BRIDGES Lectures: Flows of geometric structures, especially $\mathrm{G}_2$-structures

TL;DR

This paper discusses short-time existence and uniqueness of geometric flows, especially $ ext{G}_2$-structures, introducing key techniques like the DeTurck trick and surveying recent advances in the field.

Contribution

It provides a comprehensive overview of geometric flows of $ ext{G}_2$-structures, including new classification results and conditions for short-time existence and uniqueness.

Findings

Clarifies differences in STE results for $ ext{G}_2$-Laplacian flow

Classifies all heat-type flows of $ ext{G}_2$-structures

Provides conditions for STE and uniqueness using a modified DeTurck trick

Abstract

The BRIDGES meeting in gauge theory, extremal structures, and stability was held June 2024 at l'Institut d'\'Etudes Scientifiques de Carg\`ese in Corsica, organized by Daniele Faenzi, Eveline Legendre, Eric Loubeau, and Henrique S\'a Earp. The first week was a summer school consisting of four independent but related lecture series by Oscar Garc\'ia Prada, Spiro Karigiannis, Laurent Manivel, and Ruxandra Moraru. The present document consists of notes for the lecture series by Spiro Karigiannis on "Flows of geometric structures, especially $\mathrm{G}_2$-structures". Some assistance in the preparation of these notes by the author was provided by several participants of the summer school. See the Comments field for more information. The main theme is short time existence (STE) and uniqueness for geometric flows. We first introduce geometric structures on manifolds and geometric flows of such structures. We discuss some qualitative features of geometric flows, and consider the notions of strong and weak parabolicity. We focus on the Ricci flow, explaining carefully the DeTurck trick to establish short-time existence and uniqueness, an argument which we then extend to a general class of geometric flows of Riemannian metrics, previewing similar ideas for flows of $\mathrm{G}_2$-structures. Finally, we consider geometric flows of $\mathrm{G}_2$-structures. We review the basics of $\mathrm{G}_2$-geometry and survey several different geometric flows of $\mathrm{G}_2$-structures. In particular, we clarify in what sense STE results for the $\mathrm{G}_2$ Laplacian flow differ from STE results for other geometric flows. We conclude with a summary of some recent results by the author with Dwivedi and Gianniotis, including a classification of all possible heat-type flows of $\mathrm{G}_2$-structures, and a sufficient condition for such a flow to admit STE and uniqueness by a modified DeTurck trick.