Topological complexity of unordered configuration spaces of certain graphs

Abstract

The unordered configuration space of n points on a graph , denoted here by UCn(), can be viewed as the space of all configurations of n unlabeled robots on a system of one-dimensional tracks, which is interpreted as a graph . The topology of these spaces is related to the number of vertices of degree greater than 2; this number is denoted by m(). We discuss a combinatorial approach to compute the topological complexity of a "discretized" version of this space, UDn(), and give results for certain classes of graphs. In the first case, we show that for a large class of graphs, as long as the number of robots is at least 2m(), then TC(UDn())=2m()+1. In the second, we show that as long as the number of robots is at most half the number of vertex-disjoint cycles in , we have TC(UDn())=2n+1.