MBESS (version 4.3.0)

ss.aipe.sem.path.sensitiv: a priori Monte Carlo simulation for sample size planning for SEM targeted effects

Description

Conduct a priori Monte Carlo simulation to empirically study the effects of (mis)specifications of input information on the calculated sample size. Random data are generated from the true covariance matrix but fit to the proposed model, whereas sample size is calculated based on the input covariance matrix and proposed model.

Usage

ss.aipe.sem.path.sensitiv(model, est.Sigma, true.Sigma = est.Sigma, 
which.path, desired.width, N=NULL, conf.level = 0.95, assurance = NULL, 
G = 100, ...)

Arguments

model

the model the researcher proposes, may or may not be the true model. This argument should be an RAM (reticular action model; e.g., McArdle & McDonald, 1984) specification of a structural equation model, and should be of class mod. The model is specified in the same manner as does the sem package; see sem and specify.model for detailed documentation about model specifications in the RAM notation.

est.Sigma

the covariance matrix used to calculate sample size, may or may not be the true covariance matrix. The row names and column names of est.Sigma should be the same as the manifest variables in est.model.

true.Sigma

the true population covariance matrix, which will be used to generate random data for the simulation study. The row names and column names of est.Sigma should be the same as the manifest variables in est.model.

which.path

the name of the model parameter of interest, and must be in a double quote

desired.width

desired confidence interval width for the model parameter of interest

N

the sample size of random data. If it is NULL, it will be determined by the sample size planning method

conf.level

confidence level (i.e., 1- Type I error rate)

assurance

the assurance that the confidence interval obtained in a particular study will be no wider than desired (must be NULL or a value between 0.50 and 1)

G

number of replications in the Monte Carlo simulation

allows one to potentially include parameter values for inner functions

Value

w

the G random confidence interval widths

sample.size

the sample size calculated

path.of.interest

name of the model parameter of interest

desired.width

desired confidence interval width

mean.width

mean of the G random confidence interval widths

median.width

median of the G random confidence interval widths

quantile.width

99, 95, 90, 85, 80, 75, 70, and 60 percentiles of the G random confidence interval widths

width.less.than.desired

the proportion of confidence interval widths narrower than desired

Type.I.err.upper

the upper empirical Type I error rate

Type.I.err.lower

the lower empirical Type I error rate

Type.I.err

total empirical Type I error rate

conf.level

confidence level

rep

successful replications

Details

This function implements the sample size planning methods proposed in Lai and Kelley (2010). It depends on the function sem in the sem package to calculate the expected information matrix, and uses the same notation to specify SEM models as does sem. Please refer to sem for more detailed documentation about model specifications, the RAM notation, and model fitting techniques. For technical discussion on how to obtain the model implied covariance matrix in the RAM notation given model parameters, see McArdle and McDonald (1984).

References

Fox, J. (2006). Structural equation modeling with the sem package in R. Structural Equation Modeling, 13, 465--486.

Lai, K., & Kelley, K. (in press). Accuracy in parameter estimation for targeted effects in structural equation modeling: Sample size planning for narrow confidence intervals. Psychological Methods.

McArdle, J. J., & McDonald, R. P. (1984). Some algebraic properties of the reticular action model. British Journal of Mathematical and Statistical Psychology, 37, 234--251.

See Also

sem; specify.model; theta.2.Sigma.theta; ss.aipe.sem.path

Examples

Run this code

# Suppose the model of interest is Model 2 of the simulation study in 
# Lai and Kelley (2010), and the goal is to obtain a 95% confidence 
# interval for 'beta21' no wider than 0.3.

library(sem)

# specify a model object in the RAM notation
model.2<-specifyModel()
xi1 -> y1, lambda1, 1
xi1 -> y2, NA, 1
xi1 -> y3, lambda2, 1
xi1 -> y4, lambda3, 0.3
eta1 -> y4, lambda4, 1
eta1 -> y5, NA, 1
eta1 -> y6, lambda5, 1
eta1 -> y7, lambda6, 0.3
eta2 -> y6, lambda7, 0.3
eta2 -> y7, lambda8, 1
eta2 -> y8, NA, 1
eta2 -> y9, lambda9, 1
xi1 -> eta1, gamma11, 0.6
eta1 -> eta2, beta21, 0.6 
xi1 <-> xi1, phi11, 0.49
eta1 <-> eta1, psi11, 0.3136
eta2 <-> eta2, psi22, 0.3136
y1 <-> y1, delta1, 0.51
y2 <-> y2, delta2, 0.51
y3 <-> y3, delta3, 0.51
y4 <-> y4, delta4, 0.2895
y5 <-> y5, delta5, 0.51
y6 <-> y6, delta6, 0.2895
y7 <-> y7, delta7, 0.2895
y8 <-> y8, delta8, 0.51
y9 <-> y9, delta9, 0.51


# to inspect the specified model
model.2

# one way to specify the population covariance matrix is to
# first specify path coefficients and then calcualte the 
# model-implied covariance matrix
theta <- c(1, 1, 0.3, 1,1, 0.3, 0.3, 1, 1, 0.6, 0.6,
0.49, 0.3136, 0.3136, 0.51, 0.51, 0.51, 0.2895, 0.51, 0.2895, 0.2895, 0.51, 0.51)

names(theta) <- c("lambda1","lambda2","lambda3",
"lambda4","lambda5","lambda6","lambda7","lambda8","lambda9",
"gamma11", "beta21",
"phi11", "psi11", "psi22", 
"delta1","delta2","delta3","delta4","delta5","delta6","delta7",
"delta8","delta9")

res<-theta.2.Sigma.theta(model=model.2, theta=theta, 
latent.vars=c("xi1", "eta1","eta2"))

Sigma.theta <- res$Sigma.theta
# thus 'Sigma.theta' is the input covariance matrix for sample size planning procedure.

# the necessary sample size can be calculated as follows.
# ss.aipe.sem.path(model=model.2, Sigma=Sigma.theta, 
# desired.width=0.3, which.path="beta21")

# to verify the sample size calculated
# ss.aipe.sem.path.sensitiv(est.model=model.2, est.Sigma=Sigma.theta, 
# which.path="beta21", desired.width=0.3, G = 300)

# suppose the true covariance matrix ('var(X)' below) is in fact 
# a point close to 'Sigma.theta':

# X<-mvrnorm(n=1000, mu=rep(0,9), Sigma=Sigma.pop)
# var(X)
# ss.aipe.sem.path.sensitiv(est.model=model.2, est.Sigma=Sigma.theta, 
# true.Sigma=var(X), which.path="beta21", desired.width=0.3, G=300)

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