A vanishing theorem for T-branes

Abstract

We consider regular polystable Higgs pairs (E, φ) on compact complex manifolds. We show that a non-trivial Higgs field φ ∈ H0 ( End (E) KS) restricts the Ricci curvature of the manifold, generalising previous results in the literature. In particular φ must vanish for positive Ricci curvature, while for trivial canonical bundle it must be proportional to the identity. For K\"ahler surfaces, our results provide a new vanishing theorem for solutions to the Vafa--Witten equations. Moreover they constrain supersymmetric 7-brane configurations in F-theory, giving obstructions to the existence of T-branes, i.e. solutions with [φ, φ] ≠ 0. When non-trivial Higgs fields are allowed, we give a general characterisation of their structure in terms of vector bundle data, which we then illustrate in explicit examples.