Generalized entropy index
The generalized entropy index has been proposed as a measure of income inequality in a population.[1] It is derived from information theory as a measure of redundancy in data. In information theory a measure of redundancy can be interpreted as non-randomness or data compression; thus this interpretation also applies to this index. In additional interpretation of the index is as biodiversity as entropy has also been proposed as a measure of diversity.[2]
Formula
The formula for general entropy for real values of 
is:
![GE(\alpha) =\begin{cases}
\frac{1}{N \alpha (\alpha-1)}\sum_{i=1}^N\left[\left(\frac{y_i}{\overline{y}}\right)^\alpha - 1\right],& \alpha \ne 0, 1,\\
\frac{1}{N}\sum_{i=1}^N\frac{y_{i}}{\overline{y}}\ln\frac{y_{i}}{\overline{y}},& \alpha=1,\\
-\frac{1}{N}\sum_{i=1}^N\ln\frac{y_{i}}{\overline{y}},& \alpha=0.
\end{cases}](/w/images/math/0/c/d/0cdcae151f2d026386c0497ff9d4a6c2.png)
where N is the number of cases (e.g., households or families), 
is the income for case i and is the weight given to distances between incomes at different parts of the income distribution.
A feature of the generalized entropy index is that it can be transformed into a subclass of the Atkinson index with 
for 
, assuming that the social welfare function is the natural logarithm. The transformation is 
. Moreover, it is the unique class of inequality measures that has the properties of the Atkinson index and which also is additive decomposable. Many popular indices, including Gini index, do not satisfy additive decomposability.[1]
Note that the generalized entropy index has several income inequality metrics as special cases. For example, GE(0) is the mean log deviation, GE(1) is the Theil index, and GE(2) is half the squared coefficient of variation.
See also
- Theil index
- Atkinson index
- Lorenz curve
- Gini coefficient
- Hoover index (a.k.a. Robin Hood index)
- Suits index
- Income inequality metrics
- Rényi entropy
