In this paper we derive sorne asymptotic properties on the accuracy of numerical solutions. We sIlow tIlat the approximation error of the policy function is of the same order of magnitude as the size of the Euler equation residuals. Moreover, for bounding this approximation error tIle most relevant parameters are the discount factor and the curvature of the return function. These findings provide theoretical foundations for the construction of tests that can assess the performance of alternative computational methods.Accuracy; Euler equation residuals; value and policy functions;
There is a lack of appropriate replication of the asymptotical behaviour of stationary stochastic di...
The neoclassical growth model with quasi-geometric discounting is shown by Krusell and Smith (2000) ...
Most real life phenomena change with time, hence dynamic. Differential equations are used in mathema...
In this paper we derive sorne asymptotic properties on the accuracy of numerical solutions. We sIlow...
We propose a novel methodology for evaluating the accuracy of numeri-cal solutions to dynamic econom...
This paper suggests a method for determining rigorous upper bounds on approximation errors of numeri...
We propose a novel methodology for evaluating the accuracy of numerical solutions to dynamic economi...
Consumption Euler equations are important tools in empirical macroeconomics. When estimated on micro...
This paper considers the properties of estimators based on numerical solutions to a class of economi...
Many algorithms that provide approximate solutions for dynamic stochastic general equilibrium (DSGE)...
Published online on 25 June 2018Consumption Euler equations are important tools in empirical macroe...
The stability of a numerical methods is important consideration that must be considered when solving...
This paper is an exploration of numerical methods for solving initial-value problems for ordinary di...
In [14, 8] Kurtz and Protter resp. Jacod and Protter specify the asymptotic error distribution of th...
Abstract In the previous chapter we derived a simple finite difference method, namely the explicit E...
There is a lack of appropriate replication of the asymptotical behaviour of stationary stochastic di...
The neoclassical growth model with quasi-geometric discounting is shown by Krusell and Smith (2000) ...
Most real life phenomena change with time, hence dynamic. Differential equations are used in mathema...
In this paper we derive sorne asymptotic properties on the accuracy of numerical solutions. We sIlow...
We propose a novel methodology for evaluating the accuracy of numeri-cal solutions to dynamic econom...
This paper suggests a method for determining rigorous upper bounds on approximation errors of numeri...
We propose a novel methodology for evaluating the accuracy of numerical solutions to dynamic economi...
Consumption Euler equations are important tools in empirical macroeconomics. When estimated on micro...
This paper considers the properties of estimators based on numerical solutions to a class of economi...
Many algorithms that provide approximate solutions for dynamic stochastic general equilibrium (DSGE)...
Published online on 25 June 2018Consumption Euler equations are important tools in empirical macroe...
The stability of a numerical methods is important consideration that must be considered when solving...
This paper is an exploration of numerical methods for solving initial-value problems for ordinary di...
In [14, 8] Kurtz and Protter resp. Jacod and Protter specify the asymptotic error distribution of th...
Abstract In the previous chapter we derived a simple finite difference method, namely the explicit E...
There is a lack of appropriate replication of the asymptotical behaviour of stationary stochastic di...
The neoclassical growth model with quasi-geometric discounting is shown by Krusell and Smith (2000) ...
Most real life phenomena change with time, hence dynamic. Differential equations are used in mathema...