Difference between revisions of "SMHS BigDataBigSci SEM Ex1"
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===Core Lavaan Methods=== | ===Core Lavaan Methods=== | ||
− | <li> <b>summary</b>() print a long summary of the model results<li | + | <li> <b>summary</b>() print a long summary of the model results</li> |
− | <li><b>show</b>() print a short summary of the model results<li | + | <li><b>show</b>() print a short summary of the model results</li> |
− | <li> <b>coef</b>() returns the estimates of the free parameters in the model as a named numeric vector<li | + | <li> <b>coef</b>() returns the estimates of the free parameters in the model as a named numeric vector</li> |
− | <li> <b>fitted</b>() returns the implied moments (covariance matrix and mean vector) of the model<li | + | <li> <b>fitted</b>() returns the implied moments (covariance matrix and mean vector) of the model</li> |
− | <li> <b>resid</b>() returns the raw, normalized or standardized residuals (difference between implied and observed moments)<li | + | <li> <b>resid</b>() returns the raw, normalized or standardized residuals (difference between implied and observed moments)</li> |
− | <li> <b>vcov</b>() returns the covariance matrix of the estimated parameters<li | + | <li> <b>vcov</b>() returns the covariance matrix of the estimated parameters</li> |
− | <li><b>predict</b>() compute factor scores<li | + | <li><b>predict</b>() compute factor scores</li> |
− | <li> <b>logLik</b>() returns the log-likelihood of the fitted model (if maximum likelihood estimation was used)<li | + | <li> <b>logLik</b>() returns the log-likelihood of the fitted model (if maximum likelihood estimation was used)</li> |
− | <li> <b>AIC</b>(), BIC() compute information criteria (if maximum likelihood estimation is used)<li | + | <li> <b>AIC</b>(), BIC() compute information criteria (if maximum likelihood estimation is used)</li> |
− | <li> <b>update</b>() update a fitted lavaan object<li | + | <li> <b>update</b>() update a fitted lavaan object</li> |
− | <li> <b>inspect</b>() peek into the internal representation of the model; by default, it returns a list of model matrices counting the free parameters in the model; can also be used to extract starting values, gradient values, and much more<li | + | <li> <b>inspect</b>() peek into the internal representation of the model; by default, it returns a list of model matrices counting the free parameters in the model; can also be used to extract starting values, gradient values, and much more</li> |
If these args are set to TRUE, the output includes additional fit measures, standardized estimates, and R2 values for the dependent variables, respectively | If these args are set to TRUE, the output includes additional fit measures, standardized estimates, and R2 values for the dependent variables, respectively | ||
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The output consists of three sections. | The output consists of three sections. | ||
− | <li> The <b>first section</b> (first 6 lines) contains the package version number, an indication whether the model has converged (and in how many iterations), and the effective number of observations used in the analysis.<li | + | <li> The <b>first section</b> (first 6 lines) contains the package version number, an indication whether the model has converged (and in how many iterations), and the effective number of observations used in the analysis.</li> |
− | <li>The <b>second section</b> contains the model χ^2 test statistic, degrees of freedom, and a p value are printed. If fit.measures = TRUE, it also prints the test statistic of the baseline model (where all observed variables are assumed to be uncorrelated) and several popular fit indices. If maximum likelihood estimation is used, this section will also contain information about the log-likelihood, the AIC, and the BIC. <li | + | <li>The <b>second section</b> contains the model χ^2 test statistic, degrees of freedom, and a p value are printed. If fit.measures = TRUE, it also prints the test statistic of the baseline model (where all observed variables are assumed to be uncorrelated) and several popular fit indices. If maximum likelihood estimation is used, this section will also contain information about the log-likelihood, the AIC, and the BIC. </li> |
− | <li>The <b>third section</b> provides an overview of the parameter estimates, including the type of standard errors used and whether the observed or expected information matrix was used to compute standard errors. Then, for each model parameter, the estimate and the standard error are displayed, and if appropriate, a z value based on the Wald test and a corresponding two-sided p value are also shown. To ease the reading of the parameter estimates, they are grouped into three blocks:<li | + | <li>The <b>third section</b> provides an overview of the parameter estimates, including the type of standard errors used and whether the observed or expected information matrix was used to compute standard errors. Then, for each model parameter, the estimate and the standard error are displayed, and if appropriate, a z value based on the Wald test and a corresponding two-sided p value are also shown. To ease the reading of the parameter estimates, they are grouped into three blocks:</li> |
<li>factor loadings, </li> | <li>factor loadings, </li> | ||
<li> factor covariances, and </li> | <li> factor covariances, and </li> |
Revision as of 10:55, 16 May 2016
Contents
Structural Equation Modeling (SEM) - Hands-on Example 1 (School Kids Mental Abilities)
These data (Holzinger & Swineford 1939) include mental ability test scores of 7 & 8 grade children from two schools (Pasteur and Grant-White). This version of the dataset includes only 9 (out of the 26) tests. We can build and test a confirmatory factor analysis (CFA) SEM model for 3 correlated latent variables (or factors), each with three indicators:
ID | lhs | op | rhs | user | free | ustart |
1 | Visual | =~ | x1 | 1 | 0 | 1 |
2 | Visual | =~ | x2 | 1 | 1 | NA |
3 | Visual | =~ | x3 | 1 | 2 | NA |
4 | Textual | =~ | x4 | 1 | 0 | 1 |
5 | Textual | =~ | x5 | 1 | 3 | NA |
6 | Textual | =~ | x6 | 1 | 4 | NA |
7 | Speed | =~ | x7 | 1 | 0 | 1 |
8 | Speed | =~ | x8 | 1 | 5 | NA |
9 | Speed | =~ | x9 | 1 | 6 | NA |
10 | x1 | ~~ | x1 | 0 | 7 | NA |
11 | x2 | ~~ | x2 | 0 | 8 | NA |
12 | x3 | ~~ | x3 | 0 | 9 | NA |
13 | x4 | ~~ | x4 | 0 | 10 | NA |
14 | x5 | ~~ | x5 | 0 | 11 | NA |
15 | x6 | ~~ | x6 | 0 | 12 | NA |
16 | x7 | ~~ | x7 | 0 | 13 | NA |
17 | x8 | ~~ | x8 | 0 | 14 | NA |
18 | x9 | ~~ | x9 | 0 | 15 | 47.8 |
19 | Visual | ~~ | Visual | 0 | 16 | NA |
20 | Textual | ~~ | Textual | 0 | 17 | NA |
21 | Speed | ~~ | Speed | boy | 18 | NA |
22 | Visual | ~~ | Textual | girl | 19 | NA |
23 | Visual | ~~ | Speed | girl | 20 | NA |
24 | Textual | ~~ | Speed | boy | 21 | NA |
There are 3 latent variables (factors) in this model, each with 3 indicators, resulting in 9 factor loadings that need to be estimated. There are also 3 covariances among the latent variables {another three parameters}.
These 12 parameters are represented in the path diagram as single-headed and double-headed arrows, respectively. We also need to estimate the residual variances of the 9 observed variables and the variances of the 3 latent variables, resulting in 12 additional free parameters. In total, we have 24 parameters.
To fully identify the model we need to set the metric of the latent variables. There are 2 ways to do this:
Either way, we fix 3 of these 24 parameters, and 21 parameters remain free.
The parTable(fit) method, generates this table output.
The `rhs', `op' and `lhs' columns define the parameters of the model. All parameters with the `=~' operator are factor loadings, whereas all parameters with the `~~' operator are variances or covariances. Nonzero elements in the `free' column are the free parameters of the model. Zero elements in the `free' column correspond to fixed parameters, whose value is found in the `start' column.
Lavaan’s user-friendly model-specification approach is implemented in the fitting functions: cfa() and sem().
Since these data contain 3 latent variables, and no regressions, the minimalist syntax is:
data.model <- 'visual =~ x1 + x2 + x3 textual =~ x4 + x5 + x6 speed =~ x7 + x8 + x9'
Fit the CFA model:
fit.1 <- cfa(data.model, data = HolzingerSwineford1939)
The `user' column (parTabale) shows which parameters were explicitly contained in the user-specified model syntax (= 1), and which parameters were added by the cfa() function (= 0).
parTable(fit.1)
If we prefer not to fix the factor loadings of the first indicator, but instead want to fix the variances of the latent variances, the model syntax would be changed to:
fit.2 <- 'visual =~ NA*x1 + x2 + x3 textual =~ NA*x4 + x5 + x6 speed =~ NA*x7 + x8 + x9 visual ~~ 1*visual textual ~~ 1*textual speed ~~ 1*speed'
More complex model specifications can be made using the full lavaan model syntax:
fit.full <- ' # latent variables visual =~ 1*x1 + x2 + x3 textual =~ 1*x4 + x5 + x6 speed =~ 1*x7 + x8 + x9 # residual variances observed variables x1 ~~ x1 x2 ~~ x2 x3 ~~ x3 x4 ~~ x4 x5 ~~ x5 x6 ~~ x6 x7 ~~ x7 x8 ~~ x8 x9 ~~ x9 # factor variances visual ~~ visual textual ~~ textual speed ~~ speed # factor covariances visual ~~ textual + speed textual ~~ speed' fit.3 <- lavaan(fit.full, data = HolzingerSwineford1939)
We can specify the model where the first factor loadings are explicitly fixed to one, and the covariances among the factors are added manually.
fit.mixed <- ' # latent variables visual =~ 1*x1 + x2 + x3 textual =~ 1*x4 + x5 + x6 speed =~ 1*x7 + x8 + x9 # factor covariances visual ~~ textual + speed textual ~~ speed' fit <- lavaan(fit.mixed, data = HolzingerSwineford1939, auto.var = TRUE)
The best method to view results from a SEM fitted with lavaan is summary(), which can be called with optional arguments like fit.measures, standardized, and rsquare.
Core Lavaan Methods
If these args are set to TRUE, the output includes additional fit measures, standardized estimates, and R2 values for the dependent variables, respectively
fit.model <- 'visual =~ x1 + x2 + x3 textual =~ x4 + x5 + x6 speed =~ x7 + x8 + x9' fit <- cfa(fit.model, data = HolzingerSwineford1939) summary(fit, fit.measures = TRUE)
fit <- cfa(fit.model, data=HolzingerSwineford1939, estimator="GLS", group="sex") fit.4 <- cfa(fit.model, data=HolzingerSwineford1939, estimator="GLD", group="sex", group.equal="regressions") anova(fit, fit.4)
Output
The output consists of three sections.
The summary() method provides a nice summary of the model results for visualization purposes. The parameterEstimates() method returns the actual parameter estimates as a data.frame, which can be processed further.
Index | lhs | op | rhs | est | se | z | pvalue | ci.lower | ci.upper |
1 | visual | =~ | x1 | 1 | 0 | NA | NA | 1 | 1 |
2 | visual | =~ | x2 | 0.553 | 0.1 | 5.554 | 0 | 0.358 | 0.749 |
3 | visual | =~ | x3 | 0.729 | 0.109 | 6.685 | 0 | 0.516 | 0.943 |
4 | textual | =~ | x4 | 1 | 0 | NA | NA | 1 | 1 |
5 | textual | =~ | x5 | 1.113 | 0.065 | 17.014 | 0 | 0.985 | 1.241 |
6 | textual | =~ | x6 | 0.926 | 0.055 | 16.703 | 0 | 0.817 | 1.035 |
7 | speed | =~ | x7 | 1 | 0 | NA | NA | 1 | 1 |
8 | speed | =~ | x8 | 1.18 | 0.165 | 7.152 | 0 | 0.857 | 1.503 |
9 | speed | =~ | x9 | 1.082 | 0.151 | 7.155 | 0 | 0.785 | 1.378 |
10 | x1 | ~~ | x1 | 0.549 | 0.114 | 4.833 | 0 | 0.326 | 0.772 |
11 | x2 | ~~ | x2 | 1.134 | 0.102 | 11.146 | 0 | 0.934 | 1.333 |
12 | x3 | ~~ | x3 | 0.844 | 0.091 | 9.317 | 0 | 0.667 | 1.022 |
13 | x4 | ~~ | x4 | 0.371 | 0.048 | 7.779 | 0 | 0.278 | 0.465 |
14 | x5 | ~~ | x5 | 0.446 | 0.058 | 7.642 | 0 | 0.332 | 0.561 |
15 | x6 | ~~ | x6 | 0.356 | 0.043 | 8.277 | 0 | 0.272 | 0.441 |
16 | x7 | ~~ | x7 | 0.799 | 0.081 | 9.823 | 0 | 0.64 | 0.959 |
17 | x8 | ~~ | x8 | 0.488 | 0.074 | 6.573 | 0 | 0.342 | 0.633 |
18 | x9 | ~~ | x9 | 0.566 | 0.071 | 8.003 | 0 | 0.427 | 0.705 |
19 | visual | ~~ | visual | 0.809 | 0.145 | 5.564 | 0 | 0.524 | 1.094 |
20 | textual | ~~ | textual | 0.979 | 0.112 | 8.737 | 0 | 0.76 | 1.199 |
21 | speed | ~~ | speed | 0.384 | 0.086 | 4.451 | 0 | 0.215 | 0.553 |
22 | visual | ~~ | textual | 0.408 | 0.074 | 5.552 | 0 | 0.264 | 0.552 |
23 | visual | ~~ | speed | 0.262 | 0.056 | 4.66 | 0 | 0.152 | 0.373 |
24 | textual | ~~ | speed | 0.173 | 0.049 | 3.518 | 0 | 0.077 | 0.27 |
The confidence level can be changed by setting the level argument. To obtain several standardized versions of the estimates, we can use standardized = TRUE:
subset(est, op == "=~")
Index | lhs | op | rhs | est | se | z | pvalue | std.lv | std.all | std.nox |
1 | visual | =~ | x1 | 1 | 0 | NA | NA | 0.9 | 0.772 | 0.772 |
2 | visual | =~ | x2 | 0.553 | 0.1 | 5.554 | 0 | 0.498 | 0.424 | 0.424 |
3 | visual | =~ | x3 | 0.729 | 0.109 | 6.685 | 0 | 0.656 | 0.581 | 0.581 |
4 | textual | =~ | x4 | 1 | 0 | NA | NA | 0.99 | 0.852 | 0.852 |
5 | textual | =~ | x5 | 1.113 | 0.065 | 17.014 | 0 | 1.102 | 0.855 | 0.855 |
6 | textual | =~ | x6 | 0.926 | 0.055 | 16.703 | 0 | 0.917 | 0.838 | 0.838 |
7 | speed | =~ | x7 | 1 | 0 | NA | NA | 0.619 | 0.57 | 0.57 |
8 | speed | =~ | x8 | 1.18 | 0.165 | 7.152 | 0 | 0.731 | 0.723 | 0.723 |
9 | speed | =~ | x9 | 1.082 | 0.151 | 7.155 | 0 | 0.67 | 0.665 | 0.665 |
This only shows the factor loadings are shown but 3 additional columns with standardized values are added.
library("semPlot") # semPaths(fit, "std", "show") semPaths(fit, "std", curvePivot = TRUE, edge.label.cex = 1.0) # get the margines right: # semPaths(fit, "std", curvePivot = TRUE, edge.label.cex = 1.0, mar = c(10, 3, 10, 3)) # semPaths(fit, "std", curvePivot = TRUE, edge.label.cex = 1.0, mar = c(10, 3, 10, 3), as.expression = c("nodes", # "edges"), sizeMan = 3, sizeInt = 1, sizeLat = 4)
See also
- SOCR Home page: http://www.socr.umich.edu
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