Rationally 4-periodic biquotients

Abstract

An n-dimensional manifold M is said to be rationally 4-periodic if there is an element e∈ H4(M;Q) with the property that cupping with e, · e:H(M;Q)→ H + 4(M;Q) is injective for 0< ≤ M-4 and surjective when 0≤ < M-4. We classify all compact simply connected biquotients which are rationally 4-periodic. In addition, we show that if a simply connected rationally elliptic CW-complex X of dimension at least 6 is rationally 4-periodic, then the cohomology ring is either singly generated, or X is rationally homotopy equivalent to S2× HPn, S3× HPn, or S3× S3.