Rigidity results for non-K\"ahler Calabi-Yau geometries on threefolds

Abstract

We derive a canonical symmetry reduction associated to a compact non-K\"ahler Bismut-Hermitian-Einstein manifold. In real dimension 6, the transverse geometry is conformally K\"ahler, and we give a complete description in terms of a single scalar PDE for the underlying K\"ahler structure. In the case when the soliton potential is constant, we show that that the Bott-Chern number h1,1BC ≥ 2, and that equality holds if and only if the metric is Bismut-flat, and hence a quotient of either (2) × R × C or (2) × (2).