# Estimates and monotonicity for a heat flow of isometric G2-structures

**Authors:** Sergey Grigorian

arXiv: 1904.09010 · 2019-12-18

## TL;DR

This paper studies a heat flow for G2-structures on 7-manifolds, establishing estimates, monotonicity, regularity, and convergence results towards torsion-free structures.

## Contribution

It introduces a natural energy functional on octonion sections, analyzes its heat flow, and proves convergence to torsion-free G2-structures under certain conditions.

## Key findings

- Derived derivative estimates along the flow
- Proved a monotonicity formula for the flow
- Established convergence to torsion-free G2-structures

## Abstract

Given a $7$-dimensional compact Riemannian manifold $\left( M,g\right) $ that admits $G_{2}$-structure, all the $G_{2}$-structures that are compatible with the metric $g$ are parametrized by unit sections of an octonion bundle over $M$. We define a natural energy functional on unit octonion sections and consider its associated heat flow. The critical points of this functional and flow precisely correspond to $G_{2}$-structures with divergence-free torsion. In this paper, we first derive estimates for derivatives of $V\left( t\right) $ along the flow and prove that the flow exists as long as the torsion remains bounded. We also prove a monotonicity formula and and an $\varepsilon $-regularity result for this flow. Finally, we show that within a metric class of $G_{2}$-structures that contains a torsion-free $G_{2}$-structure, under certain conditions, the flow will converge to a torsion-free $G_{2}$-structure.

## Full text

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## References

42 references — full list in the complete paper: https://tomesphere.com/paper/1904.09010/full.md

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Source: https://tomesphere.com/paper/1904.09010