Fragility of asymptotic agreement under Bayesian learning
Our rough guess is there are 10,500 words in this book.
At a pace averaging 250 words per minute, this book will take 0 hours and 42 minutes to read. With a half hour per day, this will take 2 days to read.
How long will it take you?
This book will take an estimated to read at a reading speed averaging words per minute. With 30 minutes per day, this will take to read.
Enter your reading speedYou can take one of our WPM reading speed tests to find your reading speed.
Create a free account to track your reading progress, build your reading list, and set reading goals.
Author
Contributions
- Chernozhukov, Victor - Contributor
- Yildiz, Muhamet - Contributor
- Massachusetts Institute of Technology. Dept. of Economics - Contributor
Publication
2008 - Massachusetts Institute of Technology, Dept. of Economics, Cambridge, MA, Massachusetts
Language
English
Word Count
10,500 words, Guess
Page Count
42 pages
Identifiers
- Internet Archivefragilityofasymp00acem
- OCLC Control Number253666834
- Open LibraryOL24643560M
Description
Under the assumption that individuals know the conditional distributions of signals given the payoff-relevant parameters, existing results conclude that as individuals observe infinitely many signals, their beliefs about the parameters will eventually merge. We first show that these results are fragile when individuals are uncertain about the signal distributions: given any such model, a vanishingly small individual uncertainty about the signal distributions can lead to a substantial (non-vanishing) amount of differences between the asymptotic beliefs. We then characterize the conditions under which a small amount of uncertainty leads only to a small amount of asymptotic disagreement. According to our characterization, this is the case if the uncertainty about the signal distributions is generated by a family with "rapidly-varying tails" (such as the normal or the exponential distributions). However, when this family has "regularly-varying tails" (such as the Pareto, the log-normal, and the t-distributions), a small amount of uncertainty leads to a substantial amount of asymptotic disagreement. Keywords: asymptotic disagreement, Bayesian learning, merging of opinions. JEL Classifications: C11, C72, D83.
Subjects
Series Statement
- Working paper series / Massachusetts Institute of Technology, Dept. of Economics -- working paper 08-09
- Working paper (Massachusetts Institute of Technology. Dept. of Economics) -- no. 08-09.
Reader Reviews
No reviews yet for this book.
Be the first to share your thoughts!