Sourushe Zandvakili scite author profile

In this paper we consider the use of bootstrap methods to compute interval estimates and perform hypothesis tests for decomposable measures of economic inequality. The bootstrap potentially represents a significant gain over available asymptotic intervals because it provides an easily implemented solution to the Behrens-Fisher problem. Two applications of this approach, using the PSID (for the study of taxation) and the XLSY (for the study of youth inequality), to the Gini coefficient and Theil's entropy measures of inequality, are provided. The results suggest that (i) statistical inference is essential even when large samples are available, and (ii) the bootstrap appears to perform well in this setting. 'Cowell(1989a) is a notable esception. 2See, for example, Gastwirth (19i4), Gastwirth et al. (1986) and Cowell (1989a). (1994) provides a thorough review and some examples of use of asymptotic results. 1 Maasoumi small sample properties of these intervals are not known. Further, all the decomposable inequality measures used in the literature are bounded (e.g. the Gini coefficient lies in the [0, l] ' t m erval), so that application of standard asymptotic results may lead to estimated intervals that extend beyond the theoretical bounds of a particular measure (e.g. a negative lower bound for Gini). An alternative method for computing probability intervals is to bootstrap. The bootstrap provides interval estimates drawn from the small sample distribution. These interval estimates have been shown to be superior to asymptotic intervals both the-3 oretically and in a variety of applications.. Bootstrap intervals are computationally inexpensive and easy to calculate, the same method applies to all the inequality measures used in the literature, and the bootstrap method automatically takes into account any bounds that, apply to a particular measure. Further, since bootstrap intervals computed using the percentile met.hod have a clear Bayesian interpretation, they provide a straightforward solution to the Behrens-Fisher problem of comparing means from two distributions (see section 3).

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A class of generalized measures of mobility with applications

Maasoumi

Zandvakili

1986

Economics Letters

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Generalized entropy measures of mobility for different sexes and income levels

Maasoumi

Zandvakili

1990

Journal of Econometrics

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Income Inequality among Female Heads of Households: Racial Inequality Reconsidered

Zandvakili

1999

Economica

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Final version received 2 February 1998. This paper investigates the factors that might have influenced earnings inequality among female heads of households over an extended period. The study used the generalized entropy measures of inequality in short-run as well as long-run income for the period 1978-86. The results suggest that short-run inequality has generally increased. These fluctuations are due partially to the existence of transitory components which distort our view. The measured longrun inequality shows a decline in the early years because of the smoothing of the transitory components. Race in conjunction with age, education and marital status is used to investigate their effects. Race and education are shown to be the most influential factors. The mobility profiles show the existence of permanent inequality among female heads of households.

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