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Le_Cam's_theorem abstract "In probability theory, Le Cam's theorem, named after Lucien le Cam (1924 – 2000), is as follows.Suppose: X1, ..., Xn are independent random variables, each with a Bernoulli distribution (i.e., equal to either 0 or 1), not necessarily identically distributed. Pr(Xi = 1) = pi for i = 1, 2, 3, ... (i.e. follows a Poisson binomial distribution)ThenIn other words, the sum has approximately a Poisson distribution and the above inequality bounds the approximation error in terms of the total variation distance.By setting pi = λn/n, we see that this generalizes the usual Poisson limit theorem.".
Le_Cam's_theorem wikiPageExternalLink 1103038058.
Le_Cam's_theorem wikiPageID "2629002".
Le_Cam's_theorem wikiPageRevisionID "596739123".
Le_Cam's_theorem hasPhotoCollection Le_Cam's_theorem.
Le_Cam's_theorem title "Le Cam's Inequality".
Le_Cam's_theorem urlname "LeCamsInequality".
Le_Cam's_theorem subject Category:Probabilistic_inequalities.
Le_Cam's_theorem subject Category:Probability_theorems.
Le_Cam's_theorem subject Category:Statistical_inequalities.
Le_Cam's_theorem subject Category:Statistical_theorems.
Le_Cam's_theorem type Abstraction100002137.
Le_Cam's_theorem type Attribute100024264.
Le_Cam's_theorem type Communication100033020.
Le_Cam's_theorem type Difference104748836.
Le_Cam's_theorem type Inequality104752221.
Le_Cam's_theorem type Message106598915.
Le_Cam's_theorem type ProbabilisticInequalities.
Le_Cam's_theorem type ProbabilityTheorems.
Le_Cam's_theorem type Proposition106750804.
Le_Cam's_theorem type Quality104723816.
Le_Cam's_theorem type Statement106722453.
Le_Cam's_theorem type StatisticalInequalities.
Le_Cam's_theorem type StatisticalTheorems.
Le_Cam's_theorem type Theorem106752293.
Le_Cam's_theorem comment "In probability theory, Le Cam's theorem, named after Lucien le Cam (1924 – 2000), is as follows.Suppose: X1, ..., Xn are independent random variables, each with a Bernoulli distribution (i.e., equal to either 0 or 1), not necessarily identically distributed. Pr(Xi = 1) = pi for i = 1, 2, 3, ... (i.e.".
Le_Cam's_theorem label "Inégalité de Le Cam".
Le_Cam's_theorem label "Le Cam's theorem".
Le_Cam's_theorem sameAs Inégalité_de_Le_Cam.
Le_Cam's_theorem sameAs m.07sw0l.
Le_Cam's_theorem sameAs Q3154003.
Le_Cam's_theorem sameAs Q3154003.
Le_Cam's_theorem sameAs Le_Cam's_theorem.
Le_Cam's_theorem wasDerivedFrom Le_Cam's_theorem?oldid=596739123.
Le_Cam's_theorem isPrimaryTopicOf Le_Cam's_theorem.