The hypersymplectic flow descended from the G2-Laplacian coflow

Abstract

A conjecture of Simon Donaldson is that on a compact 4-manifold X4 one can flow from a hypersymplectic structure to a hyperk\"ahler structure while remaining in the same cohomology class. To this end the hypersymplectic flow was introduced by Fine-Yao. In this paper the notion of a positive triple on X4 is used to describe a hypersymplectic and hyperk\"ahler structure. Given a closed positive triple one can define either a closed G2 structure or a coclosed G2 structure on T3 × X4. The coclosed G2 structure is evolved under the modified G2-Laplacian coflow. The coflow descends to a flow of the positive triple on X4, which is again the Fine-Yao hypersymplectic flow.