Open AccessSmoothness of Gaussian conditional independence models
Author(s) -
Mathias Drton,
Han Xiao
Publication year - 2010
Publication title -
contemporary mathematics - american mathematical society
Language(s) - English
Resource type - Reports
SCImago Journal Rank - 0.106
H-Index - 12
eISSN - 1098-3627
pISSN - 0271-4132
DOI - 10.1090/conm/516/10173
Subject(s) - mathematics , smoothness , conditional independence , independence (probability theory) , conditional variance , multivariate normal distribution , gaussian , covariance matrix , orthogonality , conditional probability distribution , covariance , conditional expectation , random variable , discrete mathematics , multivariate statistics , econometrics , statistics , mathematical analysis , autoregressive conditional heteroskedasticity , geometry , physics , quantum mechanics , volatility (finance)
Conditional independence in a multivariate normal (or Gaussian) distribution is characterized by the vanishing of subdeterminants of the distri- bution's covariance matrix. Gaussian conditional independence models thus correspond to algebraic subsets of the cone of positive definite matrices. For statistical inference in such models it is important to know whether or not the model contains singularities. We study this issue in models involving up to four random variables. In particular, we give examples of conditional independence relations which, despite being probabilistically representable, yield models that non-trivially decompose into a finite union of several smooth submodels.
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