A Class Of Neighbor Balanced Complete Block Designs and their Efficiencies for Spatially Correlated Errors
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Publication:4257222
DOI10.1080/02331889908802672zbMath0933.62067OpenAlexW1963490317MaRDI QIDQ4257222
Publication date: 9 August 1999
Published in: Statistics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/02331889908802672
efficiencygeneralized least squarescorrelated errorsneighbor designdoubly geometric processautonormal process
Related Items (5)
Neighbor properties of some classes of BIBRCs and their efficiencies for correlated errors ⋮ Optimal row-column design for two treatments ⋮ Optimality and efficiency of small chessboard designs for correlated errors ⋮ Optimal cylindrical-block designs for correlated observations ⋮ Optimal Designs for the Two-Dimensional Interference Model
Cites Work
- Block designs for first and second order neighbor correlations
- Two-dimensional design for correlated errors
- Optimal and near optimal sets of Latin squares for correlated errors
- A note on strongly equineighboured designs
- Some series constructions for two-dimensional neighbor designs
- Universally optimal designs with blocksize \(p\times 2\) and correlated observations
- Theory of optimal designs
- Incomplete block designs with spatial layouts when observations are dependent
- Some constructions for balanced incomplete block designs with nested rows and columns
- On the design of experiments under spatial correlation
- Some aspects of experimental design and analysis when errors are correlated
- A subclass of lattice processes applied to a problem in planar sampling
- Efficient block designs for settings with spatially correlated errors
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