ib: Bias correction via iterative bootstrap
In ib: Bias Correction via Iterative Bootstrap
ib R Documentation
Bias correction via iterative bootstrap
Description
ib is used to correct the bias of a fitted model object
with the iterative bootstrap procedure.
Usage
ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...)
## S4 method for signature 'betareg'
ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...)
## S4 method for signature 'glm'
ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...)
## S4 method for signature 'lm'
ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...)
## S4 method for signature 'lmerMod'
ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...)
## S4 method for signature 'nls'
ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...)
## S4 method for signature 'vglm'
ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...)
Arguments
object
an object representing a fitted model (see 'Details').
thetastart
an optional starting value for the iterative procedure.
If NULL (default), the procedure starts at the estimates in object.
control
a list of parameters for controlling the iterative procedure
(see ibControl).
extra_param
if TRUE, the bias of estimation of extra parameters
is performed (see 'Details').
...
additional optional arguments (see 'Details').
Details
The iterative bootstrap procedure is described in
\insertCitekuk1995;textualib and further
studied by \insertCiteguerrier2019;textualib and
\insertCiteguerrier2020;textualib. The kth iteration of this
algorithm is
θ^(k)=θ^(k-1) + π - ∑ π_h(θ^(k-1)) / H
for k=1,2,… and where the sum is over h=1,…,H.
The estimate π is provided by the object.
The value π_h(θ) is a parametric bootstrap
estimate where the bootstrap sample is generated from θ
and a fixed seed (see ibControl).
The greater the parameter value H generally the better bias correction
but the more computation it requires (see ibControl).
If thetastart=NULL, the initial value of the procedure is θ^{0}=π.
The number of iterations are controlled by maxit parameter of ibControl.
By default, the method correct coefficients only. For
extra parameters, it depends on the model. These extra parameters may have
some constraints (e.g. positivity). If constraint=TRUE (see
ibControl), then a transformation from the constraint space to the
real is used for the update.
For betareg, extra_param is not available
as by default mean and precision parameters are corrected.
Currently the 'identity' link function is not supported for precision
parameters.
For glm, if extra_param=TRUE: the shape parameter for the
Gamma, the variance of the residuals in lm or
the overdispersion parameter of the negative binomial regression in glm.nb,
are also corrected. Note that the quasi families
are not supported for the moment as they have no simulation method
(see simulate). Bias correction for extra parameters
of the inverse.gaussian is not yet implemented.
For lm, if extra_param=TRUE: the variance of the residuals is
also corrected. Note that using the ib is not useful as coefficients
are already unbiased, unless one considers different
data generating mechanism such as censoring, missing values
and outliers (see ibControl).
For lmer, by default, only the fixed effects are corrected.
If extra_param=TRUE: all the random effects
(variances and correlations) and the variance
of the residuals are also corrected.
Note that using the ib is
certainly not useful with the argument REML=TRUE in
lmer as the bias of variance components is
already addressed, unless one considers different
data generating mechanism such as censoring, missing values
and outliers (see ibControl).
For nls, if extra_param=TRUE: the variance of the residuals is
also corrected.
For vglm, extra_param is currently not used.
Indeed, the philosophy of a vector generalized linear model is to
potentially model all parameters of a distribution with a linear predictor.
Hence, what would be considered as an extra parameter in glm
for instance, may already be captured by the default coefficients.
However, correcting the bias of a coefficients does not imply
that the bias of the parameter of the distribution is corrected
(by Jensen's inequality),
so we may use this feature in a future version of the package.
Note that we currently only support distributions
with a simslot (see simulate.vlm).
Value
A fitted model object of class Ib.
Author(s)
Samuel Orso
References
\insertAllCited
See Also
betareg
glm, glm.nb
lm
lmer
nls
vglm
Examples
## beta regression
library(betareg)
data("GasolineYield", package = "betareg")
## currently link.phi = "identity" is not supported
## fit_beta <- betareg(yield ~ batch + temp, data = GasolineYield)
fit_beta <- betareg(yield ~ batch + temp, link.phi = "log", data = GasolineYield)
fit_ib <- ib(fit_beta)
# precision parameter can also depend on covariates
fit_beta <- betareg(yield ~ batch + temp | temp, data = GasolineYield)
fit_ib <- ib(fit_beta)
## poisson regression
counts <- c(18,17,15,20,10,20,25,13,12)
outcome <- gl(3,1,9)
treatment <- gl(3,3)
pois_fit <- glm(counts ~ outcome + treatment, family = poisson())
fit_ib <- ib(pois_fit)
summary(fit_ib)
## Set H = 1000
## Not run:
fit_ib <- ib(pois_fit, control=list(H=1000))
summary(fit_ib)
## End(Not run)
## gamma regression
clotting <- data.frame(
u = c(5,10,15,20,30,40,60,80,100),
lot1 = c(118,58,42,35,27,25,21,19,18),
lot2 = c(69,35,26,21,18,16,13,12,12))
fit_gamma <- glm(lot2 ~ log(u), data = clotting, family = Gamma(link = "inverse"))
fit_ib <- ib(fit_gamma)
## summary(fit_ib)
## correct for shape parameter and show iterations
## Not run:
fit_ib <- ib(fit_gamma, control=list(verbose=TRUE), extra_param = TRUE)
summary(fit_ib)
## End(Not run)
## negative binomial regression
library(MASS)
fit_nb <- glm.nb(Days ~ Sex/(Age + Eth*Lrn), data = quine)
fit_ib <- ib(fit_nb)
## summary(fit_ib)
## correct for overdispersion with H=100
## Not run:
fit_ib <- ib(fit_nb, control=list(H=100), extra_param = TRUE)
summary(fit_ib)
## End(Not run)
## linear regression
fit_lm <- lm(disp ~ cyl + hp + wt, data = mtcars)
fit_ib <- ib(fit_lm)
summary(fit_ib)
## correct for variance of residuals
fit_ib <- ib(fit_lm, extra_param = TRUE)
summary(fit_ib)
## linear mixed-effects regression
library(lme4)
fit_lmm <- lmer(Reaction ~ Days + (Days | Subject), data = sleepstudy, REML = FALSE)
fit_ib <- ib(fit_lmm)
summary(fit_ib)
## correct for variances and correlation
## Not run:
fit_ib <- ib(fit_lmm, extra_param = TRUE)
summary(fit_ib)
## End(Not run)
## nonlinear regression
DNase1 <- subset(DNase, Run == 1)
fit_nls <- nls(density ~ SSlogis(log(conc), Asym, xmid, scal), data = DNase1)
fit_ib <- ib(fit_nls)
summary(fit_ib)
## student regression
library(VGAM)
tdata <- data.frame(x = runif(nn <- 1000))
tdata <- transform(tdata,
y = rt(nn, df = exp(exp(0.5 - x))))
fit_vglm <- vglm(y ~ x, studentt3, data = tdata)
fit_ib <- ib(fit_vglm)
summary(fit_ib)
ib documentation built on April 5, 2022, 1:13 a.m.
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| ib | R Documentation |
Bias correction via iterative bootstrap
Description
ib is used to correct the bias of a fitted model object
with the iterative bootstrap procedure.
Usage
ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...) ## S4 method for signature 'betareg' ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...) ## S4 method for signature 'glm' ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...) ## S4 method for signature 'lm' ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...) ## S4 method for signature 'lmerMod' ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...) ## S4 method for signature 'nls' ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...) ## S4 method for signature 'vglm' ib(object, thetastart = NULL, control = list(...), extra_param = FALSE, ...)
Arguments
object |
an |
thetastart |
an optional starting value for the iterative procedure.
If |
control |
a |
extra_param |
if |
... |
additional optional arguments (see 'Details'). |
Details
The iterative bootstrap procedure is described in \insertCitekuk1995;textualib and further studied by \insertCiteguerrier2019;textualib and \insertCiteguerrier2020;textualib. The kth iteration of this algorithm is
θ^(k)=θ^(k-1) + π - ∑ π_h(θ^(k-1)) / H
for k=1,2,… and where the sum is over h=1,…,H.
The estimate π is provided by the object.
The value π_h(θ) is a parametric bootstrap
estimate where the bootstrap sample is generated from θ
and a fixed seed (see ibControl).
The greater the parameter value H generally the better bias correction
but the more computation it requires (see ibControl).
If thetastart=NULL, the initial value of the procedure is θ^{0}=π.
The number of iterations are controlled by maxit parameter of ibControl.
By default, the method correct coefficients only. For
extra parameters, it depends on the model. These extra parameters may have
some constraints (e.g. positivity). If constraint=TRUE (see
ibControl), then a transformation from the constraint space to the
real is used for the update.
For betareg, extra_param is not available
as by default mean and precision parameters are corrected.
Currently the 'identity' link function is not supported for precision
parameters.
For glm, if extra_param=TRUE: the shape parameter for the
Gamma, the variance of the residuals in lm or
the overdispersion parameter of the negative binomial regression in glm.nb,
are also corrected. Note that the quasi families
are not supported for the moment as they have no simulation method
(see simulate). Bias correction for extra parameters
of the inverse.gaussian is not yet implemented.
For lm, if extra_param=TRUE: the variance of the residuals is
also corrected. Note that using the ib is not useful as coefficients
are already unbiased, unless one considers different
data generating mechanism such as censoring, missing values
and outliers (see ibControl).
For lmer, by default, only the fixed effects are corrected.
If extra_param=TRUE: all the random effects
(variances and correlations) and the variance
of the residuals are also corrected.
Note that using the ib is
certainly not useful with the argument REML=TRUE in
lmer as the bias of variance components is
already addressed, unless one considers different
data generating mechanism such as censoring, missing values
and outliers (see ibControl).
For nls, if extra_param=TRUE: the variance of the residuals is
also corrected.
For vglm, extra_param is currently not used.
Indeed, the philosophy of a vector generalized linear model is to
potentially model all parameters of a distribution with a linear predictor.
Hence, what would be considered as an extra parameter in glm
for instance, may already be captured by the default coefficients.
However, correcting the bias of a coefficients does not imply
that the bias of the parameter of the distribution is corrected
(by Jensen's inequality),
so we may use this feature in a future version of the package.
Note that we currently only support distributions
with a simslot (see simulate.vlm).
Value
A fitted model object of class Ib.
Author(s)
Samuel Orso
References
\insertAllCitedSee Also
betareg
glm, glm.nb
lm
lmer
nls
vglm
Examples
## beta regression
library(betareg)
data("GasolineYield", package = "betareg")
## currently link.phi = "identity" is not supported
## fit_beta <- betareg(yield ~ batch + temp, data = GasolineYield)
fit_beta <- betareg(yield ~ batch + temp, link.phi = "log", data = GasolineYield)
fit_ib <- ib(fit_beta)
# precision parameter can also depend on covariates
fit_beta <- betareg(yield ~ batch + temp | temp, data = GasolineYield)
fit_ib <- ib(fit_beta)
## poisson regression
counts <- c(18,17,15,20,10,20,25,13,12)
outcome <- gl(3,1,9)
treatment <- gl(3,3)
pois_fit <- glm(counts ~ outcome + treatment, family = poisson())
fit_ib <- ib(pois_fit)
summary(fit_ib)
## Set H = 1000
## Not run:
fit_ib <- ib(pois_fit, control=list(H=1000))
summary(fit_ib)
## End(Not run)
## gamma regression
clotting <- data.frame(
u = c(5,10,15,20,30,40,60,80,100),
lot1 = c(118,58,42,35,27,25,21,19,18),
lot2 = c(69,35,26,21,18,16,13,12,12))
fit_gamma <- glm(lot2 ~ log(u), data = clotting, family = Gamma(link = "inverse"))
fit_ib <- ib(fit_gamma)
## summary(fit_ib)
## correct for shape parameter and show iterations
## Not run:
fit_ib <- ib(fit_gamma, control=list(verbose=TRUE), extra_param = TRUE)
summary(fit_ib)
## End(Not run)
## negative binomial regression
library(MASS)
fit_nb <- glm.nb(Days ~ Sex/(Age + Eth*Lrn), data = quine)
fit_ib <- ib(fit_nb)
## summary(fit_ib)
## correct for overdispersion with H=100
## Not run:
fit_ib <- ib(fit_nb, control=list(H=100), extra_param = TRUE)
summary(fit_ib)
## End(Not run)
## linear regression
fit_lm <- lm(disp ~ cyl + hp + wt, data = mtcars)
fit_ib <- ib(fit_lm)
summary(fit_ib)
## correct for variance of residuals
fit_ib <- ib(fit_lm, extra_param = TRUE)
summary(fit_ib)
## linear mixed-effects regression
library(lme4)
fit_lmm <- lmer(Reaction ~ Days + (Days | Subject), data = sleepstudy, REML = FALSE)
fit_ib <- ib(fit_lmm)
summary(fit_ib)
## correct for variances and correlation
## Not run:
fit_ib <- ib(fit_lmm, extra_param = TRUE)
summary(fit_ib)
## End(Not run)
## nonlinear regression
DNase1 <- subset(DNase, Run == 1)
fit_nls <- nls(density ~ SSlogis(log(conc), Asym, xmid, scal), data = DNase1)
fit_ib <- ib(fit_nls)
summary(fit_ib)
## student regression
library(VGAM)
tdata <- data.frame(x = runif(nn <- 1000))
tdata <- transform(tdata,
y = rt(nn, df = exp(exp(0.5 - x))))
fit_vglm <- vglm(y ~ x, studentt3, data = tdata)
fit_ib <- ib(fit_vglm)
summary(fit_ib)
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