Rank three instantons, representations and sutures

Abstract

We show that the knot group of any knot in any integer homology sphere admits a non-abelian representation into SU(3) such that meridians are mapped to matrices whose eigenvalues are the three distinct third roots of unity. This answers the N=3 case of a question posed by Xie and the first author. We also characterize when a PU(3)-bundle admits a flat connection. The key ingredient in the proofs is a study of the ring structure of U(3) instanton Floer homology of S1× g. In an earlier paper, Xie and the first author stated the so-called eigenvalue conjecture about this ring, and in this paper we partially resolve this conjecture. This allows us to establish a surface decomposition theorem for U(3) instanton Floer homology of sutured manifolds, and then obtain the mentioned topological applications. Along the way, we prove a structure theorem for U(3) Donaldson invariants, which is the counterpart of Kronheimer and Mrowka's structure theorem for U(2) Donaldson invariants. We also prove a non-vanishing theorem for the U(3) Donaldson invariants of symplectic manifolds.