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2014-09-03 (Version 1.0.0)
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*Fixed small bug in the qnhyper() function. Fixed an incorrect assignment in the dnyhper()
and the pnhyper() functions.
*Added the "EX" option for an exact method calculation in the neghypertol.int() function.
*Added the "EX" option for an exact method calculation and fixed how lower and upper bounds
were defined in the hypertol.int() function.
*Added the "YM" method to nptol.int(), which is the Young-Mathew method for improved nonparametric
tolerance intervals based on interpolated and extrapolated order statistics.
*Updated some documentation.
*Updated my contact e-mail as maintainer.
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2013-10-11 (Version 0.5.3)
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*Updated the "OCT" option in the K.factor() function to allow the user to use the degrees of
freedom option, "f".
*Fixed a bug in the bonftol.int() function. The "alpha" argument was not passed correctly to
the type of tolerance interval being calculated. Thanks to Alson Look for reporting this bug.
*Updated references.
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2012-09-23 (Version 0.5.2)
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*The mvtol.region() function was updated to include many different ways to approximate the tolerance factor for
multivariate normal data. These were mainly included for comparative purposes. The default method ("KM") is the
Krishnamoorthy-Mondal method, which was the method used in all previous versions of the 'tolerance' package.
*Fixed a bug in the K.table() function. When summarizing by "n", the wrong indexing was used, thus yielding
incorrect results.
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2012-08-28 (Version 0.5.1)
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*The functions related to Zipf-Mandelbrot distributions have been updated. The distribution functions (i.e.,
qzipfman, pzipfman, dzipfman, and rzipfman) have all been updated to be more efficient. Moreover, there were
some computational issues for extreme quantiles in these functions. Namely, negative density values would
be returned. There have been corrections for these bugs, plus I have included an interpolation procedure
when calculating very large quantities for the zeta distribution. Deleted the "exact" option in the respective functions.
*The zipftol.int function has been updated to include the changes in the distribution functions. There is
also a new argument that allows the user to specify how to handle ties. Namely, if the limit is calculated at
a category that has the same frequency as other adjacent categories, then you can either take the most extreme of those
tied categories (which would be the lowest of the tied categories for the lower limit and the highest of the tied categories
for the upper limit) or simply take the category that was estimated by the procedure. This latter approach would only be used
if there is some scientific knowledge that could basically guide the user with setting an ordinal ranking of the tied
categories.
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2012-07-19 (Version 0.5.0)
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*Added code for using a fiducial approach to estimate tolerance intervals for the function of
two binomial proportions (fidbintol.int), two Poisson rates (fidpoistol.int), and two negative binomial
proportions (fidnegbintol.int).
*Added three new options for estimating the two-sided K-factor for the normal setting: one due
to Howe, one due to Krishnamoorthy and Mathew, and one for controlling the tail probabilities.
The exact method has also been made more efficient. Also, corrected a small error in the normtol.int
function that did not allow the user to call all of the possible methods as cited in the documentation.
The K.factor() function was also vectorized to accommodate a vector of sample sizes.
*Added a function that calculates Appell's hypergeometric function of the first
kind (F1), distribution functions for the difference between two proportions (qdiffprop,
pdiffprop, ddiffprop, and rdiffprop), and code for estimating tolerance intervals for the
difference between two proportions using a fiducial-based approach (diffproptol.int).
*Condensed the Zipf, Zipf-Mandelbrot, and zeta distribution functions into
the qzipfman, pzipfman, dzipfman, and rzipfman functions. This simultaneously
corrected a minor bug in the original distribution functions of the three distributions.
Searches on any of these distributions will now point to these new functions. Future work will
likely be done on these functions to make them more efficient.
*Added distribution functions (i.e., density, cumulative distribution,
quantile, and random generation) for the negative hypergeometric
distribution.
*Added the Krishnamoorthy-Mathew approach for computing the upper tolerance bound for the 2-parameter
exponential distribution.
*Added neghypertol.int() function for calculating tolerance limits for
negative hypergeometric random variables.
*Added hypertol.int() function for calculating tolerance limits for
hypergeometric random variables.
*Added new options for how the confidence intervals for the
binomial proportions are calculated in the bintol.int function.
Specifically, the methods "PR", "PO", "CL", "CC", and "CWS" have been added,
which are for the probit transformation, Poisson parameterization,
complementary log transformation, continuity corrected large sample approach,
and continuity corrected Wilson's approach, respectively.
*Added new options for how the confidence intervals for the
Poisson rates are calculated in the poistol.int function.
Specifically, the methods "CC", "VS", "RVS", "FT", and "CSC" have been added,
which are for the continuity corrected large sample approach, the variance-
stabilization approach, the recentered variance stabilization approach, the
Freeman-Tukey method, and the continuity corrected score method, respectively.
*Completely overhauled the negbintol.int function, which was
not providing good estimates. The new version provides many
ways to estimate the negative binomial proportion confidence intervals,
similar to how the binomial and Poisson tolerance limits are constructed.
An article has also been submitted outlining the procedure.
*The use of the ppois function was misspecified for the lower
tolerance limit in the poistol.int function. This resulted in the
reported lower limit being larger by 1 value. This has been
corrected.
*Fixed the umatol.int function to allow the case of x = 0.
*Fixed a small typo in the negbintol.int documentation.
*Put maximum tolerance limits for the discrete distributions at Inf
instead of 0.
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2011-12-07 (Version 0.4.0)
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*Added negbintol.int() function for calculating tolerance limits for
negative binomial random variables.
*Updated poistol.int() to also include the score method as a way to
estimate the tolerance limits.
*Added distribution functions (i.e., density, cumulative distribution,
quantile, and random generation) for zeta, Zipf, and Zipf-Mandelbrot
distributions.
*Added zm.ll() function for estimation of the shape parameter(s) in the
zeta, Zipf, and Zipf-Mandelbrot distributions.
*Added zipftol.int() function for calculating tolerance intervals for the
zeta, Zipf, and Zipf-Mandelbrot distributions.
*Corrected bug in p2exp() and q2exp() functions.
*Corrected how the output is displayed for the nptol.int()
function when method="HM".
*Fixed rounding error in the acc.samp() function and added
clarifying text in the acc.samp() documentation.
*Fixed estimation issue in exttol.int() function. The Newton-Raphson
algorithm had an error when parameter values were relatively large.
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2011-04-03 (Version 0.3.0)
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*Changed the output for regtol.int(), nlregtol.int(),
and npregtol.int() from class "matrix" to "data.frame".
*Updated K.factor() to also include the option method="EXACT",
which does an exact calculation of two-sided k-factors
by numerically solving the necessary integral calculation.
*Reflected the new exact method for calculating the k-factors
above in the gamtol.int() and anovatol.int() functions.
*The function bonftol.int() was added to approximate two-sided
tolerance intervals that control the proportion of the population
in the tails.
*The function diffnormtol.int() was added for calculating one-sided
tolerance limits for the difference between two independent
normal random variables. An exact calculation is performed when
the variance ratio is known, while various estimation methods are
used when the variance ratio is unknown.
*Updated references.
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2010-10-07 (Version 0.2.3)
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*Corrected acc.samp() function so that the output is of class
"matrix".
*Changed the exp2tol.int() function so that it does not
automatically truncate the lower tolerance limit at 0.
*The function paretotol.int() was added to estimate tolerance
intervals for the Pareto distribution as well as the power
distribution.
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2010-07-30 (Version 0.2.2)
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*Updated references.
*Fixed minor typos in documentation.
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2010-05-16 (Version 0.2.1)
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*Started a "NEWS" file for changes in the package.
*Changed the way the k-factor for the two-sided linear and
nonlinear regression tolerance intervals are calculated. Before,
an approximation was used. A more accurate method (presented at the
bottom of p. 70 of Krishnamoorthy and Mathew (2009)) is used.
*Fixed a serious bug with the way nlregtol.int() checks that
the pseudo-design matrix is, in fact, invertible.
*The function mvregtol.region() was added to estimate multivariate
multiple linear regression tolerance factors.
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2010-05-02 (Version 0.2.0)
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*New function anovatol.int() performs tolerance interval
calculations for balanced ANOVA.
*New function np.order() performs sample size determination
for tolerance limits based on order statistics.
*New function umatol.int() performs uniformly most accurate
upper tolerance limits for the Poisson, binomial, and negative
binomial distributions.
*Updated K.factor() to also include the option method="ELL"
for the Ellison correction method.
*Updated acc.samp() to include the option RQL. Documentation
has also been updated to provide more detailed explanations of the
function's arguments.
*Updated exttol.int() to also perform calculations for the
Gumbel distribution for the maximum. Before, this function only
did calculations for the Weibull distribution and the Gumbel
distribution for the minimum.
*The portion of code for gammatol.int() when side=2 was
incorrect. It has now been corrected.
*laptol.int(), logistol.int(), uniftol.int(), and
exttol.int() all now include the option side=2 to estimate
two-sided tolerance intervals. The option simply calculates a
Bonferroni approximation for the two-sided setting.
*uniftol.int() has now been written to for the general
uniform case and not simply for the setting where the distribution
has a lower bound of 0.
*plottol() has been updated so that pch=19 is used by default
for all of the scatterplots. It also includes functionality for a
plot pertaining to output from the new anovatol.int() function.
*Fixed minor typos in the documentation (e.g., the Poisson
tolerance intervals documentation originally said ``Poison").
*Added some additional references to some of the
documentation.
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2009-06-29 (Version 0.1.0)
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*The 'tolerance' package is officially launched.