Description Usage Format Details See Also Examples
Results: Simple Mediation Model - Vale and Maurelli (1983) - Skewness = 3, Kurtosis = 21 - Complete Data - Fit Structural Equation Modeling with Robust Standard Errors
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A data frame with the following variables
Simulation task identification number.
Sample size.
Monte Carlo replications.
Population slope of path from x
to y
≤ft( \dot{τ} \right).
Population slope of path from m
to y
≤ft( β \right).
Population slope of path from x
to m
≤ft( α \right).
Population indirect effect of x
on y
through m
≤ft( α β \right).
Population variance of x
≤ft( σ_{x}^{2} \right).
Population error variance of m
≤ft( σ_{\varepsilon_{m}}^{2} \right).
Population error variance of y
≤ft( σ_{\varepsilon_{y}}^{2} \right).
Population mean of x
≤ft( μ_x \right).
Population intercept of m
≤ft( δ_m \right).
Population intercept of y
≤ft( δ_y \right).
Mean of estimated slope of path from x
to y
≤ft( \hat{\dot{τ}} \right).
Mean of estimated slope of path from m
to y
≤ft( \hat{β} \right).
Mean of estimated slope of path from x
to m
≤ft( \hat{α} \right).
Mean of estimated error variance of y
≤ft( \hat{σ}_{\varepsilon_{y}}^{2} \right).
Mean of estimated error variance of m
≤ft( \hat{σ}_{\varepsilon_{m}}^{2} \right).
Mean of estimated indirect effect of x
on y
through m
≤ft( \hat{α} \hat{β} \right).
Mean of estimated standard error of \hat{\dot{τ}}.
Mean of estimated standard error of \hat{β}.
Mean of estimated standard error of \hat{α}.
Mean of estimated standard error of error variance of y
≤ft( \hat{σ}_{\varepsilon_{y}}^{2} \right).
Mean of estimated standard error of error variance of m
≤ft( \hat{σ}_{\varepsilon_{m}}^{2} \right).
Population parameter α β.
Variance of estimated slope of path from x
to y
≤ft( \hat{\dot{τ}} \right).
Variance of estimated slope of path from m
to y
≤ft( \hat{β} \right).
Variance of estimated slope of path from x
to m
≤ft( \hat{α} \right).
Variance of estimated indirect effect of x
on y
through m
≤ft( \hat{α} \hat{β} \right).
Standard deviation of estimated slope of path from x
to y
≤ft( \hat{\dot{τ}} \right).
Standard deviation of estimated slope of path from m
to y
≤ft( \hat{β} \right).
Standard deviation of estimated slope of path from x
to m
≤ft( \hat{α} \right).
Standard deviation of estimated indirect effect of x
on y
through m
≤ft( \hat{α} \hat{β} \right).
Skewness of estimated slope of path from x
to y
≤ft( \hat{\dot{τ}} \right).
Skewness of estimated slope of path from m
to y
≤ft( \hat{β} \right).
Skewness of estimated slope of path from x
to m
≤ft( \hat{α} \right).
Skewness of estimated indirect effect of x
on y
through m
≤ft( \hat{α} \hat{β} \right).
Excess kurtosis of estimated slope of path from x
to y
≤ft( \hat{\dot{τ}} \right).
Excess kurtosis of estimated slope of path from m
to y
≤ft( \hat{β} \right).
Excess kurtosis of estimated slope of path from x
to m
≤ft( \hat{α} \right).
Excess kurtosis of estimated indirect effect of x
on y
through m
≤ft( \hat{α} \hat{β} \right).
Bias of estimated slope of path from x
to y
≤ft( \hat{\dot{τ}} \right).
Bias of estimated slope of path from m
to y
≤ft( \hat{β} \right).
Bias of estimated slope of path from x
to m
≤ft( \hat{α} \right).
Bias of estimated indirect effect of x
on y
through m
≤ft( \hat{α} \hat{β} \right).
Mean square error of estimated slope of path from x
to y
≤ft( \hat{\dot{τ}} \right).
Mean square error of estimated slope of path from m
to y
≤ft( \hat{β} \right).
Mean square error of estimated slope of path from x
to m
≤ft( \hat{α} \right).
Mean square error of estimated indirect effect of x
on y
through m
≤ft( \hat{α} \hat{β} \right).
Root mean square error of estimated slope of path from x
to y
≤ft( \hat{\dot{τ}} \right).
Root mean square error of estimated slope of path from m
to y
≤ft( \hat{β} \right).
Root mean square error of estimated slope of path from x
to m
≤ft( \hat{α} \right).
Root mean square error of estimated indirect effect of x
on y
through m
≤ft( \hat{α} \hat{β} \right).
Type of missingness.
Standardized vs. unstandardize indirect effect.
Method used. Fit in this case.
Sample size labels.
α labels.
β labels.
\dot{τ} labels.
θ labels.
The simple mediation model is given by
y_i = δ_y + \dot{τ} x_i + β m_i + \varepsilon_{y_{i}}
m_i = δ_m + α x_i + \varepsilon_{m_{i}}
The parameters for the mean structure are
\boldsymbol{θ}_{\text{mean structure}} = ≤ft\{ μ_x, δ_m, δ_y \right\} .
The parameters for the covariance structure are
\boldsymbol{θ}_{\text{covariance structure}} = ≤ft\{ \dot{τ}, β, α, σ_{x}^{2}, σ_{\varepsilon_{m}}^{2}, σ_{\varepsilon_{y}}^{2} \right\} .
Other results:
results_beta_fit.ols
,
results_beta_ols_mc.mvn_ci
,
results_exp_fit.ols
,
results_exp_ols_mc.mvn_ci
,
results_mvn_fit.ols
,
results_mvn_fit.sem
,
results_mvn_mar_fit.sem
,
results_mvn_mar_mc.mvn_ci
,
results_mvn_mar_nb.fiml_ci
,
results_mvn_mar_pb.mvn_ci
,
results_mvn_mcar_fit.sem
,
results_mvn_mcar_mc.mvn_ci
,
results_mvn_mcar_nb.fiml_ci
,
results_mvn_mcar_pb.mvn_ci
,
results_mvn_mnar_fit.sem
,
results_mvn_mnar_mc.mvn_ci
,
results_mvn_mnar_nb.fiml_ci
,
results_mvn_nb_ci
,
results_mvn_ols_mc.mvn_ci
,
results_mvn_pb.mvn_ci
,
results_mvn_sem_mc.mvn_ci
,
results_vm_mod_fit.ols
,
results_vm_mod_fit.sem.mlr
,
results_vm_mod_nb_ci
,
results_vm_mod_ols_mc.mvn_ci
,
results_vm_mod_pb.mvn_ci
,
results_vm_mod_sem_mc.mvn_ci
,
results_vm_sev_fit.ols
,
results_vm_sev_nb_ci
,
results_vm_sev_ols_mc.mvn_ci
,
results_vm_sev_pb.mvn_ci
,
results_vm_sev_sem_mc.mvn_ci
1 2 3 | data(results_vm_sev_fit.sem.mlr, package = "jeksterslabRmedsimple")
head(results_vm_sev_fit.sem.mlr)
str(results_vm_sev_fit.sem.mlr)
|
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