The twisted G$_2$ equation for strong G$_2$-structures with torsion

TL;DR

This paper explores the properties of strong G$_2$-structures with torsion, investigates the twisted G$_2$ equation, and establishes non-existence results on certain compact manifolds, while identifying specific spaces where solutions do exist.

Contribution

It introduces the twisted G$_2$ equation for strong G$_2$-structures with torsion, proves non-existence on compact solvmanifolds, and classifies homogeneous spaces admitting solutions.

Findings

Invariant strong G$_2$-structures with torsion do not occur on compact non-flat solvmanifolds.

No non-trivial solutions to the twisted Calabi-Yau equation exist on certain compact solvmanifolds.

Solutions to the twisted G$_2$ equation exist on specific homogeneous spaces like $S^3 \times T^4$ and $S^3 \times S^3 \times S^1$.

Abstract

We discuss general properties of strong G$_2$-structures with torsion and we investigate the twisted G$_2$ equation, which represents the G$_2$-analogue of the twisted Calabi-Yau equation for SU$(n)$-structures introduced by Garcia-Fern\'andez - Rubio - Shahbazi - Tipler. In particular, we show that invariant strong G$_2$-structures with torsion do not occur on compact non-flat solvmanifolds. This implies the non-existence of non-trivial solutions to the twisted Calabi-Yau equation on compact solvmanifolds of dimensions $4$ and $6$. More generally, we prove that a compact, connected homogeneous space admitting invariant strong G$_2$-structures with torsion is diffeomorphic either to $S^3 \times T^4$ or to $S^3 \times S^3 \times S^1$, up to a covering, and that in both cases solutions to the twisted G$_2$ equation exist. Finally, we discuss the behavior of the homogeneous Laplacian coflow for strong G$_2$-structures with torsion on these spaces.