The reverse Yang-Mills-Higgs flow in a neighbourhood of a critical point

TL;DR

This paper constructs solutions to the reverse Yang-Mills-Higgs flow near critical points, classifies unstable points algebraically, and relates flow lines to geometric structures like secant varieties, with applications to Higgs bundle modifications.

Contribution

It provides a novel algebraic classification of unstable points and flow lines in the reverse Yang-Mills-Higgs flow, using complex gauge group actions and filtrations.

Findings

Constructed solutions converging to critical points in the $C^ty$ topology.

Established an algebraic criterion for flow line connections between critical points.

Linked flow line structures to secant varieties of bundles and spectral curves.

Abstract

The main result of this paper is a construction of solutions to the reverse Yang-Mills-Higgs flow converging in the $C^\infty$ topology to a critical point. The construction uses only the complex gauge group action, which leads to an algebraic classification of the isomorphism classes of points in the unstable set of a critical point in terms of a filtration of the underlying Higgs bundle. Analysing the compatibility of this filtration with the Harder-Narasimhan-Seshadri double filtration gives an algebraic criterion for two critical points to be connected by a flow line. As an application, we can use this to construct Hecke modifications of Higgs bundles via the Yang-Mills-Higgs flow. When the Higgs field is zero (corresponding to the Yang-Mills flow), this criterion has a geometric interpretation in terms of secant varieties of the projectivisation of the underlying bundle inside the unstable manifold of a critical point, which gives a precise description of broken and unbroken flow lines connecting two critical points. For non-zero Higgs field, at generic critical points the analogous interpretation involves the secant varieties of the spectral curve of the Higgs bundle.