Preference symmetries, partial differential equations, and functional forms for utility
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Volume
49
Pagination
266 - 277 (11)
Publisher
Publisher URL
DOI
10.1016/j.jmateco.2013.03.001
Journal
Journal of Mathematical Economics
Issue
ISSN
0304-4068
Metadata
Show full item recordAbstract
A discrete symmetry of a preference relation is a mapping from the domain of choice to itself under which preference comparisons are invariant; a continuous symmetry is a one-parameter family of such transformations that includes the identity; and a symmetry field is a vector field whose trajectories generate a continuous symmetry. Any continuous symmetry of a preference relation implies that its representations satisfy a system of PDEs. Conversely the system implies the continuous symmetry if the latter is generated by a field. Moreover, solving the PDEs yields the functional form for utility equivalent to the symmetry. This framework is shown to encompass a variety of representation theorems related to univariate separability, multivariate separability, and homogeneity, including the cases of Cobb–Douglas and CES utility
Authors
TYSON, CJURI
http://www.sciencedirect.com/science/article/pii/S0304406813000256http://qmro.qmul.ac.uk/xmlui/handle/123456789/7659
Collections
- Economics and Finance [285]
