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京东 11.11 红包
Adam Thompson:Convexity and Huisken's Convergence Theorem
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https://www.youtube.com/watch?v=DHivXbqQFnA Australian Geometric PDE Seminar Adam Thompson explains why convexity is preserved by the Mean Curvature Flow (MCF). He then outlines Huisken's celebrated result that convex solutions to the MCF tend to become round and shrink to a point in finite time.
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Adam Thompson:The Second Fundamental Form at Singularities of MCF
Devesh Rajpal:Asymptotic Convexity in MCF——1
Devesh Rajpal:Asymptotic Convexity in MCF——2
Kyeongsu Choi:Ancient mean curvature flows and singularity analysis
Vishnu Mangalath:Gradient Estimates in Mean Curvature Flow——1
【Fields Institute】Tobias Holck Colding:Connections between geometry and PDEs
Vishnu Mangalath:The Haslhofer-Kleiner Gradient Estimate
Yong Wei:Curvature measures and volume preserving curvature flow——1
Richard Schoen:特征值极值问题的几何
Stepan Hudecek:Mean Curvature Flow with surgery——2
James Stanfield:Necks in Mean Curvature Flow
Felix Schulze:Mean curvature flow with generic initial data
Albert Wood:Singularities of Lagrangian Mean Curvature Flow——2
Camillo De Lellis:Boundary regularity of minimal surfaces
Vishnu Mangalath:Estimates for Mean Curvature Flow in R^3
时至今日人类终于认识了测地线?
Jack Thompson:Killing-Hopf Theorem
Max Hallgren:Tensor Maximum Principle——1
Stepan Hudecek:MCF for surfaces in R^3 vs hypersurfaces in higher dimensions
Panagiota Daskalopoulos:Ancient solutions to geometric flows——3
Richard Bamler:Mean curvature flow in R^3 and the Multiplicity One Conjecture——1
Jack Thompson:Ricci solitons
Richard Schoen:Einstein方程的Localizing Solutions(Positive Mass Theorem)
Wenshuai Jiang:The Nodal set along Parabolic PDEs
【CRM】Simon Brendle:Singularity models in 3D Ricci flow
微分几何速通!流形和张量场
Lucas Ambrozio:Zoll-like metrics on minimal surface theory(极小曲面理论上的Zoll类度量)
Richard Schoen:时空的一些几何性质(Positive mass theorem)
Christina Sormani:Intrinsic Flat and Gromov-Hausdorff Convergence——1
Panagiota Daskalopoulos:Ancient Solutions to Geometric Flows——1
James Stanfield:Background on differential geometry——1
Panagiota Daskalopoulos:Fully Nonlinear Geometric Flows——2
Ben Andrews:Ricci flow on surfaces
Camillo De Lellis:Harmonic Multivalued Functions(Geometric Measure Theory)——2
【CRM】Yevgeny Liokumovich:体积谱的Parametric geometric inequalities和Weyl law
Christina Sormani:Intrinsic Flat and Gromov-Hausdorff Convergence——3
微分几何速通!拓扑空间简介
Yevgeny Liokumovich:测量黎曼流形的大小和复杂性&极小曲面和Quantitative Topology——2
【CIRM】Melanie Rupflin:Singularities of Teichmüller harmonic map flow
Richard Schoen:曲面的极值特征值问题