Estimators of different delta coefficients based on the unbiased estimator of the expected proportions of agreements

Abstract

To measure the degree of agreement between two observers that independently classify n subjects within K categories, it is common to use different kappa type coefficients, the most common of which is the C coefficient (Cohen's kappa). As C has some weaknesses -such as its poor performance with highly unbalanced marginal distributions-, the coefficient is sometimes used, based on the delta response model. This model allows us to obtain other parameters like: (a) the αi contribution of each i category to the value of the global agreement =Σ αi; and (b) the consistency Si in the category i (degree of agreement in the category i), a more appropriate parameter than the kappa value obtained by collapsing the data into the category i. It has recently been shown that the classic estimator C underestimates C, having obtained a new estimator CU which is less biased. This article demonstrates that something similar happens to the known estimators , αi, and Si of , αi and Si (respectively), proposes new and less biased estimators U, αiU, and SiU, determines their variances, analyses the behaviour of all estimators, and concludes that the new estimators should be used when n or K are small (at least when n≤ 50 or K≤ 3). Additionally, the case where one of the raters is a gold standard is contemplated, in which situation two new parameters arise: the conformity (the rater's capability to recognize a subject in the category i) and the predictivity (the reliability of a response i by the rater).