A classification of complex rank 3 vector bundles on complex projective 5-space

Abstract

Given integers a1,a2,a3, there is a complex rank 3 topological bundle on CP5 with i-th Chern class equal to ai if and only if a1,a2,a3 satisfy the Schwarzenberger condition. Provided that the Schwarzenberger condition is satisfied, we prove that the number of isomorphism classes of rank 3 bundles V on C P5 with ci(V)=ai is equal to 3 if a1 and a2 are both divisible by 3 and equal to 1 otherwise. This shows that Chern classes are incomplete invariants of topological rank 3 bundles on CP5. To address this problem, we produce a universal class in the tmf-cohomology of a Thom spectrum related to BU(3), where tmf denotes topological modular forms localized at 3. From this class and orientation data, we construct a Z/3-valued invariant of the bundles of interest and prove that our invariant separates distinct bundles with the same Chern classes.