Results for two-level fractional factorial designs of resolution IV or more

Abstract

The main theorem of this paper shows that foldover designs are the only (regular or nonregular) two-level factorial designs of resolution IV (strength 3) or more for n runs and n / 3 ⩽ m ⩽ n / 2 factors. This theorem is a generalization of a coding theory result of Davydov and Tombak [1990. Quasiperfect linear binary codes with distance 4 and complete caps in projective geometry. Problems Inform. Transmission 25, 265–275] which, under translation, effectively states that foldover (or even) designs are the only regular two-level factorial designs of resolution IV or more for n runs and 5 n / 16 ⩽ m ⩽ n / 2 factors. This paper also contains other theorems including an alternative proof of Davydov and Tombak's result.