Symplectic Calabi-Yau manifolds, minimal surfaces and the hyperbolic geometry of the conifold

TL;DR

This paper constructs new symplectic six-manifolds from four-dimensional geometry, explores their minimal surfaces, and links them to hyperbolic geometry and conifold transitions, revealing novel geometric and topological insights.

Contribution

It introduces a curvature inequality approach to construct non-Kähler symplectic six-manifolds, studies minimal surface compactness, and connects symplectic structures to hyperbolic geometry and conifold resolutions.

Findings

Constructed symplectic six-manifolds with c_1=0 and specific Betti numbers.

Proved minimal surface moduli spaces are compact under certain curvature conditions.

Identified symplectic manifolds with small resolutions of the conifold, linking hyperbolic geometry to complex geometry.

Abstract

Given an SO(3)-bundle with connection, the associated two-sphere bundle carries a natural closed 2-form. Asking that this be symplectic gives a curvature inequality first considered by Reznikov. We study this inequality in the case when the base has dimension four, with three main aims. Firstly, we use this approach to construct symplectic six-manifolds with c_1=0 which are never Kahler; e.g., we produce such manifolds with b_1=0=b_3 and also with c_2.omega <0, answering questions posed by Smith-Thomas-Yau. Examples come from Riemannian geometry, via the Levi-Civita connection on Lambda^+. The underlying six-manifold is then the twistor space and often the symplectic structure tames the Eells-Salamon twistor almost complex structure. Our second aim is to exploit this to deduce new results about minimal surfaces: if a certain curvature inequality holds, it follows that the space of minimal surfaces (with fixed topological invariants) is compactifiable; the minimal surfaces must also satisfy an adjunction inequality, unifying and generalising results of Chen--Tian. One metric satisfying the curvature inequality is hyperbolic four-space H^4. Our final aim is to show that the corresponding symplectic manifold is symplectomorphic to the small resolution of the conifold xw-yz=0 in C^4. We explain how this fits into a hyperbolic description of the conifold transition, with isometries of H^4 acting symplectomorphically on the resolution and isometries of H^3 acting biholomorphically on the smoothing.