Estimation of a Change Point in Multiple Regression Models
- 1 November 1997
- journal article
- Published by MIT Press in The Review of Economics and Statistics
- Vol. 79 (4) , 551-563
- https://doi.org/10.1162/003465397557132
Abstract
This paper studies the least squares estimation of a change point in multiple regressions. Consistency, rate of convergence, and asymptotic distributions are obtained. The model allows for lagged dependent variables and trending regressors. The error process can be dependent and heteroskedastic. For nonstationary regressors or disturbances, the asymptotic distribution is shown to be skewed. The analytical density function and the cumulative distribution function for the general skewed distribution are derived. The analysis applies to both pure and partial changes. The method is used to analyze the response of market interest rates to discount rate changes.Keywords
This publication has 16 references indexed in Scilit:
- Least Absolute Deviation Estimation of a ShiftEconometric Theory, 1995
- LEAST SQUARES ESTIMATION OF A SHIFT IN LINEAR PROCESSESJournal of Time Series Analysis, 1994
- Limit theorems for change in linear regressionJournal of Multivariate Analysis, 1994
- Tests for Parameter Instability and Structural Change With Unknown Change PointEconometrica, 1993
- Searching for a Break in GNPJournal of Business & Economic Statistics, 1992
- Strong Laws for Dependent Heterogeneous ProcessesEconometric Theory, 1991
- Laws of Large Numbers for Dependent Non-Identically Distributed Random VariablesEconometric Theory, 1988
- Maximum likelihood estimation of a change-point in the distribution of independent random variables: General multiparameter caseJournal of Multivariate Analysis, 1987
- The minimum of an additive process with applications to signal estimation and storage theoryProbability Theory and Related Fields, 1976
- Generalization of an inequality of KolmogorovActa Mathematica Hungarica, 1955