fun.theo.mv.gld: Find the theoretical first four moments of the generalised...
In GLDEX: Fitting Single and Mixture of Generalised Lambda Distributions
fun.theo.mv.gld R Documentation
Find the theoretical first four moments of the generalised lambda
distribution.
Description
Computes the "mean","variance","skewness","kurtosis" statistics from a
given generalised lambda distribution.
Usage
fun.theo.mv.gld(L1, L2, L3, L4, param, normalise="N")
Arguments
L1
Lambda 1. Or c(Lambda 1,Lambda 2,Lambda 3,Lambda 4).
L2
Lambda 2.
L3
Lambda 3.
L4
Lambda 4.
param
"rs" or "fmkl" or "fkml"
normalise
"Y" if you want kurtosis to be calculated with reference
to kurtosis = 0 under Normal distribution.
Value
A vector listing the values of mean, variance, skewness and kurtosis.
Note
Sometimes the theoretical moments may not exist, in those cases,
NA is returned.
Author(s)
Steve Su
References
Freimer, M., Mudholkar, G. S., Kollia, G. & Lin, C. T. (1988), A
study of the generalized tukey lambda family, Communications in
Statistics - Theory and Methods *17*, 3547-3567.
Gilchrist, Warren G. (2000), Statistical Modelling with Quantile
Functions, Chapman & Hall
Karian, Z.A., Dudewicz, E.J., and McDonald, P. (1996), The
extended generalized lambda distribution system for fitting
distributions to data: history, completion of theory, tables,
applications, the “Final Word” on Moment fits, Communications
in Statistics - Simulation and Computation *25*, 611-642.
Karian, Zaven A. and Dudewicz, Edward J. (2000), Fitting
statistical distributions: the Generalized Lambda Distribution and
Generalized Bootstrap methods, Chapman & Hall
See Also
fun.comp.moments.ml,
fun.comp.moments.ml.2, fun.lm.theo.gld
Examples
fun.theo.mv.gld(1, 2, 3, 4, "rs")
fun.theo.mv.gld(1, 2, 3, 4, "fmkl")
GLDEX documentation built on Aug. 21, 2023, 9:08 a.m.
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| fun.theo.mv.gld | R Documentation |
Find the theoretical first four moments of the generalised lambda distribution.
Description
Computes the "mean","variance","skewness","kurtosis" statistics from a given generalised lambda distribution.
Usage
fun.theo.mv.gld(L1, L2, L3, L4, param, normalise="N")
Arguments
L1 |
Lambda 1. Or c(Lambda 1,Lambda 2,Lambda 3,Lambda 4). |
L2 |
Lambda 2. |
L3 |
Lambda 3. |
L4 |
Lambda 4. |
param |
"rs" or "fmkl" or "fkml" |
normalise |
"Y" if you want kurtosis to be calculated with reference to kurtosis = 0 under Normal distribution. |
Value
A vector listing the values of mean, variance, skewness and kurtosis.
Note
Sometimes the theoretical moments may not exist, in those cases,
NA is returned.
Author(s)
Steve Su
References
Freimer, M., Mudholkar, G. S., Kollia, G. & Lin, C. T. (1988), A study of the generalized tukey lambda family, Communications in Statistics - Theory and Methods *17*, 3547-3567.
Gilchrist, Warren G. (2000), Statistical Modelling with Quantile Functions, Chapman & Hall
Karian, Z.A., Dudewicz, E.J., and McDonald, P. (1996), The extended generalized lambda distribution system for fitting distributions to data: history, completion of theory, tables, applications, the “Final Word” on Moment fits, Communications in Statistics - Simulation and Computation *25*, 611-642.
Karian, Zaven A. and Dudewicz, Edward J. (2000), Fitting statistical distributions: the Generalized Lambda Distribution and Generalized Bootstrap methods, Chapman & Hall
See Also
fun.comp.moments.ml,
fun.comp.moments.ml.2, fun.lm.theo.gld
Examples
fun.theo.mv.gld(1, 2, 3, 4, "rs")
fun.theo.mv.gld(1, 2, 3, 4, "fmkl")
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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