Abstract
This paper develops a general framework for models, static or dynamic, in which agents simultaneously make both discrete and continuous choices. I show that such models are nonparametrically identified. Based on the constructive identification arguments, I build a novel two-step estimation method in the lineage of Hotz and Miller (1993) but extended to discrete and continuous choice models. The method is especially attractive for complex dynamic models because it significantly reduces the computational burden associated with their estimation. To illustrate my new method, I estimate a dynamic model of female labor supply and consumption.
Keywords
Discrete and continuous choice; dynamic model; identification; structural estimation; female labor supply;
Reference
Christophe Alain Bruneel-Zupanc, “Discrete-Continuous Dynamic Choice Models: Identification and Conditional Choice Probability Estimation”, TSE Working Paper, n. 21-1185, February 2021.
See also
Published in
TSE Working Paper, n. 21-1185, February 2021