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- Bhatia–Davis_inequality abstract "In mathematics, the Bhatia–Davis inequality, named after Rajendra Bhatia and Chandler Davis, is an upper bound on the variance of any bounded probability distribution on the real line.Suppose a distribution has minimum m, maximum M, and expected value μ. Then the inequality says: Equality holds precisely if all of the probability is concentrated at the endpoints m and M.The Bhatia–Davis inequality is stronger than Popoviciu's inequality on variances.".
- Bhatia–Davis_inequality wikiPageID "24033423".
- Bhatia–Davis_inequality wikiPageRevisionID "593572762".
- Bhatia–Davis_inequality subject Category:Statistical_inequalities.
- Bhatia–Davis_inequality subject Category:Theory_of_probability_distributions.
- Bhatia–Davis_inequality comment "In mathematics, the Bhatia–Davis inequality, named after Rajendra Bhatia and Chandler Davis, is an upper bound on the variance of any bounded probability distribution on the real line.Suppose a distribution has minimum m, maximum M, and expected value μ. Then the inequality says: Equality holds precisely if all of the probability is concentrated at the endpoints m and M.The Bhatia–Davis inequality is stronger than Popoviciu's inequality on variances.".
- Bhatia–Davis_inequality label "Bhatia–Davis inequality".
- Bhatia–Davis_inequality sameAs Bhatia%E2%80%93Davis_inequality.
- Bhatia–Davis_inequality sameAs Q4901411.
- Bhatia–Davis_inequality sameAs Q4901411.
- Bhatia–Davis_inequality wasDerivedFrom Bhatia–Davis_inequality?oldid=593572762.