Classification of homogeneous almost complex 4-manifolds with non-degenerate torsion bundle

Abstract

We investigate the local and global geometry of almost complex 4-manifolds admitting non-degenerate torsion bundle. The rigidity of these structures forces a parallelizable J-adapted double cover, which imposes severe topological constraints on the underlying manifold. Exploiting this rigidity, we give a complete classification in the homogeneous setting. We show that such a manifold is diffeomorphic either to a 4-dimensional Lie group carrying an almost complex structure with non-degenerate torsion bundle, or to a product L(4,1)× R or L(4,1)× T, where L(4,1) is a lens space. We also determine exactly which real 4-dimensional Lie algebras admit such a structure. Constructively, we realize every admissible algebra by an explicit invariant structure, thereby closing the existence question in dimension 4. We also relate these structures to certain Engel structures that we call Nijenhuis--Engel, and answer the resulting existence questions in the homogeneous case.