Abstract

This paper proposes a dynamic proportional hazard (PH) model with non-specified baseline hazard for the modelling of autoregressive duration processes. By employing a categorization of the underlying durations we reformulate the PH model as an ordered response model based on extreme value distributed errors. In order to capture persistent serial dependence in the duration process, we extend the model by an observation driven ARMA dynamic based on generalized errors. We illustrate the maximum likelihood estimation of both the model parameters and discrete points of the underlying unspecified baseline survivor function. The dynamic properties of the model as well as the estimation quality are investigated in a Monte Carlo study. It is illustrated that the model is a useful approach to estimate conditional failure probabilities based on (persistent) serially dependent duration data which might be subject to censoring mechanisms. In an empirical study based on financial transaction data we apply the model to estimate conditional asset price change probabilities. An evaluation of the forecasting properties of the model shows that the proposed approach is a promising competitor to well-established ACD type models.

Recommended Citation

Frank Gerhard and Nikolaus Hautsch (2007) "A Dynamic Semiparametric Proportional Hazard Model", Studies in Nonlinear Dynamics & Econometrics: Vol. 11: No. 2, Article 1.
http://www.bepress.com/snde/vol11/iss2/art1

Related Files

SACPH_SNDE.zip (52 kB)
Gauss code & data for SACPH model
gerhard_datacode.zip (52 kB)
Data and code