Strong uniqueness and rectifiability of generalized cylindrical singularities in Ricci flow

Abstract

In this paper, we extend the results of fang2025strong, fang2025singular to generalized cylinders. More precisely, we establish a Lojasiewicz inequality for the pointed W-entropy in Ricci flow under the assumption that the geometry near the base point is close to a generalized cylinder Rk × Nn-k, where N is an Einstein manifold with obstruction of order three satisfying a suitable spectral condition. As an application, we prove the strong uniqueness of generalized cylindrical tangent flows. Furthermore, we show that the subset Skqc(N)⊂ Sk, consisting of points at which some tangent flow is given by Rk × Nn-k or its quotient, is horizontally parabolic k-rectifiable.