Cycles of length two in monotonic models

In the context of partitional knowledge models, we prove that, in a monotonic model, any cycle equation can be obtained as the product of cycle equations corresponding to cycles of length two. Hence, if a model is monotonic, has finite states, and players' posteriors satisfy all cycle equations corresponding to cycles of length two, then these posteriors are consistent (i.e., there is a common prior). We also propose a new and elegant proof for one of the main results of Rodrigues-Neto 2012.

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Year of publication:	2012-10
Authors:	Rodrigues-Neto, José Alvaro
Institutions:	College of Business and Economics, Australian National University

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Extent:	application/pdf
Series:	ANU Working Papers in Economics and Econometrics.
Type of publication:	Book / Working Paper
Notes:	12 pages longPages
Classification:	C02 - Mathematical Methods ; D80 - Information and Uncertainty. General ; D82 - Asymmetric and Private Information ; D83 - Search, Learning, Information and Knowledge
Source:	RePEc - Research Papers in Economics

Persistent link: https://www.econbiz.de/10011107182