Generalized minimum aberration two-level split-plot designs

Addelman, 1964, Some two-level factorial plans with split-plot confounding, Technometrics, 6, 253, 10.2307/1266042 Bingham, 2007, Incorporating prior information in optimal design for model selection, Technometrics, 49, 155, 10.1198/004017007000000038 Bingham, 2004, Designing fractional factorial split-plot experiments with few whole-plot factors, Journal of the Royal Statistical Society Series C, 53, 325, 10.1046/j.1467-9876.2003.05029.x Bingham, 1999, Minimum-aberration two-level fractional factorial split-plot designs, Technometrics, 41, 62, 10.2307/1270995 Bingham, 2001, Design issues in fractional factorial split-plot experiments, Journal of Quality Technology, 33, 2, 10.1080/00224065.2001.11980043 Bingham, 2003, Fractional factorial split-plot designs for robust parameter experiments, Technometrics, 45, 80, 10.1198/004017002188618725 Bisgaard, 2000, The design and analysis of 2k−p×2q−r split-plot experiments, Journal of Quality Technology, 32, 39, 10.1080/00224065.2000.11979970 Cheng, 2004, Blocked nonregular two-level factorial designs, Technometrics, 46, 269, 10.1198/004017004000000301 Deng, 1999, Generalized resolution and minimum aberration criteria for Plackett–Burman and other non-regular factorial designs, Statistica Sinica, 9, 1071 Hall, 1961, Hadamard matrices of order 16 Huang, 1998, Minimum-aberration two-level split-plot designs, Technometrics, 40, 314, 10.2307/1270532 Jones, 2009, Split-plot designs: what, why, and how, Journal of Quality Technology, 41, 340, 10.1080/00224065.2009.11917790 Kempthorne, 1952 Kowalski, 2002, 24 run split-plot experiments for robust parameter design, Journal of Quality Technology, 34, 399, 10.1080/00224065.2002.11980172 Kulahci, 2007, Split-plot experiments with unusual numbers of subplot runs, Quality Engineering, 19, 363, 10.1080/08982110701633713 Kulahci, 2005, The use of Plackett–Burman designs to construct split-plot designs, Technometrics, 47, 495, 10.1198/004017005000000427 Li, 2003, Optimal foldover plans for two-level nonregular orthogonal designs, Technometrics, 45, 347, 10.1198/004017003000000177 Lin, 1992, Projection properties of Plackett and Burman designs, Technometrics, 34, 423, 10.2307/1268941 Schoen, 2010, Complete enumeration of pure-level and mixed-level orthogonal arrays, Journal of Combinatorial Designs, 18, 123, 10.1002/jcd.20236 Sun, 2008, An algorithm for sequentially constructing nonisomorphic orthogonal designs and its applications, Statistics and Application (special issue in honor of Professor Dey), 6, 144 Wu, 2000 Zhu, Y., 2000. A Theory of Experimental Design for Multiple Groups of Factors. Unpublished Ph.D. Thesis. Department of Statistics, University of Michigan, Ann Arbor, MI.