Open AccessInequality Constraints and Euler Equation‐based Solution Methods
Author(s) -
Rendahl Pontus
Publication year - 2015
Publication title -
the economic journal
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 4.683
H-Index - 160
eISSN - 1468-0297
pISSN - 0013-0133
DOI - 10.1111/ecoj.12115
Subject(s) - convergence (economics) , set (abstract data type) , euler's formula , sequence (biology) , euler equations , range (aeronautics) , mathematical optimization , mathematics , dynamic programming , iterative method , euler method , computer science , economics , mathematical analysis , materials science , biology , composite material , genetics , programming language , economic growth
Solving dynamic models with inequality constraints poses a challenging problem for two major reasons: dynamic programming techniques are reliable but often slow, whereas Euler equation‐based methods are faster but have problematic or unknown convergence properties. This study attempts to bridge this gap. I show that a common iterative procedure on the first‐order conditions – usually referred to as time iteration – delivers a sequence of approximate policy functions that converges to the true solution under a wide range of circumstances. These circumstances extend to a large set of endogenous and exogenous state variables as well as a very broad spectrum of occasionally binding constraints.
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