A vanishing theorem for T-branes

TL;DR

This paper proves a vanishing theorem for T-branes, linking Higgs fields to Ricci curvature constraints on complex manifolds, with implications for F-theory and supersymmetric brane configurations.

Contribution

It generalizes vanishing theorems for Higgs fields on complex manifolds and applies these results to T-branes and F-theory, providing new obstructions and characterizations.

Findings

Higgs fields restrict Ricci curvature on complex manifolds.

Non-trivial Higgs fields vanish under positive Ricci curvature.

Constraints on T-branes in F-theory derived from curvature conditions.

Abstract

We consider regular polystable Higgs pairs $(E, \phi)$ on compact complex manifolds. We show that a non-trivial Higgs field $\phi \in H^0 ({\rm End} (E) \otimes K_S)$ restricts the Ricci curvature of the manifold, generalising previous results in the literature. In particular $\phi$ 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 $[\phi, \phi^\dagger] \neq 0$. 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.