Singular sets in noncollapsed Ricci flow limit spaces

Abstract

In this paper, we study the singular set S of a noncollapsed Ricci flow limit space, arising as the pointed Gromov--Hausdorff limit of a sequence of closed Ricci flows with uniformly bounded entropy. The singular set S admits a natural stratification: equation* S0 ⊂ S1 ⊂ ·s ⊂ Sn-2= S, equation* where a point z ∈ Sk if and only if no tangent flow at z is (k+1)-symmetric. In general, the Minkowski dimension of Sk with respect to the spacetime distance is at most k. We show that the subset Skqc ⊂ Sk, consisting of points where some tangent flow is given by a standard cylinder or its quotient, is parabolic k-rectifiable. In dimension four, we prove the stronger statement that each stratum Sk is parabolic k-rectifiable for k ∈ \0, 1, 2\. Furthermore, we establish a sharp uniform H2-volume bound for S and show that, up to a set of H2-measure zero, the tangent flow at any point in S is backward unique. In addition, we derive L1-curvature bounds for four-dimensional closed Ricci flows. As an application, we resolve Perelman's bounded diameter conjecture for three-dimensional closed Ricci flows.

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