Hypersymplectic Structures Invariant Under an Effective Circle Action

Key Points

A hypersymplectic structure can be deformed to a hyperkähler triple on compact 4-manifolds, indicating a significant structural property.
Under the effective $S^{1}$-action, we show that such a structure leads to diffeomorphic properties of the underlying 4-manifold.
This approach builds upon Donaldson's 2006 conjecture about hypersymplectic structures in four-dimensional geometry.
Findings suggest a deeper understanding of the interplay between symplectic geometry and group actions.

Abstract

Abstract A hypersymplectic structure on a 4-manifold is a triple of symplectic forms for which any non-zero linear combination is again symplectic. In 2006, Donaldson 5 conjectured that on a compact 4-manifold any hypersymplectic structure can be deformed through cohomologous hypersymplectic structures to a hyperkähler triple. We prove this under the assumption that the initial structure is invariant under an effective S^1-action. In particular, we show that the underlying 4-manifold is diffeomorphic to T^4.

Mark Helpful

Bookmark

Relay

Mark Helpful

Bookmark

Relay

Hypersymplectic Structures Invariant Under an Effective Circle Action

Key Points

Abstract

Cite This Study