Construction of asymmetrical orthogonal arrays having factors with a large non-prime power number of levels
From MaRDI portal
Publication:1907642
DOI10.1016/0378-3758(94)00143-JzbMath0838.62062MaRDI QIDQ1907642
Publication date: 6 June 1996
Published in: Journal of Statistical Planning and Inference (Search for Journal in Brave)
Hadamard matrixdifference matrixasymmetrical orthogonal arraysmethod of replacementKronecker sumsgeneral construction methodnearly saturated main-effect plans
Related Items (4)
The Hamming distances of saturated asymmetrical orthogonal arrays with strength 2 ⋮ Some mixed orthogonal arrays obtained by orthogonal projection matrices ⋮ Further results on the orthogonal arrays obtained by generalized Hadamard product ⋮ A class of mixed orthogonal arrays obtained from projection matrix inequalities
Cites Work
- On the construction of orthogonal F-squares of order n from an orthogonal array (n,k,s,2) and an OL(s,t) set
- On the construction of asymmetrical orthogonal arrays
- On the existence and construction of a complete set of orthogonal F(4t; 2t, 2t)-squares design
- On difference matrices, resolvable transversal designs and generalized Hadamard matrices
- Orthomorphisms of Groups and Orthogonal Latin Squares. I
- Some Main-Effect Plans and Orthogonal Arrays of Strength Two
- $F$-Square and Orthogonal $F$-Squares Design: A Generalization of Latin Square and Orthogonal Latin Squares Design
- On the Problem of Construction of Orthogonal Arrays
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
This page was built for publication: Construction of asymmetrical orthogonal arrays having factors with a large non-prime power number of levels
