The Hamming distances of saturated asymmetrical orthogonal arrays with strength 2
From MaRDI portal
Publication:5077468
DOI10.1080/03610926.2019.1591452OpenAlexW3001656036WikidataQ128205877 ScholiaQ128205877MaRDI QIDQ5077468
Qingjuan Zhang, Xiao Zhang, Shan-Qi Pang
Publication date: 18 May 2022
Published in: Communications in Statistics - Theory and Methods (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/03610926.2019.1591452
difference schemeHamming distanceexpansive replacement methodsaturated asymmetrical orthogonal arrays with strength 2
Related Items (4)
Construction of asymmetric orthogonal arrays of high strength by juxtaposition ⋮ Constructions for new orthogonal arrays based on large sets of orthogonal arrays ⋮ Schematic saturated orthogonal arrays obtained by using the expansive replacement method ⋮ Quantum \(k\)-uniform states for heterogeneous systems from irredundant mixed orthogonal arrays
Cites Work
- Nonexistence of a few binary orthogonal arrays
- Orthogonal arrays obtained by repeating-column difference matrices
- Orthogonal arrays. Theory and applications
- On difference schemes and orthogonal arrays of strength \(t\)
- Construction of asymmetrical orthogonal arrays having factors with a large non-prime power number of levels
- On the existence of saturated and nearly saturated asymmetrical orthogonal arrays
- Construction and count of 1-resilient rotation symmetric Boolean functions
- A unified approach to combinatorial key predistribution schemes for sensor networks
- Connection between uniformity and orthogonality for symmetrical factorial designs
- Nearly orthogonal arrays mappable into fully orthogonal arrays
- Construction of orthogonal Latin hypercube designs
- Schematic saturated orthogonal arrays obtained by using the contractive replacement method
- Orthogonal arrays obtained by generalized Hadamard product
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
This page was built for publication: The Hamming distances of saturated asymmetrical orthogonal arrays with strength 2
