Cancellation properties for exotic 4-dimensional positive scalar curvature metrics

Abstract

Ruberman constructed families \gn n ∈ N\ ⊂ R+ (M) of metrics of positive scalar curvature on certain 4-manifolds which are concordant but lie in different path components of R+ (M). We prove a cancellation result along the following lines. For each closed manifold N, there is a map N: R+ (M) R+ (M × N), well-defined up to homotopy, that takes the product with N. We prove that when N has positive dimension N takes all metrics of Ruberman's family to the same path component. This is trivial when N has a psc metric and follows from pseudoisotopy theory when (N) ≥ 3. Our proof is cobordism theoretic in nature and also applies to (N) =1,2. The proof relies on rigidity properties for the action of the diffeomorphism group on R+(L) for high-dimensional N and a calculation of π1(MTSO(4)) that we also carry out. Recently, Auckly and Ruberman exhibited examples of elements in higher homotopy groups of R+(M4) for certain M. Using the same method, we also prove that these elements lie in the kernel of the induced map (N)* on rational homotopy.