Article ID Journal Published Year Pages File Type
1149650 Journal of Statistical Planning and Inference 2012 12 Pages PDF
Abstract

We consider the problem of constructing good two-level nonregular fractional factorial designs. The criteria of minimum G and G2 aberration are used to rank designs. A general design structure is utilized to provide a solution to this practical, yet challenging, problem. With the help of this design structure, we develop an efficient algorithm for obtaining a collection of good designs based on the aforementioned two criteria. Finally, we present some results for designs of 32 and 40 runs obtained from applying this algorithmic approach.

Related Topics
Physical Sciences and Engineering Mathematics Applied Mathematics
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