Minimax designs for estimating the slope of a third-order response surface in a hypercubic region
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Publication:4232078
DOI10.1080/03610919808813484zbMath0929.62079OpenAlexW1988721306MaRDI QIDQ4232078
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Publication date: 30 January 2000
Published in: Communications in Statistics - Simulation and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/03610919808813484
Related Items (4)
On Second-Order A-, D- and E-Minimax Designs for Estimating Slopes in Extrapolation and Restricted Interpolation Regions ⋮ On d- and e- minimax optimal designs for estimating the axial slopes of a second-order response surface over hypercubic regions ⋮ Conditions of Slope-Rotatability for Third-Order Polynomial Regression Models ⋮ On Some Two- and Three-dimensional D-minimax Designs for Estimating Slopes of a Third-order Response Surface
Cites Work
- Efficient \(D_ s\)-optimal designs for multivariate polynomial regression on the q-cube
- Multi-Factor Experimental Designs for Exploring Response Surfaces
- A Class of Multifactor Designs for Estimating the Slope of Response Surfaces
- Slope-Rotatable Central Composite Designs
- A measure and a graphical method for evaluating slope rotatability in response surface designs
- The design of experiments to estimate the slope of a response surface
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