A NEW GENERAL-METHOD FOR CONSTRUCTING CONFIDENCE SETS IN ARBITRARY DIMENSIONS - WITH APPLICATIONS
成果类型:
Article
署名作者:
DASGUPTA, A; GHOSH, JK; ZEN, MM
署名单位:
National Cheng Kung University; Indian Statistical Institute; Indian Statistical Institute Kolkata
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/aos/1176324715
发表日期:
1995
页码:
1408-1432
关键词:
unimodality
摘要:
Let X have a star unimodal distribution P-0 on R(p). We describe a general method for constructing a star-shaped set S with the property P-0(X is an element of S) greater than or equal to 1 - alpha, where 0 < alpha < 1 is fixed. This is done by using the Camp-Meidell inequality on the Minkowski functional of an arbitrary star-shaped set S and then minimizing Lebesgue measure in order to obtain size-efficient sets. Conditions are obtained under which this method reproduces a level (high density) set. The general theory is then applied to two specific examples: set estimation of a multivariate normal mean using a multivariate t prior and classical invariant estimation of a location vector theta for a mixture model. In the Bayesian example, a number of shape properties of the posterior distribution are established in the process. These results are of independent interest as well. A computer code is available from the authors for automated application. The methods presented here permit construction of explicit confidence sets under very limited assumptions when the underlying distributions are calculationally too complex to obtain level sets.
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