English

Indirect Inference With(Out) Constraints

Statistics Theory 2019-08-21 v3 Economics Methodology Statistics Theory

Abstract

Indirect Inference (I-I) estimation of structural parameters θ\theta {{requires matching observed and simulated statistics, which are most often generated using an auxiliary model that depends on instrumental parameters β\beta.}} {The estimators of the instrumental parameters will encapsulate} the statistical information used for inference about the structural parameters. As such, artificially constraining these parameters may restrict the ability of the auxiliary model to accurately replicate features in the structural data, which may lead to a range of issues, such as, a loss of identification. However, in certain situations the parameters β\beta naturally come with a set of qq restrictions. Examples include settings where β\beta must be estimated subject to qq possibly strict inequality constraints g(β)>0g(\beta) > 0, such as, when I-I is based on GARCH auxiliary models. In these settings we propose a novel I-I approach that uses appropriately modified unconstrained auxiliary statistics, which are simple to compute and always exists. We state the relevant asymptotic theory for this I-I approach without constraints and show that it can be reinterpreted as a standard implementation of I-I through a properly modified binding function. Several examples that have featured in the literature illustrate our approach.

Keywords

Cite

@article{arxiv.1607.06163,
  title  = {Indirect Inference With(Out) Constraints},
  author = {David T. Frazier and Eric Renault},
  journal= {arXiv preprint arXiv:1607.06163},
  year   = {2019}
}
R2 v1 2026-06-22T14:59:58.758Z