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semTools (version 0.5-6)

singleParamTest: Single Parameter Test Divided from Nested Model Comparison

Description

In comparing two nested models, \(\Delta\chi^2\) test may indicate that two models are different. However, like other omnibus tests, researchers do not know which fixed parameters or constraints make these two models different. This function will help researchers identify the significant parameter.

Usage

singleParamTest(model1, model2, return.fit = FALSE,
  method = "satorra.bentler.2001")

Arguments

model1

Model 1.

model2

Model 2. Note that two models must be nested models. Further, the order of parameters in their parameter tables are the same. That is, nested models with different scale identifications may not be able to test by this function.

return.fit

Return the submodels fitted by this function

method

The method used to calculate likelihood ratio test. See lavTestLRT for available options

Value

If return.fit = FALSE, the result tables are provided. \(\chi^2\) and p value are provided for all methods. Note that the \(\chi^2\) is all based on 1 df. Expected parameter changes and their standardized forms are also provided.

If return.fit = TRUE, a list with two elements are provided. The first element is the tabular result. The second element is the submodels used in the free and fix methods.

Details

This function first identifies the differences between these two models. The model with more free parameters is referred to as parent model and the model with fewer free parameters is referred to as nested model. Two tests are implemented here:

  1. free: The nested model is used as a template. Then, one parameter indicating the differences between two models is freed. The new model is compared with the nested model. This process is repeated for all differences between two models.

  2. fix: The parent model is used as a template. Then, one parameter indicating the differences between two models is fixed or constrained to be equal to other parameters. The new model is then compared with the parent model. This process is repeated for all differences between two models.

  3. mi: No longer available because the test of modification indices is not consistent. For example, if two parameters are equality constrained, the modification index from the first parameter is not equal to the second parameter.

Note that this function does not adjust for the inflated Type I error rate from multiple tests.

Examples

Run this code
# NOT RUN {
library(lavaan)

# Nested model comparison by hand
HS.model1 <- ' visual =~ x1 + x2 + x3
              textual =~ x4 + x5 + x6'
HS.model2 <- ' visual =~ a*x1 + a*x2 + a*x3
              textual =~ b*x4 + b*x5 + b*x6'

m1 <- cfa(HS.model1, data = HolzingerSwineford1939, std.lv = TRUE,
          estimator = "MLR")
m2 <- cfa(HS.model2, data = HolzingerSwineford1939, std.lv = TRUE,
          estimator = "MLR")
anova(m1, m2)
singleParamTest(m1, m2)

## Nested model comparison from the measurementInvariance function
HW.model <- ' visual =~ x1 + x2 + x3
              textual =~ x4 + x5 + x6
              speed =~ x7 + x8 + x9 '

models <- measurementInvariance(model = HW.model, data = HolzingerSwineford1939,
                                group = "school")
singleParamTest(models[[1]], models[[2]])

## Note that the comparison between metric (Model 2) and scalar invariance
## (Model 3) cannot be done by this function because the metric invariance
## model fixes factor means as 0 in Group 2 but the strong invariance model
## frees the factor means in Group 2. Users may use this function to compare
## scalar invariance (Model 3) to a homogeneous-means model.

# }

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