On Singular Multivariate Normal Distribution and Its Applications
The methods of evaluating the singular multivariate normal distribution have been commonly applied even though the complete analytical proofs are not found. Recently, those evaluation methods are shown to have some errors. In this paper we present a new approach with a complete proof for evaluating...
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1996
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sg-smu-ink.soe_research-11972010-09-23T05:48:03Z On Singular Multivariate Normal Distribution and Its Applications KWONG, Koon Shing Boris, Iglewicz The methods of evaluating the singular multivariate normal distribution have been commonly applied even though the complete analytical proofs are not found. Recently, those evaluation methods are shown to have some errors. In this paper we present a new approach with a complete proof for evaluating the exact two-sided percentage points of a standardized m-variate normal distribution with a singular negative product correlation structure for m = 3 and with a singular negative equi-correlated structure for m [greater-or-equal, slanted] 3. The results are then applied to modify the existing procedures for estimating joint confidence intervals for multinomial proportions and for determining sample sizes. By extending the results from the multivariate normal distribution to the multivariate t-distribution with the corresponding singular correlation structure, we obtain the corrected two-sided exact critical values for the Analysis of Means for m = 4,5. 1996-01-01T08:00:00Z text https://ink.library.smu.edu.sg/soe_research/198 info:doi/10.1016/0167-9473(95)00050-x Research Collection School Of Economics eng Institutional Knowledge at Singapore Management University Econometrics |
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Econometrics |
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Econometrics KWONG, Koon Shing Boris, Iglewicz On Singular Multivariate Normal Distribution and Its Applications |
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The methods of evaluating the singular multivariate normal distribution have been commonly applied even though the complete analytical proofs are not found. Recently, those evaluation methods are shown to have some errors. In this paper we present a new approach with a complete proof for evaluating the exact two-sided percentage points of a standardized m-variate normal distribution with a singular negative product correlation structure for m = 3 and with a singular negative equi-correlated structure for m [greater-or-equal, slanted] 3. The results are then applied to modify the existing procedures for estimating joint confidence intervals for multinomial proportions and for determining sample sizes. By extending the results from the multivariate normal distribution to the multivariate t-distribution with the corresponding singular correlation structure, we obtain the corrected two-sided exact critical values for the Analysis of Means for m = 4,5. |
| format |
text |
| author |
KWONG, Koon Shing Boris, Iglewicz |
| author_facet |
KWONG, Koon Shing Boris, Iglewicz |
| author_sort |
KWONG, Koon Shing |
| title |
On Singular Multivariate Normal Distribution and Its Applications |
| title_short |
On Singular Multivariate Normal Distribution and Its Applications |
| title_full |
On Singular Multivariate Normal Distribution and Its Applications |
| title_fullStr |
On Singular Multivariate Normal Distribution and Its Applications |
| title_full_unstemmed |
On Singular Multivariate Normal Distribution and Its Applications |
| title_sort |
on singular multivariate normal distribution and its applications |
| publisher |
Institutional Knowledge at Singapore Management University |
| publishDate |
1996 |
| url |
https://ink.library.smu.edu.sg/soe_research/198 |
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1770569064984346624 |