MIT_published.pdf (2.48 MB)
Download file

Exploiting MIT shocks in heterogeneous-agent economies: the impulse response as a numerical derivative

Download (2.48 MB)
journal contribution
posted on 11.04.2022, 16:09 by Kurt MitmanKurt Mitman, Per Krusell, Timo Boppart

We propose a new method for computing equilibria in heterogeneous-agent models with aggregate uncertainty. The idea relies on an assumption that linearization offers a good approximation; we share this assumption with existing linearization methods. However, unlike those methods, the approach here does not rely on direct derivation of first-order Taylor terms. It also does not use recursive methods, whereby aggregates and prices would be expressed as linear functions of the state, usually a very high-dimensional object (such as the wealth distribution). Rather, we rely merely on solving nonlinearly for a deterministic transition path: we study the equilibrium response to a single, small “MIT shock” carefully. We then regard this impulse response path as a numerical derivative in sequence space and hence provide our linearized solution directly using this path. The method can easily be extended to the case of many shocks and computation time rises linearly in the number of shocks. We also propose a set of checks on whether linearization is a good approximation. We assert that our method is the simplest and most transparent linearization technique among currently known methods. The key numerical tool required to implement it is value-function iteration, using a very limited set of state variables.

Funding

Micro Heterogeneity and Macroeconomic Policy

European Research Council

Find out more...

History

Affiliation (institution of first SU-affiliated author)

303 Institutet för internationell ekonomi (IIES) | Institute for International Economic Studies

access_level

public

access_condition

PUBLIC