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**d73e4a2afcfbd6402c11716877e8f7466f309ef4**authored by Dominique Makowski on**22 October 2020, 13:40:02 UTC**, committed by cran-robot on**22 October 2020, 13:40:02 UTC****1 parent**1b89ec8

bayesfactor_models.Rd

```
% Generated by roxygen2: do not edit by hand
% Please edit documentation in R/bayesfactor_models.R
\name{bayesfactor_models}
\alias{bayesfactor_models}
\alias{bf_models}
\title{Bayes Factors (BF) for model comparison}
\usage{
bayesfactor_models(..., denominator = 1, verbose = TRUE)
bf_models(..., denominator = 1, verbose = TRUE)
}
\arguments{
\item{...}{Fitted models (see details), all fit on the same data, or a single \code{BFBayesFactor} object (see 'Details').}
\item{denominator}{Either an integer indicating which of the models to use as the denominator,
or a model to be used as a denominator. Ignored for \code{BFBayesFactor}.}
\item{verbose}{Toggle off warnings.}
}
\value{
A data frame containing the models' formulas (reconstructed fixed and random effects) and their BFs, that prints nicely.
}
\description{
This function computes or extracts Bayes factors from fitted models.
\cr \cr
The \code{bf_*} function is an alias of the main function.
}
\details{
If the passed models are supported by \pkg{insight} the DV of all models will be tested for equality
(else this is assumed to be true), and the models' terms will be extracted (allowing for follow-up
analysis with \code{bayesfactor_inclusion}).
\itemize{
\item For \code{brmsfit} or \code{stanreg} models, Bayes factors are computed using the \CRANpkg{bridgesampling} package.
\itemize{
\item \code{brmsfit} models must have been fitted with \code{save_pars = save_pars(all = TRUE)}.
\item \code{stanreg} models must have been fitted with a defined \code{diagnostic_file}.
}
\item For \code{BFBayesFactor}, \code{bayesfactor_models()} is mostly a wraparound \code{BayesFactor::extractBF()}.
\item For all other model types (supported by \CRANpkg{insight}), BIC approximations are used to compute Bayes factors.
}
In order to correctly and precisely estimate Bayes factors, a rule of thumb
are the 4 P's: \strong{P}roper \strong{P}riors and \strong{P}lentiful
\strong{P}osteriors. How many? The number of posterior samples needed for
testing is substantially larger than for estimation (the default of 4000
samples may not be enough in many cases). A conservative rule of thumb is to
obtain 10 times more samples than would be required for estimation
(\cite{Gronau, Singmann, & Wagenmakers, 2017}). If less than 40,000 samples
are detected, \code{bayesfactor_models()} gives a warning.
\cr \cr
A Bayes factor greater than 1 can be interpreted as evidence against the
compared-to model (the denominator). One convention is that a Bayes factor
greater than 3 can be considered as "substantial" evidence against the
denominator model (and vice versa, a Bayes factor smaller than 1/3 indicates
substantial evidence in favor of the denominator model) (\cite{Wetzels et al.
2011}).
\cr \cr
See also \href{https://easystats.github.io/bayestestR/articles/bayes_factors.html}{the Bayes factors vignette}.
}
\note{
There is also a \href{https://easystats.github.io/see/articles/bayestestR.html}{\code{plot()}-method} implemented in the \href{https://easystats.github.io/see/}{\pkg{see}-package}.
}
\examples{
# With lm objects:
# ----------------
lm1 <- lm(Sepal.Length ~ 1, data = iris)
lm2 <- lm(Sepal.Length ~ Species, data = iris)
lm3 <- lm(Sepal.Length ~ Species + Petal.Length, data = iris)
lm4 <- lm(Sepal.Length ~ Species * Petal.Length, data = iris)
bayesfactor_models(lm1, lm2, lm3, lm4, denominator = 1)
bayesfactor_models(lm2, lm3, lm4, denominator = lm1) # same result
bayesfactor_models(lm1, lm2, lm3, lm4, denominator = lm1) # same result
\dontrun{
# With lmerMod objects:
# ---------------------
if (require("lme4")) {
lmer1 <- lmer(Sepal.Length ~ Petal.Length + (1 | Species), data = iris)
lmer2 <- lmer(Sepal.Length ~ Petal.Length + (Petal.Length | Species), data = iris)
lmer3 <- lmer(
Sepal.Length ~ Petal.Length + (Petal.Length | Species) + (1 | Petal.Width),
data = iris
)
bayesfactor_models(lmer1, lmer2, lmer3, denominator = 1)
bayesfactor_models(lmer1, lmer2, lmer3, denominator = lmer1)
}
# rstanarm models
# ---------------------
# (note that a unique diagnostic_file MUST be specified in order to work)
if (require("rstanarm")) {
stan_m0 <- stan_glm(Sepal.Length ~ 1,
data = iris,
family = gaussian(),
diagnostic_file = file.path(tempdir(), "df0.csv")
)
stan_m1 <- stan_glm(Sepal.Length ~ Species,
data = iris,
family = gaussian(),
diagnostic_file = file.path(tempdir(), "df1.csv")
)
stan_m2 <- stan_glm(Sepal.Length ~ Species + Petal.Length,
data = iris,
family = gaussian(),
diagnostic_file = file.path(tempdir(), "df2.csv")
)
bayesfactor_models(stan_m1, stan_m2, denominator = stan_m0)
}
# brms models
# --------------------
# (note the save_pars MUST be set to save_pars(all = TRUE) in order to work)
if (require("brms")) {
brm1 <- brm(Sepal.Length ~ 1, data = iris, save_all_pars = TRUE)
brm2 <- brm(Sepal.Length ~ Species, data = iris, save_all_pars = TRUE)
brm3 <- brm(
Sepal.Length ~ Species + Petal.Length,
data = iris,
save_pars = save_pars(all = TRUE)
)
bayesfactor_models(brm1, brm2, brm3, denominator = 1)
}
# BayesFactor
# ---------------------------
if (require("BayesFactor")) {
data(puzzles)
BF <- anovaBF(RT ~ shape * color + ID,
data = puzzles,
whichRandom = "ID", progress = FALSE
)
BF
bayesfactor_models(BF) # basically the same
}
}
}
\references{
\itemize{
\item Gronau, Q. F., Singmann, H., & Wagenmakers, E. J. (2017). Bridgesampling: An R package for estimating normalizing constants. arXiv preprint arXiv:1710.08162.
\item Kass, R. E., and Raftery, A. E. (1995). Bayes Factors. Journal of the American Statistical Association, 90(430), 773-795.
\item Robert, C. P. (2016). The expected demise of the Bayes factor. Journal of Mathematical Psychology, 72, 33–37.
\item Wagenmakers, E. J. (2007). A practical solution to the pervasive problems of p values. Psychonomic bulletin & review, 14(5), 779-804.
\item Wetzels, R., Matzke, D., Lee, M. D., Rouder, J. N., Iverson, G. J., and Wagenmakers, E.-J. (2011). Statistical Evidence in Experimental Psychology: An Empirical Comparison Using 855 t Tests. Perspectives on Psychological Science, 6(3), 291–298. \doi{10.1177/1745691611406923}
}
}
\author{
Mattan S. Ben-Shachar
}
```

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