Topological Complexity is a Fibrewise L-S Category

Abstract

Topological complexity B of a space B is introduced by M. Farber to measure how much complex the space is, which is first considered on a configuration space of a motion planning of a robot arm. We also consider a stronger version B of topological complexity with an additional condition: in a robot motion planning, a motion must be stasis if the initial and the terminal states are the same. Our main goal is to show the equalities B = B+1 and B = B+1, where B=B×B is a fibrewise pointed space over B whose projection and section are given by pB=2 : B×B B the canonical projection to the second factor and sB=B : B B×B the diagonal. In addition, our method in studying fibrewise L-S category is able to treat a fibrewise space with singular fibres. Recently, we found a problem with the proof of Theorem 1.13 which states that for a fibrewise well-pointed space X over B, we have X = X and that for a locally finite simplicial complex B, we have B = B. While we still conjecture that Theorem 1.13 is true, this problem means that, at present, no proof is given to exist. Alternatively, we show the difference between two invariants X and X is at most 1 and the conjecture is true for some cases. We give further corrections mainly in the proof of Theorem 1.12.