 Bunching and Rank-Dependent Optimal Income TaxationLaurent Simula and Alain Trannoy No 8443, CESifo Working Paper Series from CESifo Abstract: We consider optimal non-linear income tax problems when the social welfare function only depends on ranks as in Yaari (1987) and weights agree with the Lorenz quasi-ordering. Gini, S-Gini, and a class putting more emphasis on inequality in the upper part of the distribution belong to this set. Adopting a first-order approach, we establish marginal tax formula assuming a continuous population framework, and derive conditions on the primitives of the model for which the socially optimal allocation is either fully separating or involves some bunching. For all log-concave survival functions, bunching is precluded for the maximin, Gini, and ”illfare-ranked single-series Ginis”. We then turn to a discrete population setting, and provide ”ABC” formulas for optimal marginal tax rates, which are related to those for a continuum of types but remain essentially distinct. Keywords: rank dependence; Gini; optimal income taxation; bunching; log-concavity (search for similar items in EconPapers) Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:ces:ceswps:_8443 Access Statistics for this paper More papers in CESifo Working Paper Series from CESifo Contact information at EDIRC. |
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