On difference schemes and orthogonal arrays of strength \(t\)
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Publication:1361728
DOI10.1016/S0378-3758(96)00026-2zbMath0873.05022OpenAlexW1989632078MaRDI QIDQ1361728
Guoqin Su, A. S. Hedayat, John Stufken
Publication date: 20 October 1997
Published in: Journal of Statistical Planning and Inference (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/s0378-3758(96)00026-2
Linear codes (general theory) (94B05) Orthogonal arrays, Latin squares, Room squares (05B15) Factorial statistical designs (62K15)
Related Items (16)
FURTHER CONSTRUCTION OF BALANCED ARRAYS ⋮ Neural network and regression spline value function approximations for stochastic dynamic programming ⋮ Resolvable generalized difference matrices: existence and applications ⋮ The Hamming distances of saturated asymmetrical orthogonal arrays with strength 2 ⋮ Construction of orthogonal arrays of strength three by augmented difference schemes ⋮ Covering schemes of strength \(t\) ⋮ On the construction of some new asymmetric orthogonal arrays ⋮ Constructions for new orthogonal arrays based on large sets of orthogonal arrays ⋮ New bound and constructions for geometric orthogonal codes and geometric 180-rotating orthogonal codes ⋮ Quantum \(k\)-uniform states for heterogeneous systems from irredundant mixed orthogonal arrays ⋮ A construction of variable strength covering arrays ⋮ Construction of mixed orthogonal arrays with high strength ⋮ Space-filling orthogonal arrays of strength two ⋮ Construction of nested space-filling designs ⋮ Invariant codes, difference schemes, and distributive quasigroups ⋮ A Scientific Tour on Orthogonal Arrays
Cites Work
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- On the construction of asymmetrical orthogonal arrays
- On difference matrices, resolvable transversal designs and generalized Hadamard matrices
- Orthogonal arrays. Theory and applications
- Concerning difference matrices
- Partial λ-Geometries and Generalized Hadamard Matrices Over Groups
- On Orthogonal Arrays
- Orthogonal Arrays of Index Unity
- Orthogonal Arrays of Strength two and three
- On the Problem of Construction of Orthogonal Arrays
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