Orthogonal hypercubes and related designs
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Publication:1299084
DOI10.1016/S0378-3758(98)00059-7zbMath0935.62089MaRDI QIDQ1299084
Publication date: 4 May 2000
Published in: Journal of Statistical Planning and Inference (Search for Journal in Brave)
Orthogonal arrays, Latin squares, Room squares (05B15) Combinatorial aspects of finite geometries (05B25) Statistical block designs (62K10)
Related Items (4)
Diagonal groups and arcs over groups ⋮ Classification of Graeco-Latin Cubes ⋮ On Orthogonal Latin p-Dimensional Cubes ⋮ Constructions of \((t,m,s)\)-nets and \((t,s)\)-sequences
Cites Work
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- Point sets and sequences with small discrepancy
- \((s,r;\mu )\)-nets and alternating forms graphs
- Polynomial representation of complete sets of mutually orthogonal frequency squares of prime power order
- A study of frequency cubes
- Orthogonal F-rectangles, orthogonal arrays, and codes
- Orthogonal arrays with variable numbers of symbols
- Latin cubes of order //omega5
- Latin squares. New developments in the theory and applications
- Generalizations of Bose's equivalence between complete sets of mutually orthogonal Latin squares and affine planes
- Orthogonal arrays and other combinatorial aspects in the theory of uniform point distributions in unit cubes
- Point sets with uniformity properties and orthogonal hypercubes
- Polynomial representations of complete sets of frequency hyperrectangles with prime power dimensions
- Subsquares in orthogonal Latin squares as subspaces in affine geometries: A generalization of an equivalence of Bose
- Further contributions to the theory of F-squares design
- Affine resolvable balanced incomplete block designs: a survey
- Optimal designs for the elimination of multi-way heterogeneity
- Nonisomorphic complete sets of \(F\)-rectangles with prime power dimensions
- \(d\)-dimensional hypercubes and the Euler and MacNeish conjectures
- Equiorthogonal frequency hypercubes: Preliminary theory
- Construction of complete sets of mutually equiorthogonal frequency hypercubes
- A candidate for the ``Next Fermat Problem
- Combinatorial methods in the construction of point sets with uniformity properties
- An equivalence between \((T,M,S)\)-nets and strongly orthogonal hypercubes
- On the dimension of affine resolvable designs and hypercubes
- $F$-Square and Orthogonal $F$-Squares Design: A Generalization of Latin Square and Orthogonal Latin Squares Design
- On the structure of affine designs
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