On the Gromov-Hausdorff limits of Tori with Ricci conditions

Abstract

Let n≥ 4. In this paper, we construct a sequence of smooth Riemannian metrics gi on Rn such that: (1) gi = g Euc outside the standard Euclidean unit ball B1 (0) ⊂ Rn , (2) Ricgi ≥ - and diam ( B1 (0) ,gi ) ≤ D for some ,D>0 independent of i, (3) The pointed Gromov-Hausdorff limit of (Rn ,gi) is a topological orbifold but not a topological manifold. As a consequence, for n≥ 4, we can find a sequence of tori (Tn , gi ) with Ricci lower bound and diameter bound such that the Gromov-Hausdorff limit is not a topological manifold. This answers a question of Bru\`e-Naber-Semola [arXiv:2307.03824] in the negative. In 4-dimensional case, we prove that the Gromov-Hausdorff limit of tori with 2-side Ricci bound and diameter bound is always a topological torus. In the K\"ahler case, the Gromov-Hausdorff limit of K\"ahler tori of real dimension 4 with Ricci lower bound is always a topological orbifold with isolated singularities, and the only type of singularities is R4 / Q8 .