A process control method based on five-parameter generalized lambda distribution

[1]  Pei-Hsi Lee,et al.  ARL Performance of the Tukey's Control Chart , 2008, Commun. Stat. Simul. Comput..

[2]  Muhammad Riaz,et al.  A Dispersion Control Chart , 2008, Commun. Stat. Simul. Comput..

[3]  Ofodike A. Ezekoye,et al.  Treatment of design fire uncertainty using Quadrature Method of Moments , 2008 .

[4]  Juha Karvanen,et al.  Characterizing the generalized lambda distribution by L-moments , 2008, Comput. Stat. Data Anal..

[5]  Steve Su,et al.  Numerical maximum log likelihood estimation for generalized lambda distributions , 2007, Comput. Stat. Data Anal..

[6]  William H. Asquith L-moments and TL-moments of the generalized lambda distribution , 2007, Comput. Stat. Data Anal..

[7]  Suresh Chand,et al.  Estimating the limits for statistical process control charts: A direct method improving upon the bootstrap , 2007, Eur. J. Oper. Res..

[8]  Maxence Bigerelle,et al.  Application of the generalized lambda distributions in a statistical process control methodology , 2006 .

[9]  Todd C. Headrick,et al.  On simulating multivariate non-normal distributions from the generalized lambda distribution , 2006, Comput. Stat. Data Anal..

[10]  Maxence Bigerelle,et al.  Application of Lambda Distributions and Bootstrap analysis to the prediction of fatigue lifetime and confidence intervals , 2006 .

[11]  A. Tarsitano Estimation of the Generalized Lambda Distribution Parameters for Grouped Data , 2005 .

[12]  Yu-Chang Lin,et al.  On the design of variable sample size and sampling intervals X¯ charts under non-normality , 2005 .

[13]  Surajit Pal Evaluation of Nonnormal Process Capability Indices using Generalized Lambda Distribution , 2004 .

[14]  Wilbert C.M. Kallenberg,et al.  Estimation in Shewhart control charts: effects and corrections , 2004 .

[15]  J. F. Forbes,et al.  Control design for first-order processes: shaping the probability density of the process state , 2004 .

[16]  S. Bakir A Distribution-Free Shewhart Quality Control Chart Based on Signed-Ranks , 2004 .

[17]  Michael B. C. Khoo Performance Measures for the Shewhart Control Chart , 2004 .

[18]  E. Dudewicz,et al.  COMPARISON OF GLD FITTING METHODS: SUPERIORITY OF PERCENTILE FITS TO MOMENTS IN L2 NORM , 2003 .

[19]  Maxence Bigerelle,et al.  A New Approach to Predict the Pit Depth Extreme Value of a Localized Corrosion Process , 2003 .

[20]  Juha Karvanen,et al.  GENERATION OF CORRELATED NON-GAUSSIAN RANDOM VARIABLES FROM INDEPENDENT COMPONENTS , 2003 .

[21]  Wilbert C.M. Kallenberg,et al.  Parametric control charts , 2003 .

[22]  S. Psarakis,et al.  EFFECT OF ESTIMATION OF THE PROCESS PARAMETERS ON THE CONTROL LIMITS OF THE UNIVARIATE CONTROL CHARTS FOR PROCESS DISPERSION , 2002 .

[23]  Do Sun Bai,et al.  Control charts for positively‐skewed populations with weighted standard deviations , 2001 .

[24]  Joseph J. Pignatiello,et al.  On Estimating X̄ Control Chart Limits , 2001 .

[25]  Joseph J. Pignatiello,et al.  On Estimating X-bar Control Chart Limits , 2001 .

[26]  R. K. Pearson,et al.  Exploring process data , 2001 .

[27]  Ram Ganeshan A comment on: Geetha K K and Archary K K (2000) , 2001, J. Oper. Res. Soc..

[28]  Hong Wang,et al.  Bounded Dynamic Stochastic Systems , 2012 .

[29]  William H. Woodall,et al.  Controversies and Contradictions in Statistical Process Control , 2000 .

[30]  K. K. Achary,et al.  Are more suppliers better?: generalising the Guo and Ganeshan procedure , 2000, J. Oper. Res. Soc..

[31]  R. Amin,et al.  Process tolerance limits , 2000 .

[32]  Hong Wang,et al.  Bounded Dynamic Stochastic Systems: Modelling and Control , 2000 .

[33]  Subhabrata Chakraborti Run length, average run length and false alarm rate of shewhart x-bar chart: exact derivations by conditioning , 2000 .

[34]  Su-fen Yang An approach to controlling process variability for short production runs , 1999 .

[35]  Layth C. Alwan Statistical Process Analysis , 1999 .

[36]  Rudolf G. Kittlitz TRANSFORMING THE EXPONENTIAL FOR SPC APPLICATIONS , 1999 .

[37]  Eamonn Mullins,et al.  STATISTICAL QUALITY CONTROL AND IMPROVEMENT , 1996 .

[38]  Douglas C. Montgomery,et al.  PROCESS CAPABILITY INDICES AND NON-NORMAL DISTRIBUTIONS , 1996 .

[39]  C. Quesenberry On Properties of Q Charts for Variables , 1995 .

[40]  Thomas Pyzde WHY NORMAL DISTRIBUTIONS AREN'T [ALL THAT NORMAL] , 1995 .

[41]  Trevor A Spedding,et al.  Non‐normality in Statistical Process Control Measurements , 1994 .

[42]  Samuel Kotz,et al.  Process Capability Indices , 1993 .

[43]  N. L. Johnson,et al.  Distributional and Inferential Properties of Process Capability Indices , 1992 .

[44]  Steven A. Yourstone,et al.  Non‐Normality and the Design of Control Charts for Averages* , 1992 .

[45]  Douglas C. Montgomery,et al.  Introduction to Statistical Quality Control , 1986 .

[46]  A. Öztürk,et al.  A Study of Fitting the Generalized Lambda Distribution to Solar Radiation Data. , 1982 .

[47]  Bruce W. Schmeiser,et al.  An approximate method for generating symmetric random variables , 1972, CACM.

[48]  B. L. Joiner,et al.  Some Properties of the Range in Samples from Tukey's Symmetric Lambda Distributions , 1971 .

[49]  J. Tukey The Future of Data Analysis , 1962 .

[50]  A. R. Crathorne,et al.  Economic Control of Quality of Manufactured Product. , 1933 .