Cancellation and homotopy rigidity of classical functors

Abstract

We first show that simply connected co-H-spaces and connected H-spaces can be uniquely decomposed into prime factors in the homotopy category of pointed p-local spaces of finite type, which is used to develop a p-local version of Gray's correspondence between homotopy types of prime co-H-spaces and homotopy types of prime H-spaces, and the split fibration which connects them as well. Further, we use the unique decomposition theorem to study the homotopy rigidity problem for classic functors. Among others, we prove that and are homotopy rigid on simply connected p-local co-H-spaces of finite type, and and are homotopy rigid on connected p-local H-spaces of finite type.