On the simplest simply connected rational homology 7-spheres that are not 2-connected

Abstract

We give a complete classification of two families of simply connected 7-manifolds: G3(Wu)-like manifolds and G3p(S5)-like manifolds for odd primes p. The former are non-spin with H2 H4 Z/2 as their only nontrivial middle homology; the latter have H2 H4 Z/p as their sole nontrivial middle homology. These manifolds attain the minimal homological complexity among simply connected rational homology 7-spheres that are not 2-connected. We prove that Milnor's λ-invariant gives a bijection from the oriented diffeomorphism classes of G3(Wu)-like manifolds onto Z/7, and each such manifold decomposes as the connected sum of a standard G3(Wu)-like manifold and a homotopy 7-sphere. Analogously, the Eells-Kuiper μ-invariant yields a bijection from the oriented diffeomorphism classes of G3p(S5)-like manifolds to Z/28, with every manifold splitting as the connected sum of a standard G3p(S5)-like manifold and a homotopy 7-sphere.