# mfxboot function for marginal effects for probit regressions?

Data: Data

Code:

``````#function that calculates ‘the average of the sample marginal effects’.
mfxboot <- function(modform,dist,data,boot=1000,digits=3){
# get marginal effects
pdf <- ifelse(dist=="probit",
marginal.effects <- pdf*coef(x)
# start bootstrap
bootvals <- matrix(rep(NA,boot*length(coef(x))), nrow=boot)
set.seed(1111)
for(i in 1:boot){
samp1 <- data[sample(1:dim(data)[1],replace=T,dim(data)[1]),]
pdf1 <- ifelse(dist=="probit",
bootvals[i,] <- pdf1*coef(x1)
}
res <- cbind(marginal.effects,apply(bootvals,2,sd),marginal.effects/apply(bootvals,2,sd))
if(names(x\$coefficients[1])=="(Intercept)"){
res1 <- res[2:nrow(res),]
res2 <-   matrix(as.numeric(sprintf(paste("%.",paste(digits,"f",sep=""),sep=""),res1)),nrow=dim(res1)[1])
rownames(res2) <- rownames(res1)
} else {
res2 <- matrix(as.numeric(sprintf(paste("%.",paste(digits,"f",sep=""),sep="")),nrow=dim(res)[1]))
rownames(res2) <- rownames(res)
}
colnames(res2) <- c("marginal.effect","standard.error","z.ratio")
return(res2)
}

## Regression
probit_enae = glm(emploi ~ genre + filiere + satisfaction + competence + anglais, family=binomial(link="probit"),
data=ENAE_Probit.df)
summary(probit_enae) #Summary output of the regression
confint(probit_enae) #Gives the 95% confidence interval for the estimated coefficients

## Running the mfxboot for Marginal effects
mfx_enae = mfxboot(emploi ~ genre + filiere + satisfaction + competence + anglais,"probit",ENAE_Probit.df)
``````

Question:

When I run the mfxboot function, I get the following error message:

Error in bootvals[i, ] <- pdf1 * coef(x1) : number of items to replace is not a multiple of replacement length

Any idea as to why that happens? And Any suggestion of how to go around this issue?

Thanks.

I am not able to reproduce your error. Perhaps you should add `sessionInfo()` output to your question. A suggested enhancement to the `mfxboot` function follows below nonetheless.

My suggestion would be to refactor the `mfxboot` function into two functions -- one that returns the marginal effects given a `glm` object, and the second which bootstraps it.

You can do this easily using the `Boot` function in the `car` package since that is a nice front-end for bootstrapping `glm` objects.

Here is some code that demonstrates this process, which is much cleaner to read:

## Step 1: Estimate a probit model

``````library(car)

#================================================
# read in data, and estimate a probit model
#================================================
formE = emploi ~ genre +
filiere + satisfaction + competence + anglais
glmE = glm(formula = formE,
data = dfE)
``````

## Step 2: Write a function that returns the marginal effects

The following function takes as input a `glm` object of the `binomial` family and computes appropriate marginal effects for logit and probit links.

``````#================================================
# function: compute marginal effects for logit and probit models
# NOTE: this assumes that an intercept has been included by default
#================================================
fnMargEffBin = function(objBinGLM) {
stopifnot(objBinGLM\$family\$family == "binomial")
probit = colMeans(outer(dnorm(predict(objBinGLM,
coef(objBinGLM))[, -1]),
logit = colMeans(outer(dlogis(predict(objBinGLM,
coef(objBinGLM))[, -1])
)
return(vMargEff)
}

# test the function
fnMargEffBin(glmE)
``````

## Step 3: Bootstrap the marginal effects

The following code uses the `Boot` function from the `car` package to bootstrap the marginal effects. Note how the interface of `Boot` is optimized for statistics derived from `lm` and `glm` objects.

``````#================================================
# compute bootstrap std. err. for the marginal effects
#================================================
margEffBootE = Boot(object = glmE, f = fnMargEffBin,
labels = names(coef(glmE))[-1], R = 100)
summary(margEffBootE)
``````

Here is the output:

``````> summary(margEffBootE)
R  original    bootBias   bootSE   bootMed
genre        100  0.070733  0.00654606 0.042162  0.074563
filiere      100  0.043173  0.00060356 0.014064  0.043486
satisfaction 100  0.050773 -0.00110501 0.037737  0.048310
competence   100 -0.020144  0.00407027 0.034194 -0.014987
anglais      100 -0.018906 -0.00170887 0.033522 -0.019164
``````