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OverviewPMHigh Quality Content by WIKIPEDIA articles! In differential geometry, Pu's inequality is an inequality proved by Pao Ming Pu for the systole of an arbitrary Riemannian metric on the real projective plane RP2. A student of Charles Loewner's, P.M. Pu proved in a 1950 thesis (published in 1952) that every metric on the real projective plane mathbb{RP}^2 satisfies the optimal inequality operatorname{sys}^2 leq frac{pi}{2} operatorname{area}(mathbb{RP}^2), where sys is the systole. The boundary case of equality is attained precisely when the metric is of constant Gaussian curvatur Full Product DetailsAuthor: Lambert M. Surhone , Mariam T. Tennoe , Susan F. HenssonowPublisher: VDM Publishing House Imprint: VDM Publishing House Dimensions: Width: 22.90cm , Height: 0.40cm , Length: 15.20cm Weight: 0.111kg ISBN: 9786131242380ISBN 10: 6131242380 Pages: 66 Publication Date: 14 August 2010 Audience: General/trade , General Format: Paperback Publisher's Status: Active Availability: In Print This item will be ordered in for you from one of our suppliers. Upon receipt, we will promptly dispatch it out to you. For in store availability, please contact us. Table of ContentsReviewsAuthor InformationTab Content 6Author Website:Countries AvailableAll regions |