References
- Box , G. E. P. , Hunter , J. S. ( 1961 ). The 2 k−p fractional factorial designs I and II . Technometrics 3 : 311 – 351 . [CSA]
- Chen , H. , Hedayat , A. S. ( 1998 ). 2 n−m designs with resolution III or IV containing clear two-factor interactions . J. Statist. Plann. Infer. 75 : 147 – 158 . [CSA] [CROSSREF]
- Chen , J. , Sun , D. X. , Wu , C. F. J. ( 1993 ). A catalogue of two-level and three-level fractional factorial designs with small runs . Int. Statist. Rev. 61 : 131 – 145 . [CSA]
- Draper , N. R. , Lin , D. K. J. ( 1990 ). Capacity consideration for two-level fractional factorial designs . J. Statist. Plann. Infer. 24 : 25 – 35 . [CSA] [CROSSREF]
- Fries , A. , Hunter , W. G. ( 1980 ). Minimum aberration 2 k−p designs . Technometrics 22 : 601 – 608 . [CSA] [CROSSREF]
- Ke , W. , Tang , B. , Wu , H. ( 2005 ). Compromise plans with clear two-factor interactions . Statist. Sinica 15 : 709 – 715 . [CSA]
- Tang , B. , Ma , F. , Ingram , D. , Wang , H. ( 2002 ). Bounds on the maximum numbers of clear two factor interactions for 2 m−p designs of resolution III and IV . Canad. J. Statist. 30 : 127 – 136 . [CSA]
- Wu , C. F. J. , Chen , Y. ( 1992 ). A graph-aided method for planning two-level experiments when certain interactions are important . Technometrics 34 : 162 – 175 . [CSA] [CROSSREF]
- Wu , H. , Wu , C. F. J. ( 2002 ). Clear two-factor interactions and minimum aberration . Ann. Statist. 30 : 1496 – 1511 . [CSA] [CROSSREF]
- Yang , G. J. , Liu , M. Q. , Zhang , R. C. ( 2005 ). Weak minimum aberration and maximum number of clear two-factor interactions in designs . Sci. China Ser. A 48 : 1479 – 1487 . [CSA] [CROSSREF]