Abstract
The half-life is defined as the number of periods required for the impulse response to a unit shock to a time series to dissipate by half. It is widely used as a measure of persistence, especially in international economics to quantify the degree of mean-reversion of the deviation from an international parity condition. Several studies have proposed bias-corrected point and interval estimation methods. However, they have found that the confidence intervals are rather uninformative with their upper bound being either extremely large or infinite. This is largely due to the distribution of the half-life estimator being heavily skewed and multi-modal. A bias-corrected bootstrap procedure for the estimation of half-life is proposed, adopting the highest density region (HDR) approach to point and interval estimation. The Monte Carlo simulation results reveal that the bias-corrected bootstrap HDR method provides an accurate point estimator, as well as tight confidence intervals with superior coverage properties to those of its alternatives. As an application, the proposed method is employed for half-life estimation of the real exchange rates of 17 industrialized countries. The results indicate much faster rates of mean-reversion than those reported in previous studies.
Highlights
Measuring the degree of mean-reversion or persistence in economic and financial time series has been an issue of extensive investigation
We propose a method of constructing a confidence interval for the half-life by estimating the distribution nonparametrically and computing the highest density region (HDR) using the algorithm given in Hyndman (1996)
We found that the HDR point estimator and HDR* interval estimator show desirable properties similar to those reported above
Summary
Measuring the degree of mean-reversion or persistence in economic and financial time series has been an issue of extensive investigation (see, for example, Campbell and Mankiw; 1987, 1989). It is important in the context of testing for the validity of parity conditions in international economics. There are three noteworthy statistical properties of h It has an unknown and possibly intractable distribution. It may not possess finite sample moments since it takes extreme values as αapproaches one. For an AR(p) model with p > 1, hcan be obtained from the impulse response function, and its statistical properties are similar to those in the AR(1) case
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