# icc's when the number of judges is not constant

I have the following problem. I need to calculate the Shrout & Fleiss ICC's for the situation in which items are judged by a varying number of judges. For example, the competitive nature of an industry is judged for a set of industries, but with a different number of judges per industry. One industry is only judged by 2 judges, whereas the competitive nature of another industry can judged by up to 12 judges. I have used the ICC (package psych) and icc (package irr) functions for the determination of icc's, but it is unclear whether they can deal with a varying number of judges. Can anyone help me with this? How to calculate the S&F icc's when the number of judges is variable? I would prefer to continue using R for this, but if this is better accomplished with anotherr software, I would like to get those suggestions as well.

Thanks, Peter Verbeet

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Unless you luck out, this question is probably so specific and so stats-focused (versus R programming-focused) that you're not going to get a response here. You might brace yourself and try R-help, or you might try to write the package authors directly. –  Harlan Jul 12 '10 at 19:02

I've used hierarchical linear modeling for this. I referred to a Prof. Seltman's HML notes for R to see how. The trick is getting the variance terms for ICC with variable number of judges.

``````library(lme4)

# calculate the hierarchical model
m1 = lmer(score ~ (1|item_id) + (1|judge_id), data=d)
print(m1)

# helper function to pull out the variances
xVars <- function(model) {
exvars = lme4::VarCorr(model)
vars = c(exvars\$item_id[1,1], exvars\$judge_id[1,1], attr(exvars,"sc")^2)
names(vars) <- c('item var', 'judge var', 'residual var')
vars
}
# helper function for ICC(k) variations
icck <- function(variances, k=1) {
icc = variances[1] / (variances[1] + (variances[2] + variances[3]) / k)
names(icc) = c(paste('ICC', k, sep=''))
icc
}

# the output you want
icc1 = icck(xVars(m1))
print(icc1)
icc8 = icck(xVars(m1), 8)
print(icc8)
``````
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Excellent! Thanks a lot! –  Peter Verbeet Aug 17 '10 at 11:39
I appreciate the gratitude but I'd be happier if you voted the answer up and marked it as accepted. ;-) –  Turadg Aug 24 '10 at 22:00