Approximating highdimensional dynamic models: Sieve value function iteration

dc.contributor.author

Arcidiacono, P

dc.contributor.author

Bayer, P

dc.contributor.author

Bugni, FA

dc.contributor.author

James, J

dc.date.accessioned

2016-12-01T18:48:24Z

dc.date.available

2016-12-01T18:48:24Z

dc.date.issued

2013-01-01

dc.description.abstract

Many dynamic problems in economics are characterized by large state spaces which make both computing and estimating the model infeasible. We introduce a method for approximating the value function of highdimensional dynamic models based on sieves and establish results for the (a) consistency, (b) rates of convergence, and (c) bounds on the error of approximation. We embed this method for approximating the solution to the dynamic problem within an estimation routine and prove that it provides consistent estimates of the modelik's parameters. We provide Monte Carlo evidence that our method can successfully be used to approximate models that would otherwise be infeasible to compute, suggesting that these techniques may substantially broaden the class of models that can be solved and estimated. Copyright © 2013 by Emerald Group Publishing Limited.

dc.identifier.issn

0731-9053

dc.identifier.uri

https://hdl.handle.net/10161/13086

dc.publisher

Emerald Group Publishing Limited

dc.relation.ispartof

Advances in Econometrics

dc.relation.isversionof

10.1108/S0731-9053(2013)0000032002

dc.title

Approximating highdimensional dynamic models: Sieve value function iteration

dc.type

Journal article

pubs.begin-page

45

pubs.end-page

95

pubs.organisational-group

Duke

pubs.organisational-group

Duke Population Research Center

pubs.organisational-group

Duke Population Research Institute

pubs.organisational-group

Economics

pubs.organisational-group

Sanford School of Public Policy

pubs.organisational-group

Trinity College of Arts & Sciences

pubs.publication-status

Published

pubs.volume

31

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