ALaplace: Asymmetric Laplace Distribution
In greybox: Toolbox for Model Building and Forecasting
dalaplace R Documentation
Asymmetric Laplace Distribution
Description
Density, cumulative distribution, quantile functions and random number
generation for the Asymmetric Laplace distribution with the
location parameter mu, scale and the asymmetry parameter alpha.
Usage
dalaplace(q, mu = 0, scale = 1, alpha = 0.5, log = FALSE)
palaplace(q, mu = 0, scale = 1, alpha = 0.5)
qalaplace(p, mu = 0, scale = 1, alpha = 0.5)
ralaplace(n = 1, mu = 0, scale = 1, alpha = 0.5)
Arguments
q
vector of quantiles.
mu
vector of location parameters (means).
scale
vector of scale parameters.
alpha
value of asymmetry parameter. Varies from 0 to 1.
log
if TRUE, then probabilities are returned in
logarithms.
p
vector of probabilities.
n
number of observations. Should be a single number.
Details
When mu=0 and scale=1, the Laplace distribution becomes standardized.
The distribution has the following density function:
f(x) = alpha (1-alpha) / scale exp(-(x-mu)/scale (alpha - I(x<=mu))),
where I(.) is the indicator function (equal to 1 if the condition is
satisfied and zero otherwise).
When alpha=0.5, then the distribution becomes Symmetric Laplace, where
scale = 1/2 MAE.
This distribution function aligns with the quantile estimates of
parameters (Geraci & Bottai, 2007).
Finally, both palaplace and qalaplace are returned for
the lower tail of the distribution.
Value
Depending on the function, various things are returned
(usually either vector or scalar):
-
dalaplace returns the density function value for the
provided parameters.
-
palaplace returns the value of the cumulative function
for the provided parameters.
-
qalaplace returns quantiles of the distribution. Depending
on what was provided in p, mu and scale, this
can be either a vector or a matrix, or an array.
-
ralaplace returns a vector of random variables
generated from the Laplace distribution. Depending on what was
provided in mu and scale, this can be either a vector
or a matrix or an array.
Author(s)
Ivan Svetunkov, ivan@svetunkov.ru
References
Geraci Marco, Bottai Matteo (2007). Quantile regression for
longitudinal data using the asymmetric Laplace distribution.
Biostatistics (2007), 8, 1, pp. 140-154
\Sexpr[results=rd]{tools:::Rd_expr_doi("10.1093/biostatistics/kxj039")}
Yu, K., & Zhang, J. (2005). A three-parameter asymmetric
laplace distribution and its extension. Communications in Statistics
- Theory and Methods, 34, 1867-1879.
\Sexpr[results=rd]{tools:::Rd_expr_doi("10.1080/03610920500199018")}
See Also
Distributions
Examples
x <- dalaplace(c(-100:100)/10, 0, 1, 0.2)
plot(x, type="l")
x <- palaplace(c(-100:100)/10, 0, 1, 0.2)
plot(x, type="l")
qalaplace(c(0.025,0.975), 0, c(1,2), c(0.2,0.3))
x <- ralaplace(1000, 0, 1, 0.2)
hist(x)
greybox documentation built on Sept. 16, 2023, 9:07 a.m.
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| dalaplace | R Documentation |
Asymmetric Laplace Distribution
Description
Density, cumulative distribution, quantile functions and random number generation for the Asymmetric Laplace distribution with the location parameter mu, scale and the asymmetry parameter alpha.
Usage
dalaplace(q, mu = 0, scale = 1, alpha = 0.5, log = FALSE)
palaplace(q, mu = 0, scale = 1, alpha = 0.5)
qalaplace(p, mu = 0, scale = 1, alpha = 0.5)
ralaplace(n = 1, mu = 0, scale = 1, alpha = 0.5)
Arguments
q |
vector of quantiles. |
mu |
vector of location parameters (means). |
scale |
vector of scale parameters. |
alpha |
value of asymmetry parameter. Varies from 0 to 1. |
log |
if |
p |
vector of probabilities. |
n |
number of observations. Should be a single number. |
Details
When mu=0 and scale=1, the Laplace distribution becomes standardized. The distribution has the following density function:
f(x) = alpha (1-alpha) / scale exp(-(x-mu)/scale (alpha - I(x<=mu))),
where I(.) is the indicator function (equal to 1 if the condition is satisfied and zero otherwise).
When alpha=0.5, then the distribution becomes Symmetric Laplace, where scale = 1/2 MAE.
This distribution function aligns with the quantile estimates of parameters (Geraci & Bottai, 2007).
Finally, both palaplace and qalaplace are returned for
the lower tail of the distribution.
Value
Depending on the function, various things are returned (usually either vector or scalar):
-
dalaplacereturns the density function value for the provided parameters. -
palaplacereturns the value of the cumulative function for the provided parameters. -
qalaplacereturns quantiles of the distribution. Depending on what was provided inp,muandscale, this can be either a vector or a matrix, or an array. -
ralaplacereturns a vector of random variables generated from the Laplace distribution. Depending on what was provided inmuandscale, this can be either a vector or a matrix or an array.
Author(s)
Ivan Svetunkov, ivan@svetunkov.ru
References
Geraci Marco, Bottai Matteo (2007). Quantile regression for longitudinal data using the asymmetric Laplace distribution. Biostatistics (2007), 8, 1, pp. 140-154 \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1093/biostatistics/kxj039")}
Yu, K., & Zhang, J. (2005). A three-parameter asymmetric laplace distribution and its extension. Communications in Statistics - Theory and Methods, 34, 1867-1879. \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1080/03610920500199018")}
See Also
Distributions
Examples
x <- dalaplace(c(-100:100)/10, 0, 1, 0.2)
plot(x, type="l")
x <- palaplace(c(-100:100)/10, 0, 1, 0.2)
plot(x, type="l")
qalaplace(c(0.025,0.975), 0, c(1,2), c(0.2,0.3))
x <- ralaplace(1000, 0, 1, 0.2)
hist(x)
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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