$McMaster University$

Graduate Program in Statistics

SPEAKER:: Hon Keung Tony Ng; Department of Mathematics and Statistics; McMaster University.

TITLE:: On Estimation of the Correlation Coefficient and Testing of Independence in the Moran-Downtown Bivariate and Multivariate Exponential Distributions.

ABSTRACT:: In this talk, I will discuss some estimators for the correlation coefficient $\rho$ in Moran-Downton bivariate exponential distribution and introduce two simple bias-reduced estimators. I will also discuss the use of jackknife method in order to reduce the bias of all these estimators. Using Monte Carlo simulations, I will then compare the performance of all these estimators. Next, I will generalize the proposed estimators to pooled estimators for the correlation coefficient $\rho$ in equicorrelated multivariate exponential distribution. I will also discuss the maximum likelihood estimators and their asymptotic properties. Once again, using Monte Carlo simulations, I will compare the performance of these estimators. Finally, I will propose some test statistic (based on these estimators) for testing the total independence of bivariate and multivariate exponential variables. A comparison of the power performance of these tests will be briefly made.

About the Speaker: H. K. T. Ng is a Ph.D. candidate in statistics at McMaster University, Hamilton, Canada. He received the B.Sc.(Hon.) (1997) and M.Phil. (1999) in statistics from the Chinese University of Hong Kong, and the M.Sc. (2000) in statistics from McMaster University, Canada. His research interests include order statistics, reliability theory and analysis of censored data.

References

The following are background references and the paper on which the talk is based. All references are available at the Thode library.

Al-Saadi, S. D., Scrimshaw, D. F. and Young, D. H. (1979) Tests for independence of exponential variables, Journal of Statistical Computation and Simulation, 9, 217-233.
Al-Saadi, S. D. and Young, D. H. (1980) Estimators for the correlation coefficient in a bivariate exponential distribution, Journal of Statistical Computation and Simulation, 11, 13-20.
Al-Saadi, S. D. and Young, D. H. (1982) A test for independence in a multivariate exponential distribution with equal correlation coefficient, Journal of Statistical Computation and Simulation, 14. 219-227.
Balakrishnan, N. and Ng, H. K. T. (2001) Improved estimation of the correlation coefficient in a bivariate exponential distribution, Journal of Statistical Computation and Simulation, 68, 173-184.