arXiv:2001.00157 Abstract | arXiv Analytics

arXiv:2001.00157 [math.DG]Abstract References Reviews Resources

An inequality for length and volume in the complex projective plane

Published 2020-01-01Version 1

In the 1950s, Carl Loewner proved an inequality relating the shortest closed geodesics on a 2-torus to its area. Many generalisations have been developed since, by Gromov and others. We show that the shortest closed geodesic on a minimal surface S for a generic metric on CP^2 is controlled by the total volume, even though the area of S is not. We exploit the Croke-Rotman inequality, Gromov's systolic inequalities, the Kronheimer-Mrowka proof of the Thom conjecture, and White's regularity results for area minimizers.

Comments: 8 pages

Categories: math.DG, math.AP, math.GT

Subjects: 53C23, 53C22

Keywords: complex projective plane, inequality, shortest closed geodesic, whites regularity results, gromovs systolic inequalities

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arXiv:2001.00157 [math.DG]Abstract References Reviews Resources

An inequality for length and volume in the complex projective plane

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arXiv:2001.00157 [math.DG]AbstractReferencesReviewsResources

An inequality for length and volume in the complex projective plane

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arXiv:2001.00157 [math.DG]Abstract References Reviews Resources