论文信息 - AVERAGE RUN LENGTHS FOR MOVING AVERAGE CONTROL CHARTS

AVERAGE RUN LENGTHS FOR MOVING AVERAGE CONTROL CHARTS

We are interested in E [N], the mean time until the most recent k values of a sequence of independent and identically distributed random variables exceeds a specified constant. Using recent results, we present a simulation procedure for determining E [N]. These results are also used to obtain upper and lower bounds for E [N]. These bounds, however, are in terms of a quantity o that is not easily calculated. A recursive procedure for evaluating o when the data distribution is Bernoulli is given. Efficient simulation procedures for estimating o in the cases of normal and exponential population distributions are also presented, as is a Markov chain monte carlo procedure when the distribution is general.

Sheldon M. Ross

[1] THE MEAN WAITING TIME FOR A PATTERN , 1999 .

[2] S. Crowder. A simple method for studying run-length distribution of exponentially weighted moving average charts , 1987 .

[3] S. W. Roberts. Control chart tests based on geometric moving averages , 2000 .

[4] S. Ross. Using the Importance Sampling Identity to Bound Tail Probabilities , 1998, Probability in the Engineering and Informational Sciences.

[5] F. Hwang,et al. A Simple Relation between the Pattern Probability and the Rate of False Signals in Control Charts , 1996, Probability in the Engineering and Informational Sciences.

[6] Donald Geman,et al. Stochastic Relaxation, Gibbs Distributions, and the Bayesian Restoration of Images , 1984, IEEE Transactions on Pattern Analysis and Machine Intelligence.