Fields Institute Lectures 2017
Scalar Curvature and Intrinsic Flat Convergence
Fields Institute Summer School on Geometric Analysis July 2017
Professor: Christina Sormani sormanic@gmail.com
Problem Sessions: Dr. Raquel Perales and Dr. Christian Ketterer and Dr. Chen-Yun Lin
This course is based on my survey article ``Scalar Curvature and Intrinsic Flat Convergence'' which appears as a chapter in the deGruyter book series on PDE and Measure Theory edited by N. Gigli. The article has been reorganized and adapted into course notes which include exercises, but all references to conjectures and open problems should refer to this original article. For more articles on Intrinsic Flat convergence see https://sites.google.com/site/intrinsicflatconvergence/
The course notes with exercises are linked to at the bottom of this page. Videos of these lectures are available here. See also a lecture at SCGP in 2018 of Mantoulidis here also on scalar curvature and intrinsic flat convergence which surveys another side of the story.
A website with links to all papers on Intrinsic Flat convergence is available here:
https://sites.google.com/site/intrinsicflatconvergence/
Lecture I [Monday 7/17 4-5 pm] (pages 2-14)
Gromov-Hausdorff and Intrinsic Flat Convergence of Riemannian Manifolds
Lecture II [Tuesday 7/18 9-10 am] (pages 15-26)
Practical Techniques for Estimating GH and SWIF Distances
Problem Session A [Tuesday 7/18 1:30 pm ] (page 27)
Work on Exercises from Lectures I and II.
Lecture III [Wednesday 7/19 3-4 pm] (pages 28-46)
Almost Rigidity* Conjectures with Scalar Curvature
Lecture IV [Thursday 7/20 9-10 am] (pages 47-61)
Limit Spaces obtained under Intrinsic Flat Convergence
Problem Session B [Thursday 3-5 pm] (page 62)
Work on Exercises from Lecture IV with Perales
or Start a Project with Ketterer
Lecture V [Friday 7/21 10:30-11:30 am] (pages 63-72)
Compactness Theorems, Arzela-Ascoli Theorems and Limits of Points
Problem Set C [Friday 7/21 3:30-5:00 pm] (pages 73-83)
Students Break into Teams to work on one of Different Projects
*Note: The term "almost rigidity theorem" was introduced by Cheeger-Colding in their 1996 paper. In these lectures, I used the term more generally including theorems that they would call "stability theorems". Indeed Gromov also states his conjectures as "stability conjectures". I avoided the use of the word "stability" in my lectures due to confusions arising with other usages of the word stability when dealing with manifolds that have scalar curvature bounds. In April 2018, Jeff Cheeger requested that we not use the term "almost rigidity" in this new expanded way but only use it to refer to theorems in which the limit space is not predetermined (as explained in their original paper). Although the conjectures stated here and various teams listed above use the term "almost rigidity" it is best to publish your results using the term "stability" or just simply state the theorems without naming them.
Team Websites:
* Penrose Almost Rigidity on page 74
* Warped Tori Almost Rigidity on page 77
* Ricci Flow and Intrinsic Flat Convergence on page 79
* Almost Rigidity of Graphs over Tori on page 81
* Rotationally Symmetric Scalar Compactness on page 82
* Kahler Stability of PMT suggested by Xiaoxiao Li
Papers completed by the teams:
Allen, Hernandez, Parise, Payne, and Wang, “Warped Tori of Almost Nonnegative Scalar Curvature” Geometriae Dedicata Vol 200 (2019)
Jiewon Park, Wenchuan Tian, and Changliang Wang "A Compactness Theorem for rotationally symmetric Riemannian manifolds with positive scalar curvature" PAMQ Vol 14 (2018) no. 3-4.
Armando J. Cabrera Pacheco, Christian Ketterer, Raquel Perales "Stability of Graphical Tori with Almost Nonnegative Scalar Curvature" to appear in CVPDE.
Sormani was partially supported by NSF DMS #1612409