Edgeworth and Cornish Fisher expansions and confidence intervals for the distribution, density and
We show that kernel density estimates of bandwidth h=h(n)→0 satisfy the Cornish-Fisher assumption with parameter m=nh. This allows Cornish-Fisher expansions about the normal for standardized and Studentized kernel density estimates. The expansions given are formal and the conditions for existence/va...
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| Format: | Article |
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University of Bologna
2013-05-01
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| Series: | Statistica |
| Online Access: | http://rivista-statistica.unibo.it/article/view/3535 |
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doaj-ba7ba4cf4fae4d40baa674d749b9b5342020-11-24T23:49:34ZengUniversity of BolognaStatistica0390-590X1973-22012013-05-01683/428130110.6092/issn.1973-2201/35353281Edgeworth and Cornish Fisher expansions and confidence intervals for the distribution, density andChristopher S. Withers0Saralees Nadarajah1Applied Mathematics Group Industrial Research LimitedSchool of Mathematics - University of ManchesterWe show that kernel density estimates of bandwidth h=h(n)→0 satisfy the Cornish-Fisher assumption with parameter m=nh. This allows Cornish-Fisher expansions about the normal for standardized and Studentized kernel density estimates. The expansions given are formal and the conditions for existence/validity are not explored. The expansions lead to first order confidence intervals (CIs) of level 1−ω +O(n−β), where β =p/(2p+ 2) for one-sided CIs and β = p/(p+1) for two-sided CIs, where p is the order of the kernel used. The second order one- and two-sided CIs are given with β =2p/(2p+3) and β =2p/(p+2). We show how to choose the bandwidth for asymptotic optimality.http://rivista-statistica.unibo.it/article/view/3535 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Christopher S. Withers Saralees Nadarajah |
| spellingShingle |
Christopher S. Withers Saralees Nadarajah Edgeworth and Cornish Fisher expansions and confidence intervals for the distribution, density and Statistica |
| author_facet |
Christopher S. Withers Saralees Nadarajah |
| author_sort |
Christopher S. Withers |
| title |
Edgeworth and Cornish Fisher expansions and confidence intervals for the distribution, density and |
| title_short |
Edgeworth and Cornish Fisher expansions and confidence intervals for the distribution, density and |
| title_full |
Edgeworth and Cornish Fisher expansions and confidence intervals for the distribution, density and |
| title_fullStr |
Edgeworth and Cornish Fisher expansions and confidence intervals for the distribution, density and |
| title_full_unstemmed |
Edgeworth and Cornish Fisher expansions and confidence intervals for the distribution, density and |
| title_sort |
edgeworth and cornish fisher expansions and confidence intervals for the distribution, density and |
| publisher |
University of Bologna |
| series |
Statistica |
| issn |
0390-590X 1973-2201 |
| publishDate |
2013-05-01 |
| description |
We show that kernel density estimates of bandwidth h=h(n)→0 satisfy the Cornish-Fisher assumption with parameter m=nh. This allows Cornish-Fisher expansions about the normal for standardized and Studentized kernel density estimates. The expansions given are formal and the conditions for existence/validity are not explored. The expansions lead to first order confidence intervals (CIs) of level 1−ω +O(n−β), where β =p/(2p+ 2) for one-sided CIs and β = p/(p+1) for two-sided CIs, where p is the order of the kernel used. The second order one- and two-sided CIs are given with β =2p/(2p+3) and β =2p/(p+2). We show how to choose the bandwidth for asymptotic optimality. |
| url |
http://rivista-statistica.unibo.it/article/view/3535 |
| work_keys_str_mv |
AT christopherswithers edgeworthandcornishfisherexpansionsandconfidenceintervalsforthedistributiondensityand AT saraleesnadarajah edgeworthandcornishfisherexpansionsandconfidenceintervalsforthedistributiondensityand |
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