KK-theory: Difference between revisions

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en>Mct mht
Properties: inner -> approximately inner
 
en>Wurzel33
The disambiguation is resolved by linking to "ideal" because that concept is closest to that of a C*-algebraic extension - the latter is just a self-adjoint closed ideal in a C*-algebra.
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In [[statistics]], the '''Robbins lemma''', named after [[Herbert Robbins]], states that if ''X'' is a [[random variable]] having a [[Poisson distribution]] with parameter ''&lambda;'', and ''f'' is any function for which the [[expected value]] E(''f''(''X'')) exists, then
 
: <math> \operatorname{E}(X f(X - 1)) = \lambda \operatorname{E}(f(X)). \,</math>
 
Robbins introduced this proposition while developing [[empirical Bayes method]]s.
 
[[Category:Statistical theorems]]
[[Category:Lemmas]]
[[Category:Poisson processes]]

Revision as of 15:18, 29 November 2013

In statistics, the Robbins lemma, named after Herbert Robbins, states that if X is a random variable having a Poisson distribution with parameter λ, and f is any function for which the expected value E(f(X)) exists, then

E(Xf(X1))=λE(f(X)).

Robbins introduced this proposition while developing empirical Bayes methods.