This is a follow-up to the vignette “Three Ways to Test the Same Hypothesis”. A new feature, pcor_sum
, was added to BGGM that allows for testing partial correlation sums. This differs from the Bayes factor approach (“Approach #3”), in that only the posterior distribution is used to determine whether there is a difference in the sums.
# need the developmental version
if (!requireNamespace("remotes")) {
install.packages("remotes")
}
# install from github
remotes::install_github("donaldRwilliams/BGGM")
library(BGGM)
This first example looks at one group, where a sum is tested within the same ptsd network. I focus on the relations between the re-experiencing (B
) and avoidance (C
) communities. In particular, the sum of relations between the “Intrusion” (5 nodes) community and the “Avoidance” (two nodes) community is tested.
For the avoidance symptom “avoidance of thoughts” C1
, this can be written in R
code with
# ptsd
Y <- ptsd
# paste together sums
paste0(colnames(Y)[1:5], "--C1", collapse = " + ")
#> "B1--C1 + B2--C1 + B3--C1 + B4--C1 + B5--C1"
whereas, for the avoidance symptom “avoidance of reminders” (C2
), this is written as
paste0(colnames(Y)[1:5], "--C2", collapse = " + ")
#> "B1--C2 + B2--C2 + B3--C2 + B4--C2 + B5--C2"
Note that typically this would have to be written out. paste0
was used in this case to avoid typing out all of the relations.
Here an ordinal GGM is fitted
fit <- estimate(Y+1, type = "ordinal", iter = 1000)
where the +1
changes the first category from 0 to 1 (required).
The next step is to use the pcor_sum
function. First, I combine the sums into one string separated with ;
.
# sum 1
sum1 <- paste0(colnames(Y)[1:5], "--C1", collapse = " + ")
# sum 2
sum2 <- paste0(colnames(Y)[1:5], "--C2", collapse = " + ")
# paste together
sums <- paste(sum1, sum2, sep = ";")
# print
sums
#> "B1--C1 + B2--C1 + B3--C1 + B4--C1 + B5--C1;B1--C2 + B2--C2 + B3--C2 + B4--C2 + B5--C2"
Next pcor_sum
is used
test_sum <- pcor_sum(fit, relations = sums)
# print
test_sum
# BGGM: Bayesian Gaussian Graphical Models
# ---
# Network Stats: Posterior Sum
# Posterior Samples: 1000
# ---
# Estimates
#
# Sum:
# Post.mean Post.sd Cred.lb Cred.ub
# B1--C1+B2--C1+B3--C1+B4--C1+B5--C1 0.215 0.096 0.034 0.404
# B1--C2+B2--C2+B3--C2+B4--C2+B5--C2 0.334 0.097 0.145 0.514
# ---
#
# Difference:
# B1--C1+B2--C1+B3--C1+B4--C1+B5--C1 - B1--C2+B2--C2+B3--C2+B4--C2+B5--C2
#
# Post.mean Post.sd Cred.lb Cred.ub Prob.greater Prob.less
# -0.119 0.145 -0.409 0.173 0.205 0.795
# ---
Prob.greater
is the posterior probability that the first sum is larger than the second sum.
The object test_sum
can then be plotted. Note this returns three plots, but only the difference is shown here
plot(test_sum)$diff
The histogram is not very smooth in this case because iter = 1000
, but this of course can be changed.
This next example is for two groups. The data are called bfi
and they are in the BGGM package. I compare a sum of two relations for questions measuring agreeableness in males and females. The relations tested are as follows
sums <- c("A3--A4 + A4--A5")
where A1
is “know how to comfort others”, A4
is “love children”, and A5
is “make people feel at ease”.
The next step is to fit the models
# data
Y <- bfi
# males
Y_males <- subset(Y, gender == 1, select = -c(education, gender))[,1:5]
# females
Y_females <- subset(Y, gender == 2, select = -c(education, gender))[,1:5]
fit_female <- estimate(Y_females, seed = 2)
# fit males
fit_male <- estimate(Y_males, seed = 1)
Then test the sum
test_sum <- pcor_sum(fit_female, fit_male, relations = sums)
# print
test_sum
#> BGGM: Bayesian Gaussian Graphical Models
#> ---
#> Network Stats: Posterior Sum
#> Posterior Samples: 5000
#> ---
#> Estimates
#>
#> Sum:
#> Post.mean Post.sd Cred.lb Cred.ub
#> g1: A3--A4+A4--A5 0.292 0.026 0.241 0.342
#> g2: A3--A4+A4--A5 0.305 0.036 0.234 0.375
#> ---
#>
#> Difference:
#> g1: A3--A4+A4--A5 - g2: A3--A4+A4--A5
#>
#> Post.mean Post.sd Cred.lb Cred.ub Prob.greater Prob.less
#> -0.014 0.045 -0.1 0.074 0.386 0.614
#> ---
For a kind of sanity check, here is the sum for the male group obtained from the point estimates.
pcor_mat(fit_male)["A3", "A4"] + pcor_mat(fit_male)["A4", "A5"]
#> 0.305
This matches the output.
By default, the print function for pcor_sum
provides 95 % credible intervals. This can be changed by directly using the print function, for example print(test_sum, cred = 0.99)
, provides 99 % credible intervals.
Currently, this function only supports sums, due to this being of interest for the psychological network literature in particular. This can be extended to accommodate multiplication, subtraction, testing values other than zero, etc. Please make a feature request at either github or BGGM-users group.