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• Formation_matrix abstract "In statistics and information theory, the expected formation matrix of a likelihood function is the matrix inverse of the Fisher information matrix of , while the observed formation matrix of is the inverse of the observed information matrix of .Currently, no notation for dealing with formation matrices is widely used, but in books and articles by Ole E. Barndorff-Nielsen and Peter McCullagh, the symbol is used to denote the element of the i-th line and j-th column of the observed formation matrix. The geometric interpretation of the Fisher information matrix (metric) leads to a notation of following the notation of the (contravariant) metric tensor in differential geometry. The Fisher information metric is denoted by so that using Einstein notation we have .These matrices appear naturally in the asymptotic expansion of the distribution of many statistics related to the likelihood ratio.".
• Formation_matrix wikiPageID "6843217".
• Formation_matrix wikiPageRevisionID "596927904".
• Formation_matrix hasPhotoCollection Formation_matrix.
• Formation_matrix subject Category:Estimation_theory.
• Formation_matrix subject Category:Information_theory.
• Formation_matrix subject Category:Statistical_terminology.
• Formation_matrix comment "In statistics and information theory, the expected formation matrix of a likelihood function is the matrix inverse of the Fisher information matrix of , while the observed formation matrix of is the inverse of the observed information matrix of .Currently, no notation for dealing with formation matrices is widely used, but in books and articles by Ole E.".
• Formation_matrix label "Formation matrix".
• Formation_matrix sameAs m.0gs52v.
• Formation_matrix sameAs Q5470034.
• Formation_matrix sameAs Q5470034.
• Formation_matrix wasDerivedFrom Formation_matrix?oldid=596927904.
• Formation_matrix isPrimaryTopicOf Formation_matrix.