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- Chernoff's_distribution abstract "In probability theory, Chernoff's distribution, named after Herman Chernoff, is the probability distribution of the random variable where W is a "two-sided" Wiener process (or two-sided "Brownian motion") satisfying W(0) = 0. If then V(0, c) has density where gc has Fourier transform given by and where Ai is the Airy function. Thus fc is symmetric about 0 and the density ƒZ = ƒ1. Groeneboom (1989) shows thatwhere is the largest zero of the Airy function Ai and where .".
- Chernoff's_distribution wikiPageID "15646344".
- Chernoff's_distribution wikiPageRevisionID "585501729".
- Chernoff's_distribution hasPhotoCollection Chernoff's_distribution.
- Chernoff's_distribution subject Category:Continuous_distributions.
- Chernoff's_distribution subject Category:Probability_distributions.
- Chernoff's_distribution subject Category:Stochastic_processes.
- Chernoff's_distribution type Abstraction100002137.
- Chernoff's_distribution type Arrangement105726596.
- Chernoff's_distribution type Cognition100023271.
- Chernoff's_distribution type Concept105835747.
- Chernoff's_distribution type Content105809192.
- Chernoff's_distribution type ContinuousDistributions.
- Chernoff's_distribution type Distribution105729036.
- Chernoff's_distribution type Hypothesis105888929.
- Chernoff's_distribution type Idea105833840.
- Chernoff's_distribution type Model105890249.
- Chernoff's_distribution type PsychologicalFeature100023100.
- Chernoff's_distribution type StochasticProcess113561896.
- Chernoff's_distribution type StochasticProcesses.
- Chernoff's_distribution type Structure105726345.
- Chernoff's_distribution comment "In probability theory, Chernoff's distribution, named after Herman Chernoff, is the probability distribution of the random variable where W is a "two-sided" Wiener process (or two-sided "Brownian motion") satisfying W(0) = 0. If then V(0, c) has density where gc has Fourier transform given by and where Ai is the Airy function. Thus fc is symmetric about 0 and the density ƒZ = ƒ1. Groeneboom (1989) shows thatwhere is the largest zero of the Airy function Ai and where .".
- Chernoff's_distribution label "Chernoff's distribution".
- Chernoff's_distribution sameAs m.03nnkpg.
- Chernoff's_distribution sameAs Q5092076.
- Chernoff's_distribution sameAs Q5092076.
- Chernoff's_distribution sameAs Chernoff's_distribution.
- Chernoff's_distribution wasDerivedFrom Chernoff's_distribution?oldid=585501729.
- Chernoff's_distribution isPrimaryTopicOf Chernoff's_distribution.