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AMS Response to Swets Bankruptcy Filing

The AMS will work individually with all institutions that paid for 2015 subscriptions to AMS products through Swets & Zeitlinger Group BV, prior to their announcement on September 22, 2014, to ensure that institutions receive uninterrupted access to our publications and database products. Read the full response from Associate Executive Director, Publishing Robert Harington.

Featured Publication

Turbulent Times in Mathematics: The Life of J.C. Fields and the History of the Fields Medal
Elaine McKinnon Riehm and Frances Hoffman

"This highly readable nonmathematical biographical study is a triumph of tenacity. It sheds significant light on the personal life, professional development, and lasting legacy of the foremost Canadian mathematician of his time."

--Deborah Kent, Isis, Vol. 105, No. 2 (June 2014)

Turbulent Times in Mathematics: The Life of J.C. Fields and the History of the Fields Medal
Elaine McKinnon Riehm and Frances Hoffman

"This highly readable nonmathematical biographical study is a triumph of tenacity. It sheds significant light on the personal life, professional development, and lasting legacy of the foremost Canadian mathematician of his time."

--Deborah Kent, Isis, Vol. 105, No. 2 (June 2014)

Bulletin of the AMS

Bulletin of the AMS Two-point functions and their applications in geometry
( view abstract )
Two-point functions and their applications in geometry
The maximum principle is one of the most important tools in the analysis of geometric partial differential equations. Traditionally, the maximum principle is applied to a scalar function defined on a manifold, but in recent years more sophisticated versions have emerged. One particularly interesting direction involves applying the maximum principle to functions that depend on a pair of points. This technique is particularly effective in the study of problems involving embedded surfaces.

In this survey, we first describe some foundational results on curve shortening flow and mean curvature flow. We then describe Huisken's work on the curve shortening flow where the method of two-point functions was introduced. Finally, we discuss several recent applications of that technique. These include sharp estimates for mean curvature flow as well as the proof of Lawson's 1970 conjecture concerning minimal tori in $ S^3$.



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Research Journals Spotlight
 
JAMS
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MCOM
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PROC
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BTran
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TRAN
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BProc
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ECGD
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ERT
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