An Optimal Property of S2 Charts.

Abstract

Let tau sub 1 be the class of all procedures for monitoring the variance of a process at level alpha using control charts based on statistics (T (Y1), T(Y2),...) from independent random samples. Suppose the control variance squared sigma sub zero is known. Under Gaussian assumptions the squared S chart using the sample variance is shown to be optimal in the class tau sub 1 in that its run length is stochastically smallest under both stationary and drifting processes not in control. Weaker properties are given in terms of stochastic bounds when squared sigma sub zero is not known and instead is estimated in a base period using the sample variance. (Author)

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Document Details

Document Type
Technical Report
Publication Date
Jun 01, 1981
Accession Number
ADA103521

Entities

People

  • D. R. Jensen

Organizations

  • Virginia Tech

Tags

DTIC Thesaurus Topics

  • Abstracts
  • Data Science
  • Gaussian Processes
  • Information Science
  • Military Research
  • Monitoring
  • New York
  • Probability
  • Quality Control
  • Sampling
  • Stationary
  • Stationary Processes
  • Statistical Samples
  • Statistics
  • Theorems
  • Universities
  • Virginia

Fields of Study

  • Mathematics

Readers

  • Adaptive Control and Estimation with Uncertainty in Dynamic Systems.
  • Regression Analysis.