Additivity of the rho map on the topological structure group
arXiv:1607.07075
Abstract
Let M be an orientable topological manifold of dimension m, m greater or equal to 5, with fundamental group $Î$. Let S(M) be the topological structure set, endowed with the group structure induced by its identification with Ranicki's algebraic structure set. We prove that the (rationalized) rho map $Ï_Î: S(M)\rightarrow K_{m+1} (D^*_Î)\otimes \mathbb{Q}$ is a homomorphism of abelian groups.
Mistake found in the proof of our main theorem. Article under revision