Inequality, Poverty, Two Invariance Conditions, and a Product Rule
Keywords:
Scale Invariance, Translation Invariance, Unit Consistency, Replication Invariance, Replication Scaling, Population Replication PrincipleAbstract
Two axioms in the measurement of inequality and poverty which are widely perceived to be innocuous and unexceptionable - although they have both been challenged in the literature - are the Scale Invariance Axiom and the Replication Invariance Axiom. These axioms have endorsed an essentially relative approach (with respect to income-size and population-size respectively) to the measurement of inequality and poverty. The present paper is an expository essay which aims to clarify the logical and ethical limitations of either a purely relative or a purely absolute approach to distributional measurement. In the process, it also reviews two proposals - due to Manfred Krtscha and Eduardo Arriaga respectively - for ‘intermediate’ measures of inequality and poverty, which moderate the ‘extreme’ values underlying relative and absolute measures by combining these opposing values in a simple product formula.
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