论文信息 - Average Run Lengths for CUSUM Schemes When Observations Are Exponentially Distributed

Average Run Lengths for CUSUM Schemes When Observations Are Exponentially Distributed

Page (1954) originally noted that it is possible to find an integral equation whose solution gives average run lengths for one-sided CUSUM schemes. Lucas and Crosier (1982), for the case of normally distributed observations, have obtained numerical solutions to Page's integral equation and used these in their study of so called fast-initial-response CUSUM charts. In this article we show that for the case of exponentially distributed observations, the Page equation can be solved without resorting to approximations. We then provide some tables of average run lengths for the exponential case and comment on an application of exponential CUSUM charts to controlling the intensity of a Poisson process.

Stephen B. Vardeman | S. Vardeman | Di-ou Ray | D. Ray

[1] James M. Lucas,et al. Counted Data CUSUM's , 1985 .

[2] E. S. Page. CONTINUOUS INSPECTION SCHEMES , 1954 .

[3] I. Eisenberger,et al. Detection of Failure Rate Increases , 1971 .

[4] Roger A. G. Marshall,et al. Cumulative sum charts for monitoring of radioactivity background count rates , 1977 .

[5] G. Barrie Wetherill,et al. Sampling Inspection and Quality Control , 1978 .

[6] Joseph J. Tsiakals. Sampling inspection and quality control , 1969 .

[7] A. Goel,et al. Determination of A.R.L. and a Contour Nomogram for Cusum Charts to Control Normal Mean , 1971 .

[8] Rina Chen,et al. A Survillance System for Congenital Malformations , 1978 .