Evaluating the discriminatory power of EQ-5D, HUI2 and HUI3 in a US general population survey using Shannon’s indices

A publicly available dataset was used (at http://​www.​ahrq.​gov/​rice/​), resulting from the US EQ-5D valuation study [21, 22]. Collected data consisted of self-completed EQ-5D and HUI2/3 data from a sample of the general adult US population, with an over-sampling of Hispanics and non-Hispanic Blacks. The HUI2/3 data were collected using a standardized 15-item questionnaire, from which HUI2 and HUI3 health profiles were extracted using available recoding algorithms [23]. Only the responses of 3,691 respondents who had no missing data on any of the three instruments were included in this study (91.2% of the total number of respondents).

The EQ-5D descriptive system consists of 5 dimensions (items) with 3 levels each, logically defining 243 unique health states (permutations). The HUI2 was originally developed to assess outcomes in survivors of cancer in childhood and contains 6 dimensions (excluding the original HUI2 dimension of fertility) with 4–5 levels per dimension. The HUI3, originally developed for a general population health survey in Canada, has 8 dimensions with 5–6 levels per dimension. The HUI2 and HUI3 descriptive systems define 8,000 and 972,000 unique health states, respectively [6]. Table 1 compares the 5 dimensions common to at least two of the classification systems: Mobility/Ambulation; Anxiety/Depression/Emotion; Pain/Discomfort (EQ-5D; HUI2; HUI3); Self-Care (EQ-5D; HUI2); and Cognition (HUI2; HUI3).

The Shannon index, named after Claude Shannon who is considered to be the founder of information theory, was initially developed to separate noise from information carrying signals in telecommunication systems [17]. The Shannon index is also known as the Shannon–Weaver index because of Warren Weaver’s contribution to Shannon’s original paper, and as the Shannon–Wiener index named after Norbert Wiener who independently developed a concept similar to Shannon’s [24, 25]. The Shannon index has been applied in a variety of fields, ranging from ecology (as a measure of biodiversity) to psychology, record linkage and molecular biology (genetic diversity) [26‐30].

In information theory, the information of a signal is distinguished from the meaning or the semantic content of a signal. Rather, the information is quantified and is identified with uncertainty. Informativity is dependent on the number of classes (e.g. bits or response options) and the distribution of the observations (the ‘signal’) among classes. For classifications, this implies that if one would want to develop a useful (informative) distinction between, say, European countries, distinguishing between Scandinavian and non-Scandinavian countries would be far less informative than distinguishing between Northern, Western, Eastern and Southern European countries. Note that the latter classification not only contains more categories but the countries are also more evenly distributed among categories.

The Shannon index is defined as: where H′ represents the absolute amount of informativity captured, C is the number of possible categories (levels or permutations in this study), and p _i  = n _i /N, the proportion of observations in the ith category (i = 1,...,C), where n _i is the observed number of scores (responses) in category i and N is the total sample size [17]. Any log base can be used, as long as one is consistent. Using log base 2, as did Shannon, allows the interpretation of the resulting units as bits per individual. The higher the index H′ is, the more information is captured by the system. In case of a homogeneous (rectangular) distribution, i.e. ratings are evenly distributed among categories (p _i  = p* for all i), the optimal amount of information is captured and H′ has reached its maximum (H′_max) which equals log₂ C. If the number of categories (C) is increased, H′_max increases accordingly but H′ will only increase if the newly added categories are actually used. The variance of the Shannon index is defined as [31]: Accordingly, standard errors and 95% confidence intervals can be calculated.

The Shannon index combines the absolute information content as expressed by the number of categories with the extent to which the information is evenly spread over these categories. Shannon’s Evenness index (J′) exclusively reflects the latter component, i.e. the rectangularity of a distribution. This measure was first proposed by Lloyd and Ghelardi [32]; Shannon already referred to it as relative entropy and Pielou termed the concept ‘evenness’ [17, 33]. Shannon’s Evenness index (J′) is defined as: J′ = H′/H′_max, which expresses the use of the system (H′) given its potential (H′_max). Shannon’s index H′ can be considered as an expression of the absolute informativity of a system whereas Shannon’s Evenness index J′ expresses the relative informativity of a system or ‘evenness’ of a distribution, regardless the number of categories.

Two alternative measures of (bio)diversity are the Simpson and the Brillouin index. We used the Shannon index, since the Brillouin index is dependent on sample size and the Simpson index gives very little weight to categories that are rarely occupied [26, 34, 35].

The basic characteristics of Shannon’s indices which make them suitable to reflect discriminatory power have been documented and are explained as follows. In an item where a response option has a very high (or low) endorsement, e.g. p is over 0.95 (or under 0.05), one learns very little because one can predict with more than 95% certainty what the answer will be. In other words, there is very little information being transmitted. Conversely, the maximum amount of information (uncertainty) is being transmitted when, in an item with two response options, p is 0.50 for each response option. As described above, this characteristic of an even distribution underlies the Shannon indices. In case of an even distribution, the item (dimension) is being most efficiently used, which means that the discriminant ability of the level descriptors is maximal.

The Shannon indices can be calculated by dimension separately or by MAUI as a whole. To calculate Shannon’s indices by dimension, levels are treated as categories, so C represents the number of levels (L), p _i is the proportion of responses of the i ^th level, and H′_max equals log₂ L. Suppose the EQ-5D Mobility dimension is scored by 10 respondents: no problems (n = 6), some problems (n = 3) and confined to bed (n = 1). Shannon’s index for Mobility is calculated as H′ = –((0.6 log₂ 0.6) + (0.3 log₂ 0.3) + (0.1 log₂ 0.1)) = 1.30 and H′_max = log₂3  =  1.58, so J′ = 1.30/1.58 = 0.82.

Figure 1 illustrates the difference between absolute and relative informativity (H′, evenness J′) relative to the number of levels (L) in a series of hypothetical health classification systems designed to describe the same underlying dimension. For illustrative purposes we consider only one dimension. Figure 1a shows two distributions of responses corresponding to two different classification systems, both of which have 3 levels; one system results in a skewed distribution while the other results in a rectangular distribution. Assuming these responses are obtained within the same population, the system that yields the rectangular distribution is superior in discriminating between patients and the Shannon indices have both reached their maximum values. Figure 1b illustrates the concept of relative informativity. The left panel shows the same skewed distribution as depicted in Figure 1a, the right panel shows the same distribution of responses but now as it results from a 5 level classification system in which levels 2 and 4 are unused. Absolute informativity (Shannon’s H′) remains unchanged but J′ decreases, expressing lower relative informativity. Clearly, adding 2 extra levels that do not represent anyone in the population (no individual shifts from a current level to any of the new levels) does not lead to a gain in absolute informativity (H′) while the potential of a 5 level system is underutilized, compared to a 3 level system, which is expressed by a lower J′. So why not use just the Shannon Evenness index? Figure 1c shows the added value of absolute informativity (the H′ index). If the 3 and 5 level systems both yield rectangular distributions, evenness J′ will be the same but obviously H′ increases since the 5 level system is much more refined in discriminating between patients.

To calculate Shannon’s indices by instrument as a whole, permutations are treated as unique categories (e.g. 243 categories for EQ-5D), so C is the number of permutations (P _max), p _i is the proportion of the ith permutation, and H′ _max now equals log₂ P _max.

Since the number of observations in our study (N = 3,691) is lower than the number of theoretically possible permutations in HUI2 (8,000) and HUI3 (972,000), maximum informativity (H′_max) in HUI2 and HUI3, and consequently maximum relative informativity J′ cannot be reached a priori. Therefore, Shannon’s indices by MAUI as a whole were calculated using an estimation approach. Assuming that the current sample is representative, subsamples of the original set of observed health states were drawn in order to estimate the number of different health states in hypothetical populations of 1, 10, and 100 million respondents, by means of extrapolation. This procedure was repeated for different proportions of the population in relation to the number of health states (e.g. 11 different EQ-5D health states accounted for a 90% proportion of the respondents), in order to estimate the shape of the frequency distribution in the hypothetical populations of 1, 10, and 100 million respondents. Finally, Shannon’s H′ and J′ could be calculated (details can be obtained from the authors).