There are a number of approaches for estimating interaction effects
in SEM. In modsem()
, the method = "method"
argument allows you to choose which to use. Different approaches can be
categorized into two groups: Product Indicator (PI) and Distribution
Analytic (DA) approaches.
"ca"
= constrained approach (Algina & Moulder,
2001)
"uca"
= unconstrained approach (Marsh, 2004)"rca"
= residual centering approach (Little et al.,
2006)"dblcent"
= double centering approach (Marsh., 2013)
"pind"
= basic product indicator approach (not
recommended)"lms"
= The Latent Moderated Structural equations (LMS)
approach, see the vignette"qml"
= The Quasi Maximum Likelihood (QML) approach,
see the vignette"mplus"
m1 <- '
# Outer Model
X =~ x1 + x2 + x3
Y =~ y1 + y2 + y3
Z =~ z1 + z2 + z3
# Inner model
Y ~ X + Z + X:Z
'
# Product Indicator Approaches
modsem(m1, data = oneInt, method = "ca")
modsem(m1, data = oneInt, method = "uca")
modsem(m1, data = oneInt, method = "rca")
modsem(m1, data = oneInt, method = "dblcent")
# Distribution Analytic Approaches
modsem(m1, data = oneInt, method = "mplus")
modsem(m1, data = oneInt, method = "lms")
modsem(m1, data = oneInt, method = "qml")