Uniqueness of convex ancient solutions to hypersurface flows

Lynch, Stephen

doi:10.1515/crelle-2022-0022

Journal Für Die Reine Und Angewandte Mathematik (Crelles Journal)

2022

DOI: 10.1515/crelle-2022-0022

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Uniqueness of convex ancient solutions to hypersurface flows

Stephen Lynch

Abstract: We show that every convex ancient solution of mean curvature flow with Type I curvature growth is either spherical, cylindrical, or planar. We then prove the corresponding statement for flows by a natural class of curvature functions which are convex or concave in the second fundamental form. Neither of these results assumes interior noncollapsing.

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Cited by 2 publications

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Ancient Solutions of Ricci Flow with Type I Curvature Growth

Lynch,

Abrego

2024

J Geom Anal

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Ancient solutions of the Ricci flow arise naturally as models for singularity formation. There has been significant progress towards the classification of such solutions under natural geometric assumptions. Nonnegatively curved solutions in dimensions 2 and 3, and uniformly PIC solutions in higher dimensions are now well understood. We consider ancient solutions of arbitrary dimension which are complete and have Type I curvature growth. We show that a simply connected, noncompact, $$\kappa $$ κ -noncollapsed Type I ancient solution with nonnegative sectional curvature necessarily splits a Euclidean factor. It follows that a $$\kappa $$ κ -noncollapsed Type I ancient solution which is weakly PIC2 is a locally symmetric space.

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Ancient Solutions of Ricci Flow with Type I Curvature Growth

Lynch,

Abrego

2024

J Geom Anal

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Collapsing and noncollapsing in convex ancient mean curvature flow

Bourni

Langford

Lynch

2023

Journal Für Die Reine Und Angewandte Mathematik (Crelles Journal)

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We provide several characterizations of collapsing and noncollapsing in convex ancient mean curvature flow, establishing in particular that collapsing occurs if and only if the flow is asymptotic to at least one Grim hyperplane. As a consequence, we rule out collapsing singularity models in ( n - 1 ) {(n-1)} -convex mean curvature flow (even when the initial datum is only immersed). Explicit counterexamples show that ( n - 1 ) {(n-1)} -convexity is optimal. We are also able to rule out collapsing singularity models for suitably pinched solutions of higher codimension.

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Uniqueness of convex ancient solutions to hypersurface flows

Cited by 2 publications

References 52 publications

Ancient Solutions of Ricci Flow with Type I Curvature Growth

Ancient Solutions of Ricci Flow with Type I Curvature Growth

Collapsing and noncollapsing in convex ancient mean curvature flow

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