(UCn()) for any tree and many values of n, and consequently determine TC(Cn()) for the same values of n (provided the configuration spaces are path-connected).