English

Width and mean curvature flow

Differential Geometry 2007-06-13 v2 Analysis of PDEs Geometric Topology

Abstract

Given a Riemannian metric on a homotopy nn-sphere, sweep it out by a continuous one-parameter family of closed curves starting and ending at point curves. Pull the sweepout tight by, in a continuous way, pulling each curve as tight as possible yet preserving the sweepout. We show: Each curve in the tightened sweepout whose length is close to the length of the longest curve in the sweepout must itself be close to a closed geodesic. In particular, there are curves in the sweepout that are close to closed geodesics. Finding closed geodesics on the 2-sphere by using sweepouts goes back to Birkhoff in 1917. As an application, we bound from above, by a negative constant, the rate of change of the width for a one-parameter family of convex hypersurfaces that flows by mean curvature. The width is loosely speaking up to a constant the square of the length of the shortest closed curve needed to ``pull over'' MM. This estimate is sharp and leads to a sharp estimate for the extinction time; cf. [CM1], [CM2] where a similar bound for the rate of change for the two dimensional width is shown for homotopy 3-spheres evolving by the Ricci flow (see also Perelman).

Keywords

Cite

@article{arxiv.0705.3827,
  title  = {Width and mean curvature flow},
  author = {Tobias H. Colding and William P. Minicozzi},
  journal= {arXiv preprint arXiv:0705.3827},
  year   = {2007}
}
R2 v1 2026-06-21T08:32:12.236Z