Shannon information properties of the Endpoints of Record Coverage
Year
: 2008
Abstract: This paper addresses the largest and the smallest observations, at the times when a
new record of either kind (upper or lower) occurs, which are it called the current
upper and lower record, respectively. We examine the entropy properties of these
statistics, especially the difference between entropy of upper and lower bounds of
record coverage. The results are presented for some common parametric families
of distributions. Several upper and lower bounds, in terms of the entropy of parent
distribution, for the entropy of current records are obtained. It is shown that mutual
information, as well as Kullback–Leibler distance between the endpoints of record
coverage, Kullback–Leibler distance between data distribution, and current records,
are all distribution-free.
new record of either kind (upper or lower) occurs, which are it called the current
upper and lower record, respectively. We examine the entropy properties of these
statistics, especially the difference between entropy of upper and lower bounds of
record coverage. The results are presented for some common parametric families
of distributions. Several upper and lower bounds, in terms of the entropy of parent
distribution, for the entropy of current records are obtained. It is shown that mutual
information, as well as Kullback–Leibler distance between the endpoints of record
coverage, Kullback–Leibler distance between data distribution, and current records,
are all distribution-free.
Keyword(s): Kullback–Leibler distance,Mutual information,Order statistics,
Record range,Record values
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Shannon information properties of the Endpoints of Record Coverage
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| contributor author | جعفر احمدی | en |
| contributor author | معصومه فشندی | en |
| contributor author | Jafar Ahmadi | fa |
| contributor author | Massoumeh Fashandi | fa |
| date accessioned | 2020-06-06T13:24:36Z | |
| date available | 2020-06-06T13:24:36Z | |
| date issued | 2008 | |
| identifier uri | http://libsearch.um.ac.ir:80/fum/handle/fum/3353702 | |
| description abstract | This paper addresses the largest and the smallest observations, at the times when a new record of either kind (upper or lower) occurs, which are it called the current upper and lower record, respectively. We examine the entropy properties of these statistics, especially the difference between entropy of upper and lower bounds of record coverage. The results are presented for some common parametric families of distributions. Several upper and lower bounds, in terms of the entropy of parent distribution, for the entropy of current records are obtained. It is shown that mutual information, as well as Kullback–Leibler distance between the endpoints of record coverage, Kullback–Leibler distance between data distribution, and current records, are all distribution-free. | en |
| language | English | |
| title | Shannon information properties of the Endpoints of Record Coverage | en |
| type | Journal Paper | |
| contenttype | External Fulltext | |
| subject keywords | Kullback–Leibler distance | en |
| subject keywords | Mutual information | en |
| subject keywords | Order statistics | en |
| subject keywords | Record range | en |
| subject keywords | Record values | en |
| journal title | Communications in Statistics - Theory and Methods | en |
| journal title | Communications in Statistics - Theory and Methods | fa |
| pages | 481-493 | |
| journal volume | 0 | |
| journal issue | 37 | |
| identifier link | https://profdoc.um.ac.ir/paper-abstract-204068.html | |
| identifier articleid | 204068 |