Infinitesimal automorphisms and obstruction theory on the moduli of $L$-valued $G$-Higgs bundles

Sanghyeon Lee; Sang-Bum Yoo

arXiv:2605.13657·math.AG·May 14, 2026

Infinitesimal automorphisms and obstruction theory on the moduli of $L$-valued $G$-Higgs bundles

Sanghyeon Lee, Sang-Bum Yoo

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TL;DR

This paper computes infinitesimal automorphisms of $L$-valued $G$-Higgs bundles, establishes the moduli stack as a DM stack, and constructs an obstruction theory for surfaces, aiding the development of Vafa-Witten invariants.

Contribution

It extends automorphism computations to arbitrary reductive groups and constructs an obstruction theory for the moduli space on surfaces.

Findings

01

Moduli stack of stable $L$-valued $G$-Higgs bundles is a DM stack.

02

Constructed a symmetric perfect obstruction theory on the moduli space for surfaces.

03

Provides a foundation for defining Vafa-Witten invariants for reductive groups.

Abstract

For an arbitrary reductive group $G$ , we compute the infinitesimal automorphisms of $L$ -valued principal $G$ -Higgs bundles over a compact K\"ahler manifold $X$ , extending known results for $Ω_{X}^{1}$ -valued $G$ -Higgs bundles. Using this computation, when $G$ is semisimple and $X$ is a smooth projective variety, we show that the moduli stack of stable $L$ -valued $G$ -Higgs bundles is a Deligne-Mumford (DM) stack. Furthermore, when $X$ is a smooth projective surface and $L = K_{X}$ , we construct a symmetric perfect obstruction theory on this stable locus. We expect this will provide a foundation for defining Vafa-Witten invariants for reductive groups $G$ .

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