Geometry of the tt*-Toda equations I: universal centralizer and symplectic groupoids

TL;DR

This paper explores the geometry of meromorphic connections related to tt*-Toda equations, establishing a symplectic Lie groupoid structure linked to supersymmetric quantum field theories.

Contribution

It demonstrates that the universal centralizer forms a holomorphic symplectic groupoid over the Steinberg cross section, connecting Lie theory with geometric structures of tt*-Toda equations.

Findings

The space of meromorphic connections is a real symplectic Lie groupoid.

Universal centralizer is a holomorphic symplectic groupoid over the Steinberg cross section.

Connections correspond to solutions of tt*-Toda equations with Lie theoretic monodromy data.

Abstract

We investigate the geometry of a certain space of meromorphic connections with irregular singularities, and prove in particular that it is a (real) symplectic Lie groupoid. The connections have a physical meaning: they correspond to certain solutions of the topological-antitopological fusion (tt*) equations of Cecotti and Vafa, and hence to deformations of supersymmetric quantum field theories. The groupoid structure arises because we restrict ourselves to the tt* equations of Toda type, whose monodromy data has a Lie theoretic description. To obtain these results, we show first that the universal centralizer of a Lie group is a holomorphic symplectic groupoid over the Steinberg cross section.