Title :
Quadratic statistics for the goodness-of-fit test of the inverse Gaussian distribution
Author :
Pavur, Robert J. ; Edgeman, Rick L. ; Scott, Robert C.
Author_Institution :
North Texas Univ., Denton, TX, USA
fDate :
3/1/1992 12:00:00 AM
Abstract :
The problem of using a quadratic test to examine the goodness-of-fit of an inverse Gaussian distribution with unknown parameters is discussed. Tables of approximate critical values of Anderson-Darling, Cramer-von Mises, and Watson test statistics are presented in a format requiring only the sample size and the estimated value of the shape parameter. A relationship is found between the sample size and critical values of these test statistics, thus eliminating a need to interpolate among sample sizes given in the table. A power study showed that the proposed modified goodness-of-fit procedures have reasonably good power
Keywords :
failure analysis; reliability theory; statistical analysis; Anderson-Darling test statistics; Cramer-von Mises test statistics; Watson test statistics; goodness-of-fit test; inverse Gaussian distribution; quadratic statistics; reliability; shape parameter; unknown parameters; Analysis of variance; Gaussian distribution; Maximum likelihood estimation; Quality control; Reliability theory; Shape; Statistical analysis; Statistical distributions; Surges; Testing;
Journal_Title :
Reliability, IEEE Transactions on
