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2008

An isoperimetric inequality in the universal cover of the punctured plane

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An isoperimetric inequality in the universal cover of the punctured plane
We find the largest for which any simple closed path in the universal cover R2 \ Z2 of R2 \ Z2, equipped with the natural lifted metric from the Euclidean two dimensional plane, satisfies L() A(), where L() is the length of and A() is the area enclosed by . This generalizes a result of Schnell and Segura Gomis, and provides an alternative proof for the same isoperimetric inequality in R2 \ Z2
Noga Alon, Adi Pinchasi, Rom Pinchasi
Added 10 Dec 2010
Updated 10 Dec 2010
Type Journal
Year 2008
Where DM
Authors Noga Alon, Adi Pinchasi, Rom Pinchasi
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