The Albanese Map of sGG Manifolds and Self-Duality of the Iwasawa Manifold

Abstract: We prove that the three-dimensional Iwasawa manifold $X$, viewed as a locally holomorphically trivial fibration by elliptic curves over its two-dimensional Albanese torus, is self-dual in the sense that the base torus identifies canonically with its dual torus under a sesquilinear duality, the Jacobian torus of $X$, while the fibre identifies with itself. To this end, we derive elements of Hodge theory for arbitrary sGG manifolds, introduced in earlier joint work of the author with L. Ugarte, to construct in an explicit way the Albanese torus and map of any sGG manifold. These definitions coincide with the classical ones in the special K\"ahler and $\partial\bar\partial$ cases. The generalisation to the larger sGG class is made necessary by the Iwasawa manifold being an sGG, non-$\partial\bar\partial$, manifold. The main result of this paper can be seen as a complement from a different perspective to the author's very recent work where a non-K\"ahler mirror symmetry of the Iwasawa manifold was emphasised. We also hope that it will suggest yet another approach to non-K\"ahler mirror symmetry for different classes of manifolds.