The topology of 3-dimensional Hessian manifolds
Abstract
We investigate the global topology of 3-dimensional Hessian manifolds. We prove that any compact, orientable 3-dimensional Hessian manifold is either a Hantzsche-Wendt manifold or admits the structure of a K\"ahler mapping torus. We analyze the parity of Betti numbers for compact, orientable 3-dimensional Hessian manifolds, with special focus on those of Koszul type (hyperbolic manifolds). Moreover, we show that the product of two compact, orientable, 3-dimensional Hessian manifolds of Koszul type naturally carries a K\"ahler structure. Finally, we establish that every compact, orientable, 3-dimensional Hessian manifold is a Seifert manifold with trivial Euler number, whose underlying orbifold has either vanishing or negative Euler characteristic, thus providing a complete topological classification.
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