MangatSingh: Mangat-Singh model
In RRTCS: Randomized Response Techniques for Complex Surveys
Description
Usage
Arguments
Details
Value
References
See Also
Examples
Description
Computes the randomized response estimation, its variance estimation and its confidence interval through the Mangat-Singh model.
The function can also return the transformed variable.
The Mangat-Singh model was proposed by Mangat and Singh in 1990.
Usage
1
Arguments
z
vector of the observed variable; its length is equal to n (the sample size)
p
proportion of marked cards with the sensitive attribute in the second box
t
proportion of marked cards with "True" in the first box
pi
vector of the first-order inclusion probabilities
type
the estimator type: total or mean
cl
confidence level
N
size of the population. By default it is NULL
pij
matrix of the second-order inclusion probabilities. By default it is NULL
Details
In the Mangat-Singh model, the sampled person is offered two boxes of cards. In the first box a known proportion t,(0<t<1) of cards is marked "True" and the
remaining ones are marked "RR". One card is to be drawn, observed and returned to the box. If the card drawn is marked "True", then the respondent should respond "Yes"
if he/she belongs to the sensitive category, otherwise "No". If the card drawn is marked "RR", then the respondent must use the second box and draw a card from it.
This second box contains a proportion p,(0<p<1,p\neq 0.5) of cards marked A and the remaining ones are marked A^c. If the card drawn from the second
box matches his/her status as related to the stigmatizing characteristic, he/she must respond "Yes", otherwise "No".
The randomized response from a person labelled i is assumed to be:
z_i=≤ft \{\begin{array}{lcc}
y_i & \textrm{if a card marked "True" is drawn from the first box}\\
I_i & \textrm{if a card marked "RR" is drawn}
\end{array}
\right .
I_i=≤ft \{\begin{array}{lcc}
1 & \textrm{if the "card type" } A \textrm{ or } A^c \textrm{ "matches" the genuine trait } A \textrm{ or } A^c\\
0 & \textrm{if a "mismatch" is observed}
\end{array}
\right .
The transformed variable is r_i=\frac{z_i-(1-t)(1-p)}{t+(1-t)(2p-1)} and the estimated variance is \widehat{V}_R(r_i)=r_i(r_i-1).
Value
Point and confidence estimates of the sensitive characteristics using the Mangat-Singh model. The transformed variable is also reported, if required.
References
Mangat, N.S., Singh, R. (1990).
An alternative randomized response procedure.
Biometrika, 77, 439-442.
See Also
Examples
1
2
3
4
5
6
7
N=802
data(MangatSinghData)
dat=with(MangatSinghData,data.frame(z,Pi))
p=0.7
t=0.55
cl=0.95
MangatSingh(dat$z,p,t,dat$Pi,"mean",cl,N)
RRTCS documentation built on April 21, 2021, 9:06 a.m.
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Description Usage Arguments Details Value References See Also Examples
Description
Computes the randomized response estimation, its variance estimation and its confidence interval through the Mangat-Singh model. The function can also return the transformed variable. The Mangat-Singh model was proposed by Mangat and Singh in 1990.
Usage
1 |
Arguments
z |
vector of the observed variable; its length is equal to n (the sample size) |
p |
proportion of marked cards with the sensitive attribute in the second box |
t |
proportion of marked cards with "True" in the first box |
pi |
vector of the first-order inclusion probabilities |
type |
the estimator type: total or mean |
cl |
confidence level |
N |
size of the population. By default it is NULL |
pij |
matrix of the second-order inclusion probabilities. By default it is NULL |
Details
In the Mangat-Singh model, the sampled person is offered two boxes of cards. In the first box a known proportion t,(0<t<1) of cards is marked "True" and the remaining ones are marked "RR". One card is to be drawn, observed and returned to the box. If the card drawn is marked "True", then the respondent should respond "Yes" if he/she belongs to the sensitive category, otherwise "No". If the card drawn is marked "RR", then the respondent must use the second box and draw a card from it. This second box contains a proportion p,(0<p<1,p\neq 0.5) of cards marked A and the remaining ones are marked A^c. If the card drawn from the second box matches his/her status as related to the stigmatizing characteristic, he/she must respond "Yes", otherwise "No". The randomized response from a person labelled i is assumed to be:
z_i=≤ft \{\begin{array}{lcc} y_i & \textrm{if a card marked "True" is drawn from the first box}\\ I_i & \textrm{if a card marked "RR" is drawn} \end{array} \right .
I_i=≤ft \{\begin{array}{lcc} 1 & \textrm{if the "card type" } A \textrm{ or } A^c \textrm{ "matches" the genuine trait } A \textrm{ or } A^c\\ 0 & \textrm{if a "mismatch" is observed} \end{array} \right .
The transformed variable is r_i=\frac{z_i-(1-t)(1-p)}{t+(1-t)(2p-1)} and the estimated variance is \widehat{V}_R(r_i)=r_i(r_i-1).
Value
Point and confidence estimates of the sensitive characteristics using the Mangat-Singh model. The transformed variable is also reported, if required.
References
Mangat, N.S., Singh, R. (1990). An alternative randomized response procedure. Biometrika, 77, 439-442.
See Also
Examples
1 2 3 4 5 6 7 | N=802
data(MangatSinghData)
dat=with(MangatSinghData,data.frame(z,Pi))
p=0.7
t=0.55
cl=0.95
MangatSingh(dat$z,p,t,dat$Pi,"mean",cl,N)
|
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