Mean log deviation

Measure of income inequality

This is the current revision of this page, as edited by 202.7.239.227 (talk) at 22:14, 18 December 2023 (→‎Definition: Twice the MLD was written as MDL). The present address (URL) is a permanent link to this version.

(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)

In statistics and econometrics, the mean log deviation (MLD) is a measure of income inequality. The MLD is zero when everyone has the same income, and takes larger positive values as incomes become more unequal, especially at the high end.

Definition

The MLD of household income has been defined as[1]

 

where N is the number of households,   is the income of household i, and   is the mean of  . Naturally the same formula can be used for positive variables other than income and for units of observation other than households.

Equivalent definitions are

 

where   is the mean of ln(x). The last definition shows that MLD is nonnegative, since   by Jensen's inequality.

MLD has been called "the standard deviation of ln(x)",[1] (SDL) but this is not correct. The SDL is

 

and this is not equal to the MLD.

In particular, if a random variable   follows a log-normal distribution with mean and standard deviation of   being   and  , respectively, then

 

Thus, asymptotically, MLD converges to:

 

For the standard log-normal, SDL converges to 1 while MLD converges to 1/2.

Related statistics

The MLD is a special case of the generalized entropy index. Specifically, the MLD is the generalized entropy index with α=0.

References

  1. ^ 1.0 1.1 Jonathan Haughton and Shahidur R. Khandker. 2009. The Handbook on Poverty and Inequality. Washington, DC: The World Bank.

External links