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Geometric Evolution Equations

Shu-Cheng Chang, Bennett Chow, Sun-Chin Chu, and Chang-Shou Lin, editors
Publisher: 
American Mathematical Society
Publication Date: 
2004
Number of Pages: 
235
Format: 
Paperback
Series: 
Contemporary Mathematics 367
Price: 
69.00
ISBN: 
0-8218-3361-8
Category: 
Proceedings
We do not plan to review this book.
* S. Angenent and J. Hulshof -- Singularities at $t=\infty$ in equivariant harmonic map flow
* S.-C. Chang -- Recent developments on the Calabi flow
* A. Chau -- Stability of the K„hler-Ricci flow at complete non-compact K„hler Einstein metrics
* B. Chow -- A survey of Hamilton's program for the Ricci flow on 3-manifolds
* S.-C. Chu -- Basic properties of gradient Ricci solitons
* D. Garfinkle and J. Isenberg -- Numerical studies of the behavior of Ricci flow
* P. Guan and X.-N. Ma -- Convex solutions of fully nonlinear elliptic equations in classical differential geometry
* R. Gulliver -- Density estimates for minimal surfaces and surfaces flowing by mean curvature
* D. Knopf -- An introduction to the Ricci flow neckpinch
* L. Ni -- Monotonicity and K„hler-Ricci flow
* M. Simon -- Deforming Lipschitz metrics into smooth metrics while keeping their curvature operator non-negative
* L.-F. Tam -- Liouville properties on K„hler manifolds
* D.-H. Tsai -- Expanding embedded plane curves
* M.-T. Wang -- Remarks on a class of solutions to the minimal surface system

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