Operational identification of the complete class of superlative index numbers: An application of Galois theory
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Publication:924923
DOI10.1016/J.JMATECO.2006.05.002zbMath1135.91347OpenAlexW2022532602MaRDI QIDQ924923
Ki-Hong Choi, William A. Barnett
Publication date: 29 May 2008
Published in: Journal of Mathematical Economics (Search for Journal in Brave)
Full work available at URL: https://mpra.ub.uni-muenchen.de/416/1/MPRA_paper_416.pdf
Galois theoryaggregator function spacedivisia line integralsexact index numberssuperlative index number class
Separable extensions, Galois theory (12F10) Microeconomic theory (price theory and economic markets) (91B24)
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Cites Work
- Implicit separability: Characterisation and implications for consumer demands
- Exact and superlative index numbers
- The Sato-Vartia index and the monotonicity axiom
- The Global Properties of the Minflex Laurent, Generalized Leontief, and Translog Flexible Functional Forms
- Recursive Subaggregation and a Generalized Hypocycloidal Demand Model
- Superlative Index Numbers and Consistency in Aggregation
- Theoretical Foundations for the Rotterdam Model
- The Joint Allocation of Leisure and Goods Expenditure
- Divisia Index Numbers
- Axiomatic Price Index Theory: A Survey
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