139

Bibliography:

1. Acosta-Mejia C. A. (2007). Two Sets to Runs Rules for X-bar Chart.

Quality Engineering 19:129-136.

2. Acosta-Mejia C. A. and Pignatiell J. J. Jr. (2009). ARL-Design of S-

Chart with k-of-k Runs Rules. Communications in Statistics-

Simulation and Computation 38(8):1625-1639.

3. Albin S. L., Kang L. and Shea G. (1997). An X and EWMA Chart for

Individual Observations. Journal of Quality Technology 29(1):41-48.

4. Antzoulakos D. L. and Rakitzis A. C. (2008). The Modified r Out-of-m

Control Chart. Communications in Statistics- Simulation and

Computations 37:396-408.

5. Amin R. W. and Searcy A. J. (1991). A Nonparametric Exponentially

Weighted Moving Average Control Schemes. Communications in

Statistics-Simulation and Computation 20:1049-1072.

6. Ansari A. R. and Bradley R. A. (1960). Rank Sum Test for Dispersion.

Annals of Mathematical Statistics 31:1174-1189.

7. Amin R. W., Reynolds M. R. Jr. and Bakir S. T. (1995). Nonparametric

Quality Control Charts Based On the Sign Statistic. Communications in

Statistic-Theory and Methods 24(6):1597-1623.

8. Bakir S.T. and Reynolds M. R. Jr. (1979). A Nonparametric Procedure

for Process Control Based On Within-Group Ranking. Technometrics

2:175-183.

9. Bakir S. T. (2004). A Distribution-Free Shewhart Quality Control Chart

Based On Signed-Ranks. Quality Engineering 16(4):613-623.

10. Bradly J. V. (1968). Distribution-Free Statistical Tests. Prentice-Hall.

New Jersey.

11. Bakir S. T. (2006). Distribution-Free Quality Control Charts Based On

Signed-Rank-Like Statistic. Communications in Statistics-Theory and

Methods 35:743-757.

140

12. Bourke P. D. (1991). Detecting Shift in Fraction Nonconforming Using

Run Length Control Charts With 100% Inspection. Journal of Quality

Technology 23: 225-238.

13. Brooke D. and Evans D. A. (1972). An Approach to Probability

Distribution of CUSUM Run Length. Biometrika 59(3): 539-549.

14. Bissel A. F. (1978). An Attempt to Unify the Theory of Quality Control

Procedures. Bulletin in Applied Statistics 5:113-128.

15. Calvin T. W. (1983). Quality Control Techniques for Zero Defects.

IEEE Transactions On Components Hybrids and Manufacturing

Technology 6:323-328.

16. Champ W. C. (1992). Steady-State Run Length Analysis of a Shewhart

Control Chart with Supplementary Runs Rules. Communications in

Statistics- Theory and Methods 21:765-777.

17. Chakraborti S., Van der Laan P. and Bakir S. T.(2001). Nonparametric

Control Charts: An Overview and Some Results. Journal of Quality

Technology 33:304-315.

18. Chakraborti S. and Van de Wiel M. A. (2008). A Nonparametric

Control Charts Based On Mann-Whitney Statistic. IMS Collection

1:156-172.

19. Chakraborti S. and Eryilmaz S. (2007). A Nonparametric Shewhart-

Type Signed-Rank Control Chart Based On Runs. Communications in

Statistic 36:335-356.

20. Champ C. W. and Woodall W. H. (1987). Exact Results for Shewhart

Control Chart with Supplementary Runs Rules. Technometrics

29(4):393-399.

21. Cheng C. W. and Chen P. W. (2008). The Design of Cumulative Count

of Conforming Chart with Supplementary Runs Rules. The 9th Asia

Pasific Industrial Engineering and Management Systems Conference.

22. Crosier R. B. (1986). A New Two-Sided Cumulative Sum Quality

Control Scheme. Technometrics 28(3): 187-194.

141

23. Costa A. F. B. and Lucas M. A. (2006). A Synthetic Control Chart for

Monitoring the Process Mean and Variance. Journal of Quality in

Maintenance Engineering 12(1):81-88.

24. Davis R. B. and Woodall W. H. (2002). Evaluating and Improving the

Synthetic Control Chart. Journal of Quality Technology 34(2):200-208.

25. Das N. and Bhattacharya A. (2008). A New Nonparametric Control

Chart for Controlling Variability. Quality Technology and Quantitative

Management 5(4):351-36.

26. Das N. (2008). A Note on Efficiency of Nonparametric Control Chart

for Monitoring Process Variability. Economic Quality Control 23

(1):85-93.

27. Das N. (2008). Nonparametric Control Chart for Controlling Variability

Based On Rank Test. Economic Quality Control 23 (2):227-242.

28. Das N. (2008). A Nonparametric Control Chart for Controlling

Variability Based On Squared Rank Test. Journal of Industrial and

Systems Engineering 2 (2):144-125.

29. Dudding B. P. and Jennett W. J. (1942). Quality Control Charts.

London: British Standards Institution.

30. Goh T. N. (1987). A Control Charts for Very High Yield Processes.

Quality Assurance 13 (1):18-22.

31. Glushkovsky E. A. (1994). On-Line G-Control Charts for Attribute

Data. Quality and Reliability Engineering International 10:217-227.

32. Human S. W., Chakraborti S. and Smit C.F. (2010). Nonparametric

Shewhart-Type Sign Control Charts Based on Runs. Communications

in Statistics-Theory and Methods 39:2046-2062.

33. Hurwitz A. M. and Mathur M. (1992). A Very Simple Set of Process

Control Rules. Quality Engineering 5:21-29.

34. Hackl P. and Ledolter J. (1991). A Control Charts Based On Ranks.

Journal of Quality Technology 23:117-124.

142

35. Hackl P. and Ledolter J. (1992). A New Nonparametric Quality Control

Technique. Communications in Statistics: Simulation and

Computations 21:423-443.

36. Johnson N. L. and Kotz S. (1970). Continuous Univariate Distributions-

2. Boston Massachusetts: Houghton Mifflin Company.

37. Khilare S. K. and Shirke D. T. (2010). A Nonparametric Synthetic

Control Chart Using Sign Statistic. Communications in Statistics-

Theory and Methods 39:3282-3293.

38. Khilare S. K. and Shirke D. T. (2010). A Nonparametric Synthetic

Control Charts for Fraction Nonconforming Due to Increase in Process

Variation. Revision Submitted to Quality and Reliability Engineering

International.

39. Klein M. (2000). Two Alternatives to the Shewhart X-bar Control

Chart. Journal of Quality Technology 32:427-431.

40. Khoo M. B. C. (2003). Design of Runs Rule Schemes. Quality

Engineering 16:27-43.

41. Khoo M. B. C. (2003). Increasing the Sensitivity of Control Chart for

Fraction Nonconforming. Quality Engineering 16(2):307-319.

42. Khoo M. B. C. and Ariffin K. N. (2006). Two improved runs rules for

the X-bar control chart. Quality Engineering 18:173-178.

43. Kaminsky F. C., Benneyan J. C., Dvis R. D. and Burke R. J. (1992).

Statistical Control Charts Based On Geometric Distribution. Journal of

Quality Technology 24:63-69.

44. Koutras M. V., Bersimis S. and Maravelakis P. E. (2007). Statistical

Process Control Using Shewhart Control Charts with Supplementary

Runs Rules. Methodology and Computing in Applied Probability

9:207-224.

45. Lehmann E. L. (1975). Nonparametric: Statistical Methods Based On

Ranks. Olden-Day San Francisco California.

143

46. Lim T. and Cho M. (2009). Design of Control Charts with m-of-m Runs

Rules. Quality and Reliability Engineering International 25:1085-1101.

47. McGilchrist C. A. and Woodyer K. D. (1975). Note On a Distribution-

free CUSUM Technique. Technometrics 17:321-325.

48. Montgomery D. C. (2005). Introduction to Statistical Quality Control.

Wiley: New York.

49. Mosteller F. (1941). A Note On Application of Runs to Quality Control

Charts. Annals of Mathematical Statistics 12:228-231.

50. Nelson L. S. (1984). The Shewhart Control Chart-Test for Special

Causes. Journal of Quality Technology 16(4):237-239.

51. Nelson L. S. (1994). Shewhart Control Charts with Unequal Subgroup

Sizes. Journal of Quality Technology 23:239-246.

52. Saccucci M. S. and Lucas J. M. (1990). Average Run Length for

Exponentially Weighted Moving Average Control Schemes Using the

Markov Chain Approach. Journal of Quality Technology 22(2):154-

162.

53. Shmueli G. and Cohen A. (2003). Run-length Distribution for Control

Charts with Runs Rules. Communications in Statistics: Theory and

Methods 32:475-495.

54. Palm A. C. (1990). Tables of Run Length Percentiles for Determining

the Sensitivity of Shewhart Control Charts for Averages with

Supplementary Runs Rules. Journal of Quality Technology 22:289-298.

55. Park C and Reynold M. R. Jr. (1987). Nonparametric Procedure for

Monitoring a Location Parameter Based on Linear Placement Statistic.

Sequential Anal 6:303-323.

56. Page E.S. (1955). Control Charts with Warning Lines. Biometric

42:243-257.

57. Roberts S. W. (1958). Properties of Control Chart Zone Tests. Bell

System Technical Journal 37:83-114.

144

58. Roberts S. W. (1959). Control Charts Tests Based On Geometric

Moving Averages. Technometrics 1:239-250.

59. Wu Z. and Spedding T. A. (2000). A Synthetic Control Chart for

Detecting Small Shifts in the Process Mean. Journal of Quality

Technology 32:32-38.

60. Wu Z. and Spedding T. A. (2001). Implementing Synthetic Control

Charts. Journal of Quality Technology 32:32-38.

61. Wu Z. and Yeo S. H. (2001). Implementing Synthetic Control Charts

for Attributes. Journal of Quality Technology 33:113-115.

62. Wetherill G. B. and Brown D. W. (1991). Statistical Process Control.

Chapman and Hall, New York.

63. Weiler H. (1953). The Use of Runs to Control the Mean in Quality

Control. Annals of Mathematical Statistics 48:816-825.

64. Wu Z. and Yeo S. H. and Spedding T. A. (2001). A Synthetic Control

Chart for Detecting Fraction Nonconforming Increases. Journal of

Quality Technology 33:104-111.

65. Xie W., Xie M. and Goh T. N. (1995). A Shewhart-Like Charting

Technique for High Yield Process. Quality and Reliability Engineering

International 11:189-196.

66. Xie M., Goh T. N. and Kuralmani V. (2000). On Optimal setting of

Control Limits for Geometric Chart. International Journal of Reliability

Quality and Safety Engineering 7 (1):17-25.

67. Xie M. and Goh T. N. (1992). Some Procedures for Decision Making in

Controlling High Yield Processes. Quality and Reliability Engineering

International 8:355-360.

68. Xie M. and Goh T. N. (2003). Statistical Control of a Six Sigma

Process. Quality Engineering 15(4):587-592.

69. Zang S. and Wu Z. (2005). Design of control chart with supplementary

runs rules. Computers and Industrial Engineering 49:76-97.

145