Analyzing censored variables usually requires the use of optimization algorithms. This package provides an alternative algebraic approach to the task of determining the expected value of a random censored variable with a known censoring point. Likewise this approach allows for the determination of the censoring point if the expected value is known. These results are derived under the assumption that the variable follows an Epanechnikov kernel distribution with known mean and range prior to censoring. Statistical functions related to the uncensored Epanechnikov distribution are also provided by this package.
| Version: | 1.1.1 |
| Depends: | R (≥ 3.0.0) |
| Suggests: | knitr, rmarkdown |
| Published: | 2016-02-04 |
| Author: | Mathias Borritz Milfeldt [aut, cre] |
| Maintainer: | Mathias Borritz Milfeldt <mathias at milfeldt.dk> |
| License: | LGPL-2 | LGPL-2.1 | LGPL-3 [expanded from: LGPL] |
| NeedsCompilation: | no |
| Materials: | README |
| CRAN checks: | epandist results |
| Reference manual: | epandist.pdf |
| Vignettes: |
Introduction to epandist |
| Package source: | epandist_1.1.1.tar.gz |
| Windows binaries: | r-devel: epandist_1.1.1.zip, r-release: epandist_1.1.1.zip, r-oldrel: epandist_1.1.1.zip |
| macOS binaries: | r-release: epandist_1.1.1.tgz, r-oldrel: epandist_1.1.1.tgz |
| Old sources: | epandist archive |
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