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Graphical Methods for Evaluating the Degree of the Orthogonality of Nearly Orthogonal Arrays  

Jang Dae-Heung (부경대학교 수리과학부 통계학전공)
Publication Information
Journal of Korean Society for Quality Management / v.32, no.4, 2004 , pp. 220-228 More about this Journal
Abstract
The orthogonality is an important property in the experimental designs. When we use nearly orthogonal arrays, we need evaluate the degree of the orthogonality of given experimental designs. Graphical methods for evaluating the degree of the orthogonality of nearly orthogonal arrays are suggested.
Keywords
Nearly Orthogonal Arrays; Orthogonality Evaluation;
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1 Booth, K. H. V. and Cox, D. R.(1962), 'Some Systematic Supersaturated Designs', Technometrics, Vol. 4, 489-495   DOI   ScienceOn
2 Cheng, C. and Mukerjee, R.(2001). 'Blocked Regular Fractional Factorial Designs with Maximum Estimation Capacity', Annals of Statistics, Vol. 29, 530-548   DOI   ScienceOn
3 Ma, C., Fang, K., and Lin, D. K. J.(2001). 'On the Isomorphism of Fractional Factorial Designs', Journal of Complexity, Vol. 17, 86-97   DOI   ScienceOn
4 Mukerjee, R. and Wu, C. F. J.(1999). 'Blocking in Regular Fractional Factorials: A Projective Geometric Approach', Annals of Statistics, Vol. 27, 1256-1271   DOI   ScienceOn
5 Bisgaard, S. and Gertsbakh, I.(2000). ' Experiments with Binary Responses: Inverse Binomial Sampling', Journal of Quality Technology, Vol. 32, 148-156   DOI   ScienceOn
6 ________(1995), 'Generating Syste- matic Supersaturated Designs', Techno- metrics, Vol. 37, 213-225   DOI   ScienceOn
7 Plackett, R. L. and Burman, J. P.(1946), 'The Design of Optimum Multifactorial Experiments', Biomet- rika, Vol. 33, 305-325   DOI   ScienceOn
8 Chan, L., Ma, C., and Goh, T. N.(2003). 'Orthogonal Arrays for Experiments with Lean Designs', Journal of Quality Technology, Vol. 35, 123-138   DOI   ScienceOn
9 Dey, A.(2002). Asymmetric Orthogonal Arrays, Design Workshop Lecture Notes, 97-115
10 Lin, D. K. J.(1993), 'A New Class of Supersaturated Designs', Techno- metrics, Vol. 35, 28-31   DOI   ScienceOn
11 Pielou, E. C.(1966), 'The Measurement of Diversity in Different Types of Biological Collections', Journal of Theoretical Biology, Vol. 13, 131-144   DOI
12 Suen, C. and Chen, H.(2000). 'A Family of Regular Fractional Factorial Designs with Maximum Resolution', Journal of Statistical Computing and Simulation, Vol. 66, 67-78   DOI   ScienceOn
13 Liao, C. T. and Lyer, H. K.(2000). 'Optimal Fractional Factorial Designs for Dispersion Effects under a Location-Dispersion Model', Communications in Statistics-Theory and Methods, Vol. 29, 823-835   DOI   ScienceOn
14 Taguchi, G.(1986), Introduction to Quality Engineering: Designing Quality into Products and Processes, New York, White Plains
15 Crosier, R. B. (2000). 'Some NewTwo-Level Saturated Designs', Journal of Quality Technology, Vol. 32, 103-110   DOI   ScienceOn
16 Fang, K., Lin, D. K. J., Winker, P., and Zhang, Y.(2000), 'Uniform Design: Theory and Application', Technometrics, Vol. 42, 237-248   DOI   ScienceOn
17 Zhang, R. and Park, D.(2000). 'Optimal Blocking of Two Level Fractional Factorial Designs', Journal of Statistical Planning and Inference, Vol. 91, 107-121   DOI   ScienceOn
18 Jang, D. H.(2002), 'Measures for Evaluating Non-orthogonality of Experimental Designs', Communicat- ions in Statistics-Theory and Methods, Vol. 31, 249-260   DOI   ScienceOn
19 Li, W. W. and Wu, C. F. J.(1997), 'Columnwise-pairwise Algorithms with Applications to The Con- struction of Supersaturated Designs', Technometrics, Vol. 39, 171-179   DOI   ScienceOn
20 Ma, C., Fang, K., and Liski, E.(2000), 'A New Approach in Constructing Orthogonal and Nearly Orthogonal Arrays', Metrika, Vol. 50, 255-268   DOI   ScienceOn
21 Fang, K., Lin, D. K. J., Ma, C.(2000), 'On The Construction of Multi-level Supersaturated Designs', Journal of Statistical Planning and Inference, Vol. 86, 239-252   DOI   ScienceOn
22 Wang, J. C. and Wu, C. F. J.(1992), 'Nearly Orthogonal Arrays with Mixed Levels and Small Runs', Technometrics, Vol. 34, 409-422   DOI   ScienceOn
23 장대흥(2004). '집락분석에 쓰이는 그래픽방법들의 확장', 한국통계학회 분류연구회 동계학술발표회논문집, 57-63