We show that the Value Function Iteration (VFI) algorithm has difficulties approximating models with jump discontinuities in policy functions. We find that VFI fails to accurately identify both the location and size of jump discontinuities while the Endogenous Grid Method (EGM) and the Finite Element Method (FEM) are much better at approximating this class of models. We further show that combining value function iteration with a local interpolation step (VFI-INT) is sufficient to obtain accurate approximations. Differences between policy functions generated by VFI and these alternative methods are economically significant. We highlight that these differences across methods cannot be identified using Euler equation errors as these are not a ...
One method for valuing path-dependent options is the augmented state space approach described in Hul...
We discuss a number of numerical methods that approximate the solution of the Partial Integro Differ...
Many algorithms that provide approximate solutions for dynamic stochastic general equilibrium (DSGE)...
Value function iteration is one of the Standard tools for the solution of dynamic general equilibriu...
AbstractIn this paper, we analyze a discretized version of the dynamic programming algorithm for a p...
We propose a novel methodology for evaluating the accuracy of numerical solutions to dynamic economi...
Various valuation adjustments, or XVAs, can be written in terms of non-linear PIDEs equivalent to FB...
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 numeri-cal solutions to dynamic econom...
During the Great Recession, the U.S. Federal Reserve lowered policy rates to zero, introducing a kin...
This paper studies fitted value iteration for continuous state dynamic programming using nonexpansiv...
This paper is an overview of recent results by Kolodko and Schoenmakers (2006), Bender and Schoenmak...
This paper provides a general framework for the quantitative analysis of stochastic dynamic models. ...
summary:The paper presents a discontinuous Galerkin method for solving partial integro-differential ...
Various valuation adjustments (XVAs) can be written in terms of nonlinear partial integro-differenti...
One method for valuing path-dependent options is the augmented state space approach described in Hul...
We discuss a number of numerical methods that approximate the solution of the Partial Integro Differ...
Many algorithms that provide approximate solutions for dynamic stochastic general equilibrium (DSGE)...
Value function iteration is one of the Standard tools for the solution of dynamic general equilibriu...
AbstractIn this paper, we analyze a discretized version of the dynamic programming algorithm for a p...
We propose a novel methodology for evaluating the accuracy of numerical solutions to dynamic economi...
Various valuation adjustments, or XVAs, can be written in terms of non-linear PIDEs equivalent to FB...
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 numeri-cal solutions to dynamic econom...
During the Great Recession, the U.S. Federal Reserve lowered policy rates to zero, introducing a kin...
This paper studies fitted value iteration for continuous state dynamic programming using nonexpansiv...
This paper is an overview of recent results by Kolodko and Schoenmakers (2006), Bender and Schoenmak...
This paper provides a general framework for the quantitative analysis of stochastic dynamic models. ...
summary:The paper presents a discontinuous Galerkin method for solving partial integro-differential ...
Various valuation adjustments (XVAs) can be written in terms of nonlinear partial integro-differenti...
One method for valuing path-dependent options is the augmented state space approach described in Hul...
We discuss a number of numerical methods that approximate the solution of the Partial Integro Differ...
Many algorithms that provide approximate solutions for dynamic stochastic general equilibrium (DSGE)...