1. A simple approach to constructing quasi-Sudoku-based sliced space-filling designs
- Author
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Benjamin Haaland, David J. Nott, and Diane Donovan
- Subjects
Statistics and Probability ,Discrete mathematics ,Design of experiments ,010102 general mathematics ,Space (mathematics) ,Computer experiment ,01 natural sciences ,010104 statistics & probability ,Simple (abstract algebra) ,0101 mathematics ,Orthogonal array ,Algorithm ,Categorical variable ,Mathematics - Abstract
Sliced Sudoku-based space-filling designs and, more generally, quasi-sliced orthogonal array-based space-filling designs are useful experimental designs in several contexts, including computer experiments with categorical in addition to quantitative inputs and cross-validation. Here, we provide a straightforward construction of doubly orthogonal quasi-Sudoku Latin squares which can be used to generate quasi-sliced orthogonal arrays and, in turn, sliced space-filling designs which achieve uniformity in one- and two-dimensional projections for the full design and uniformity in two-dimensional projections for each slice. These constructions are very practical to implement and yield a spectrum of design sizes and numbers of factors not currently broadly available.
- Published
- 2016
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