Solving dynamic models with inequality constraints poses a challenging problem for two major reasons: dynamic programming techniques are reliable but often slow, while Euler equation based methods are fast but have problematic or unknown convergence properties. This paper attempts to bridge this gap. I show that a common iterative procedure on the Euler equation { 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 an arbitrarily large, but nite, set of endogenous and exogenous state-variables as well as a very broad spectrum of occasionally binding constraints
The problem of finding a feasible solution to a linear inequality system arises in numerous contexts...
The literature that conducts numerical analysis of equilibrium in models with hyperbolic (quasi-geom...
Developing explicit, high-order accurate, and stable algorithms for nonlinear differential equations...
Solving dynamic models with inequality constraints poses a challenging problem for two major reasons...
Dynamic models with inequality constraints pose a challenging prob- lem for two major reasons: Dyna...
In [17] we have shown how time-dependent optimal control for partial differential equations can be r...
We study both the value function and Q-function formulation of the Linear Programming approach to Ap...
Equality constraints are dealt with by including them directly in the inner optimization problem of ...
Optimal control problems with inequality path constraints (IPCs) are present in several engineering ...
Time-consistency is a key feature of many important policy problems, such as those relating to optim...
Abstract. We consider dynamic optimization problems for systems governed by differential inclusions....
The variational inequality problem has been utilized to formulate and study a plethora of competitiv...
Optimal control problems with inequality path constraints (IPCs) are present in several engineering ...
A description and comparison of several algorithms for approximating the solution to a model in whic...
We consider a general class of nonlinear optimal policy problems involving forward-looking constrain...
The problem of finding a feasible solution to a linear inequality system arises in numerous contexts...
The literature that conducts numerical analysis of equilibrium in models with hyperbolic (quasi-geom...
Developing explicit, high-order accurate, and stable algorithms for nonlinear differential equations...
Solving dynamic models with inequality constraints poses a challenging problem for two major reasons...
Dynamic models with inequality constraints pose a challenging prob- lem for two major reasons: Dyna...
In [17] we have shown how time-dependent optimal control for partial differential equations can be r...
We study both the value function and Q-function formulation of the Linear Programming approach to Ap...
Equality constraints are dealt with by including them directly in the inner optimization problem of ...
Optimal control problems with inequality path constraints (IPCs) are present in several engineering ...
Time-consistency is a key feature of many important policy problems, such as those relating to optim...
Abstract. We consider dynamic optimization problems for systems governed by differential inclusions....
The variational inequality problem has been utilized to formulate and study a plethora of competitiv...
Optimal control problems with inequality path constraints (IPCs) are present in several engineering ...
A description and comparison of several algorithms for approximating the solution to a model in whic...
We consider a general class of nonlinear optimal policy problems involving forward-looking constrain...
The problem of finding a feasible solution to a linear inequality system arises in numerous contexts...
The literature that conducts numerical analysis of equilibrium in models with hyperbolic (quasi-geom...
Developing explicit, high-order accurate, and stable algorithms for nonlinear differential equations...