Minimum G2-aberration properties of two-level foldover designs

This paper provides theoretical results on the construction of two-level fractional factorial designs with minimum G2-aberration. Attention focuses on foldover designs which are shown to have minimum G2-aberration across the whole class of orthogonal designs for n=24 runs and any m[less-than-or-equals, slant]n/2 factors. Minimum G2-aberration foldover designs are also provided for n=32, 48 and 64 runs.

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