Difference between revisions of "Aumann's agreement theorem"

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'''Aumann's agreement theorem''', informally stated, says that two people acting rationally (in a certain precise sense) and with [[common knowledge]] of each other's beliefs cannot agree to disagree.  More specifically, if two people are genuine [[Bayesian]]s, share common [[priors]], and have common knowledge of each person's current probability assignments, then they must have equal probability assignments after becoming aware of any discrepencies.
 
'''Aumann's agreement theorem''', informally stated, says that two people acting rationally (in a certain precise sense) and with [[common knowledge]] of each other's beliefs cannot agree to disagree.  More specifically, if two people are genuine [[Bayesian]]s, share common [[priors]], and have common knowledge of each person's current probability assignments, then they must have equal probability assignments after becoming aware of any discrepencies.
  
==See Also==
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==See also==
  
 
*[[Disagreement]]
 
*[[Disagreement]]

Revision as of 01:43, 26 June 2009

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Aumann's agreement theorem, informally stated, says that two people acting rationally (in a certain precise sense) and with common knowledge of each other's beliefs cannot agree to disagree. More specifically, if two people are genuine Bayesians, share common priors, and have common knowledge of each person's current probability assignments, then they must have equal probability assignments after becoming aware of any discrepencies.

See also

Blog posts

External references

  • Robert J. Aumann (1976). "Agreeing to Disagree". The Annals of Statistics 4 (6): 1236-1239. ISSN 00905364.  (PDF)
  • Tyler Cowen and Robin Hanson (2004). Are Disagreements Honest?.  (PDF, Talk video)