Laplace approximations for hypergeometric functions with matrix argument
Roland W. Butler and Andrew T. A. Wood
Source: Ann. Statist. Volume 30, Number 4 (2002), 1155-1177.
Abstract
In this paper we present Laplace approximations for two functions of matrix argument: the Type I confluent hypergeometric function and the Gauss hypergeometric function. Both of these functions play an important role in distribution theory in multivariate analysis, but from a practical point of view they have proved challenging, and they have acquired a reputation for being difficult to approximate. Appealing features of the approximations we present are: (i) they are fully explicit (and simple to evaluate in practice); and (ii) typically, they have excellent numerical accuracy. The excellent numerical accuracy is demonstrated in the calculation of noncentral moments of Wilks' $\Lambda$ and the likelihood ratio statistic for testing block independence, and in the calculation of the CDF of the noncentral distribution of Wilks' $\Lambda$ via a sequential saddlepoint approximation. Relative error properties of these approximations are also studied, and it is noted that the approximations have uniformly bounded relative errors in important cases.
Primary Subjects: 62H10
Secondary Subjects: 62E17
Keywords: Confluent hypergeometric function; Gauss hypergeometric function; Laplace approximation; likelihood ratio test; matrix-argument hypergeometric function; saddlepoint approximation; sequential saddlepoint approximation; Wilks' $\Lambda$
Full-text: Open access
Links and Identifiers
Permanent link to this document: http://projecteuclid.org/euclid.aos/1031689021
Digital Object Identifier: doi:10.1214/aos/1031689021
Mathematical Reviews number (MathSciNet):
MR1926172
Zentralblatt MATH identifier:
1029.62047
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FORT COLLINS, COLORADO 80523 E-MAIL: walrus@stat.colostate.edu SCHOOL OF MATHEMATICAL SCIENCES UNIVERSITY OF NOTTINGHAM NOTTINGHAM NG7 2RD UNITED KINGDOM E-MAIL: atw@maths.nott.ac.uk
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