EichhornHayre: Eichhorn-Hayre model

Description

Computes the randomized response estimation, its variance estimation and its confidence interval through the Eichhorn-Hayre model. The function can also return the transformed variable. The Eichhorn-Hayre model was proposed by Eichhorn and Hayre in 1983.

Usage

EichhornHayre(z,mu,sigma,pi,type=c("total","mean"),cl,N=NULL,pij=NULL)

Arguments

vector of the observed variable; its length is equal to \(n\) (the sample size)

mean of the scramble variable \(S\)

sigma

standard deviation of the scramble variable \(S\)

vector of the first-order inclusion probabilities

type

the estimator type: total or mean

confidence level

size of the population. By default it is NULL

pij

matrix of the second-order inclusion probabilities. By default it is NULL

Value

Point and confidence estimates of the sensitive characteristics using the Eichhorn-Hayre model. The transformed variable is also reported, if required.

Details

The randomized response given by the person labelled \(i\) is \(z_i=y_iS\) where \(S\) is a scramble variable whose distribution is assumed to be known.

References

Eichhorn, B.H., Hayre, L.S. (1983). Scrambled randomized response methods for obtaining sensitive quantitative data. Journal of Statistical Planning and Inference, 7, 306-316.

Examples

Run this code

# NOT RUN {
data(EichhornHayreData)
dat=with(EichhornHayreData,data.frame(z,Pi))
mu=1.111111
sigma=0.5414886
cl=0.95
#This line returns a warning showing why the variance estimation is not possible.
#See ResamplingVariance for several alternatives.
EichhornHayre(dat$z,mu,sigma,dat$Pi,"mean",cl)
# }

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