Confidence regions and tests for a change-point in a sequence of exponential family random variables

SUMMARY Maximum likelihood methods are used to test for a change in a sequence of independent exponential family random variables, with particular emphasis on the exponential distribution. The exact null and alternative distributions of the test statistics are found, and the power is compared with a test based on a linear trend statistic. Exact and approximate confidence regions for the change-point are based on the values accepted by a level x likelihood ratio test and a modification of the method proposed by Cox & Spj0tvoll (1982). The methods are applied to a classical data set on the time intervals between coal mine explosions, and the change in variation of stock market returns. In both cases the confidence regions for the change-point cover historical events that may have caused the changes.

[1]  E. S. Pearson,et al.  THE TIME INTERVALS BETWEEN INDUSTRIAL ACCIDENTS , 1952 .

[2]  M. Tweedie Statistical Properties of Inverse Gaussian Distributions. II , 1957 .

[3]  David R. Cox,et al.  The statistical analysis of series of events , 1966 .

[4]  David V. Hinkley,et al.  Inference about the change-point in a sequence of binomial variables , 1970 .

[5]  David V. Hinkley,et al.  Corrections and AmendmentsBiometrika (1970), 57, 477-88: ‘Inference about the change-point in a sequence of binomial variables’ , 1971 .

[6]  Marc Noe,et al.  The Calculation of Distributions of Two-Sided Kolmogorov-Smirnov Type Statistics , 1972 .

[7]  A. Scott,et al.  A Cluster Analysis Method for Grouping Means in the Analysis of Variance , 1974 .

[8]  D. Hawkins Testing a Sequence of Observations for a Shift in Location , 1977 .

[9]  G. Cobb The problem of the Nile: Conditional solution to a changepoint problem , 1978 .

[10]  D. A. Hsu,et al.  Detecting Shifts of Parameter in Gamma Sequences with Applications to Stock Price and Air Traffic Flow Analysis , 1979 .

[11]  R. Jarrett A note on the intervals between coal-mining disasters , 1979 .

[12]  S. Zacks Classical and Bayesian Approaches to the Change-Point Problem: Fixed Sample and Sequential Procedures. , 1982 .

[13]  D. Siegmund,et al.  Maximally Selected Chi Square Statistics , 1982 .

[14]  Keith J. Worsley,et al.  The power of likelihood ratio and cumulative sum tests for a change in a binomial probability , 1983 .

[15]  Edna Schechtman A conservative nonparametric distribution-free confidence bound for the shift in the changepoint problem , 1983 .

[16]  S. Panchapakesan,et al.  Inference about the Change-Point in a Sequence of Random Variables: A Selection Approach , 1988 .