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The R package bamlss provides a modular computational framework for flexible Bayesian regression models (and beyond). The implementation follows the conceptional framework presented in Umlauf, Klein, and Zeileis (2018) and provides a modular “Lego toolbox” for setting up regression models. In this setting not only the response distribution or the regression terms are “Lego bricks” but also the estimation algorithm or the MCMC sampler.
The highlights of the package are:
Especially the last item is notable because the models in bamlss are not limited to a specific estimation algorithm but different engines can be plugged in without necessitating changes in other aspects of the model specification.
More detailed overviews and examples are provided in the articles:
The stable release version of bamlss is hosted on the Comprehensive R Archive Network (CRAN) at https://CRAN.R-project.org/package=bamlss and can be installed via
The development version of bamlss is hosted on R-Forge at https://R-Forge.R-project.org/projects/bayesr/ in a Subversion (SVN) repository. It can be installed via
This section gives a first quick overview of the functionality of the
package and demonstrates that the usual “look & feel” when using
well-established model fitting functions like glm()
is an
elementary part of bamlss, i.e., first steps and basic handling
of the package should be relatively simple. We illustrate the first
steps with bamlss using a data set taken from the
Regression Book (Fahrmeir et al.
2013) which is about prices of used VW Golf cars. The data is
loaded with
## price age kilometer tia abs sunroof
## 1 7.30 73 10 12 yes yes
## 2 3.85 115 30 20 yes no
## 3 2.95 127 43 6 no yes
## 4 4.80 104 54 25 yes yes
## 5 6.20 86 57 23 no no
## 6 5.90 74 57 25 yes no
In this example the aim is to model the price
in 1000
Euro. Using bamlss a first Bayesian linear model could be set
up by first specifying a model formula
afterwards the fully Bayesian model using MCMC simulation is estimated by
Note that the default number of iterations for the MCMC sampler is
1200, the burnin-phase is 200 and thinning is 1 (see the manual of the
default MCMC sampler sam_GMCMC()
).
The reason is that during the modeling process, users usually want to
obtain first results rather quickly. Afterwards, if a final model is
estimated the number of iterations of the sampler is usually set much
higher to get close to i.i.d. samples from the posterior distribution.
To obtain reasonable starting values for the MCMC sampler we run a
backfitting algorithm that optimizes the posterior mode. The
bamlss package uses its own family objects, which can be
specified as characters using the bamlss()
wrapper, in this case family = "gaussian"
(see also BAMLSS
Families). In addition, the package also supports all families
provided from the gamlss families.
The model summary gives
##
## Call:
## bamlss(formula = f, family = "gaussian", data = Golf)
## ---
## Family: gaussian
## Link function: mu = identity, sigma = log
## *---
## Formula mu:
## ---
## price ~ age + kilometer + tia + abs + sunroof
## -
## Parametric coefficients:
## Mean 2.5% 50% 97.5% parameters
## (Intercept) 9.333318 8.526293 9.330200 10.173709 9.311
## age -0.038461 -0.045355 -0.038341 -0.031706 -0.038
## kilometer -0.009686 -0.012547 -0.009667 -0.007061 -0.010
## tia -0.005811 -0.022870 -0.005752 0.010105 -0.005
## absyes -0.240481 -0.492048 -0.237776 -0.003060 -0.238
## sunroofyes -0.024021 -0.300878 -0.025127 0.238145 -0.010
## -
## Acceptance probability:
## Mean 2.5% 50% 97.5%
## alpha 1 1 1 1
## ---
## Formula sigma:
## ---
## sigma ~ 1
## -
## Parametric coefficients:
## Mean 2.5% 50% 97.5% parameters
## (Intercept) -0.2457 -0.3479 -0.2465 -0.1274 -0.271
## -
## Acceptance probability:
## Mean 2.5% 50% 97.5%
## alpha 0.9703 0.7652 1.0000 1
## ---
## Sampler summary:
## -
## DIC = 408.9675 logLik = -201.0372 pd = 6.8932
## runtime = 0.682
## ---
## Optimizer summary:
## -
## AICc = 409.6319 edf = 7 logLik = -197.4745
## logPost = -252.2614 nobs = 172 runtime = 0.089
indicating high acceptance rates as reported by the
alpha
parameter in the linear model output, which is a sign
of good mixing of the MCMC chains. The mixing can also be inspected
graphically by
Note, for convenience we only show the traceplots of the intercepts.
Considering significance of the estimated effects, only variables
tia
and sunroof
seem to have no effect on
price
since the credible intervals of estimated parameters
contain zero. This information can also be extracted using the
implemented confint()
method.
## 2.5% 97.5%
## mu.(Intercept) 8.52629257 10.173709336
## mu.age -0.04535461 -0.031705531
## mu.kilometer -0.01254739 -0.007060627
## mu.tia -0.02286985 0.010105028
## mu.absyes -0.49204765 -0.003060006
## mu.sunroofyes -0.30087769 0.238144948
## sigma.(Intercept) -0.34791813 -0.127380063
Since the prices cannot be negative, a possible consideration is to
use a logarithmic transformation of the response price
set.seed(111)
f <- log(price) ~ age + kilometer + tia + abs + sunroof
b2 <- bamlss(f, family = "gaussian", data = Golf)
and compare the models using the predict()
method
## [1] 0.5818444
## [1] 0.5410859
indicating that the transformation seems to improve the model fit.
Instead of using linear effects, another option would be to use
polynomial regression for covariates age
,
kilometer
and tia
. A polynomial model using
polynomials of order 3 is estimated with
set.seed(222)
f <- log(price) ~ poly(age, 3) + poly(kilometer, 3) + poly(tia, 3) + abs + sunroof
b3 <- bamlss(f, family = "gaussian", data = Golf)
Comparing the models using the DIC()
function
## DIC pd
## b2 -15.19596 6.893153
## b3 -10.78925 13.186991
suggests that the polynomial model is slightly better. The effects
can be inspected graphically, to better understand their influence on
price
. Using the polynomial model, graphical inspections
can be done using the predict()
method.
One major difference compared to other regression model
implementations is that predictions can be made for single variables,
only, where the user does not have to create a new data frame containing
all variables. For example, posterior mean estimates and 95% credible
intervals for variable age
can be obtained by
nd <- data.frame("age" = seq(min(Golf$age), max(Golf$age), length = 100))
nd$page <- predict(b3, newdata = nd, model = "mu", term = "age",
FUN = c95, intercept = FALSE)
head(nd)
## age page.2.5% page.Mean page.97.5%
## 1 65.00000 0.3085312 0.4849915 0.6592331
## 2 65.77778 0.3120472 0.4757206 0.6362999
## 3 66.55556 0.3167776 0.4663256 0.6152946
## 4 67.33333 0.3172396 0.4568109 0.5950657
## 5 68.11111 0.3201536 0.4471811 0.5742218
## 6 68.88889 0.3202023 0.4374406 0.5555146
Note that the prediction does not include the model intercept.
Similarly for variables kilometer
and tia
nd$kilometer <- seq(min(Golf$kilometer), max(Golf$kilometer), length = 100)
nd$tia <- seq(min(Golf$tia), max(Golf$tia), length = 100)
nd$pkilometer <- predict(b3, newdata = nd, model = "mu", term = "kilometer",
FUN = c95, intercept = FALSE)
nd$ptia <- predict(b3, newdata = nd, model = "mu", term = "tia",
FUN = c95, intercept = FALSE)
Here, we need to specify for which model
predictions
should be calculated, and if predictions only for variable
age
are created, argument term
needs also be
specified. Argument FUN
can be any function that should be
applied on the samples of the linear predictor. For more examples see
the documentation of the predict.bamlss()
method.
Then, the estimated effects can be visualized with
par(mfrow = c(1, 3))
ylim <- range(c(nd$page, nd$pkilometer, nd$ptia))
plot2d(page ~ age, data = nd, ylim = ylim)
plot2d(pkilometer ~ kilometer, data = nd, ylim = ylim)
plot2d(ptia ~ tia, data = nd, ylim = ylim)
The figure clearly shows the negative effect on the logarithmic
price
for variable age
and
kilometer
. The effect of tia
is not
significant according the 95% credible intervals, since the interval
always contains the zero horizontal line.
As a second startup on how to use bamlss for full
distributional regression, we illustrate the basic steps on a small
textbook example using the well-known simulated motorcycle accident data
(Silverman 1985). The data contain
measurements of the head acceleration (in \(g\), variable accel
) in a
simulated motorcycle accident, recorded in milliseconds after impact
(variable times
).
## times accel
## 1 2.4 0.0
## 2 2.6 -1.3
## 3 3.2 -2.7
## 4 3.6 0.0
## 5 4.0 -2.7
## 6 6.2 -2.7
To estimate a Gaussian location-scale model with \[ \texttt{accel} \sim \mathcal{N}(\mu = f(\texttt{times}), \log(\sigma) = f(\texttt{times})) \] we use the following model formula
where s()
is the smooth term constructor from the
mgcv (Wood 2020). Note, that
formulae are provided as list
s of formulae, i.e., each list
entry represents one parameter of the response distribution. Also note
that all smooth terms, i.e., te()
, ti()
, etc.,
are supported by bamlss. This way, it is also possible to
incorporate user defined model terms. A fully Bayesian model is the
estimated with
using the default of 1200 iterations of the MCMC sampler to obtain
first results quickly (see the documentation sam_GMCMC()
for further details on tuning parameters). Note that per default
bamlss()
uses a backfitting algorithm to compute posterior mode estimates,
afterwards these estimates are used as starting values for the MCMC
chains. The returned object is of class "bamlss"
for which
generic extractor functions like summary()
,
plot()
, predict()
, etc., are provided. For
example, the estimated effects for distribution parameters
mu
and sigma
can be visualized by
The model summary gives
##
## Call:
## bamlss(formula = f, family = "gaussian", data = mcycle)
## ---
## Family: gaussian
## Link function: mu = identity, sigma = log
## *---
## Formula mu:
## ---
## accel ~ s(times, k = 20)
## -
## Parametric coefficients:
## Mean 2.5% 50% 97.5% parameters
## (Intercept) -25.13 -29.36 -25.35 -20.34 -25.14
## -
## Acceptance probability:
## Mean 2.5% 50% 97.5%
## alpha 1 1 1 1
## -
## Smooth terms:
## Mean 2.5% 50% 97.5% parameters
## s(times).tau21 425657.47 175634.81 372121.15 914429.32 209325.2
## s(times).alpha 1.00 1.00 1.00 1.00 NA
## s(times).edf 14.24 12.64 14.22 15.97 13.6
## ---
## Formula sigma:
## ---
## sigma ~ s(times, k = 20)
## -
## Parametric coefficients:
## Mean 2.5% 50% 97.5% parameters
## (Intercept) 2.680 2.549 2.676 2.831 2.581
## -
## Acceptance probability:
## Mean 2.5% 50% 97.5%
## alpha 0.9664 0.7510 1.0000 1
## -
## Smooth terms:
## Mean 2.5% 50% 97.5% parameters
## s(times).tau21 1.458e+02 2.384e+01 1.213e+02 4.604e+02 81.406
## s(times).alpha 5.385e-01 7.903e-04 5.069e-01 1.000e+00 NA
## s(times).edf 9.415e+00 6.491e+00 9.500e+00 1.259e+01 8.675
## ---
## Sampler summary:
## -
## DIC = 1115.068 logLik = -545.2265 pd = 24.6149
## runtime = 1.946
## ---
## Optimizer summary:
## -
## AICc = 1123.881 edf = 24.2718 logLik = -531.975
## logPost = -747.4106 nobs = 133 runtime = 0.192
showing, e.g., the acceptance probabilities of the MCMC chains
(alpha
), the estimated degrees of freedom of the optimizer
and the successive sampler (edf
), the final AIC and DIC as
well as parametric model coefficients (in this case only the
intercepts). As mentioned in the first example, using MCMC involves
convergence checks of the sampled parameters. The easiest diagnostics
are traceplots
Note again that this call would show all traceplots, for convenience we
only show the plots for the intercepts. In this case, the traceplots do
not indicate convergence of the Markov chains for parameter
"mu"
. To fix this, the number of iterations can be
increased and also the burnin and thinning parameters can be adapted
(see sam_GMCMC()
).
Further inspections are the maximum autocorrelation of all parameters,
using plot.bamlss()
setting argument which = "max-acf"
, besides other
convergence diagnostics, e.g., diagnostics that are part of the
coda package (Plummer et al.
2006).
Inspecting randomized quantile residuals (Dunn and Smyth 1996) is useful for judging how well the model fits to the data
Randomized quantile residuals are the default method in bamlss, which are computed using the CDF function of the corresponding family object.
The posterior mean including 95% credible intervals for new data based on MCMC samples for parameter \(\mu\) can be computed by
nd <- data.frame("times" = seq(2.4, 57.6, length = 100))
nd$ptimes <- predict(b, newdata = nd, model = "mu", FUN = c95)
plot2d(ptimes ~ times, data = nd)
and as above in the first example, argument FUN
can be any
function, e.g., the identity()
function could be used to
calculate other statistics of the distribution, e.g., plot the estimated
densities for each iteration of the MCMC sampler for
times = 10
and times = 40
:
## Predict for the two scenarios.
nd <- data.frame("times" = c(10, 40))
ptimes <- predict(b, newdata = nd, FUN = identity, type = "parameter")
## Extract the family object.
fam <- family(b)
## Compute densities.
dens <- list("t10" = NULL, "t40" = NULL)
for(i in 1:ncol(ptimes$mu)) {
## Densities for times = 10.
par <- list(
"mu" = ptimes$mu[1, i, drop = TRUE],
"sigma" = ptimes$sigma[1, i, drop = TRUE]
)
dens$t10 <- cbind(dens$t10, fam$d(mcycle$accel, par))
## Densities for times = 40.
par <- list(
"mu" = ptimes$mu[2, i, drop = TRUE],
"sigma" = ptimes$sigma[2, i, drop = TRUE]
)
dens$t40 <- cbind(dens$t40, fam$d(mcycle$accel, par))
}
## Visualize.
par(mar = c(4.1, 4.1, 0.1, 0.1))
col <- rainbow_hcl(2, alpha = 0.01)
plot2d(dens$t10 ~ accel, data = mcycle,
col.lines = col[1], ylab = "Density")
plot2d(dens$t40 ~ accel, data = mcycle,
col.lines = col[2], add = TRUE)
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They may not be fully stable and should be used with caution. We make no claims about them.
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