References
- Silvey , S. 1980 . “ Optimal Design ” . London : Chapman and Hall .
- Pukelsheim , F. 2006 . “ Optimal Design of Experiments ” . Philadelphia : SIAM .
- Atkinson , A. C. 1970 . The design of experiments to estimate the slope of a response surface . Biometrika , 57 : 319 – 328 .
- Ott , L. and Mendenhall , W. 1972 . Designs for estimating the slope of a second order linear model . Technometrics , 14 : 341 – 353 .
- Murthy , V. and Studden , W. 1972 . Optimal designs for estimating the slope of a polynomial regression . J. Am. Statist. Assoc. , 67 : 869 – 873 .
- Myres , R. and Lahoda , S. 1975 . A generalization of the response surface mean square error criterion with a specific application to the slope . Technometrics , 17 : 481 – 486 .
- Hader , R. and Park , S. 1978 . Slope-rotatable central composite designs . Technometrics , 20 : 413 – 417 .
- Mukerjee , R. and Huda , S. 1985 . Minimax second- and third-order designs to estimate the slope of a response surface . Biometrika , 72 : 173 – 178 .
- Mandal , N. and Heiligers , B. 1992 . Minimax designs for estimating the optimum point in a quadratic response surface . J. Statist. Plann. Inference , 31 : 235 – 244 .
- Pronzato , L. and Walter , E. 1993 . Experimental design for estimating the optimum point in a response surface . Acta Appl. Math. , 33 : 45 – 68 .
- Melas , V. , Pepelyshev , A. and Cheng , R. 2003 . Designs for estimating an extremal point of quadratic regression models in a hyperball . Metrika , 58 : 193 – 208 .
- Takeuchi , M. , Igarashi , Y. , Tomimoto , S. , Odake , M. , Hayashi , T. , Tsukamoto , T. , Hata , K. , Takaoka , H. and Fukuzak , H. 1991 . Single-beat estimation of the slope of the end-systolic pressure–volume relation in the human left ventricle . Circulation , 83 : 202 – 212 .
- Gennings , C. , Carter , W. H. Jr. , Carchman , R. A. , Teuschler , L. K. , Simmons , J. E. and Carney , E. W. 2005 . A unifying concept for assessing toxicological interactions: Changes in slope . Toxicol. Sci. , 88 ( 2 ) : 287 – 297 .
- Sahm , M. 1998 . Optimal designs for estimating individual coefficients in polynomial regression . Ph.D. thesis, Fakultät für Mathematik, Ruhr-Universität Bochum, Germany
- Dette , H. , Melas , V. and Pepelyshev , A. 2004 . Optimal designs for estimating individual coefficients in polynomial regression – a functional approach . J. Statist. Plann. Inference , 118 : 201 – 219 .
- Kiefer , J. 1974 . General equivalence theory for optimum designs (approximate theory) . Ann. Statist. , 2 : 849 – 879 .
- Pukelsheim , F. and Rieder , S. 1992 . Efficient rounding of approximate designs . Biometrika , 79 : 763 – 770 .
- Dette , H. 1995 . Designing of experiments with respect to ‘standardized’ optimality criteria . J. R. Stat. Soc. Ser. B , 59 : 97 – 110 .
- Müller , C. 1995 . Maximin effcient designs for estimating nonlinear aspects in linear models . J. Statist. Plann. Inference , 44 : 117 – 132 .
- Müller , C. and Pázman , A. 1998 . Applications of necessary and suffcient conditions for maximum effcient designs . Metrika , 48 : 1 – 19 .
- Dette , H. , Melas , V. and Pepelyshev , A. 2003 . Standardized maximin e-optimal designs for the Michaelis–Menten model . Statist. Sinica , 13 : 1147 – 1163 .
- Dette , H. and Braess , D. 2007 . On the number of support points of maximin and Bayesian D-optimal designs in nonlinear regression models . Ann. Statist. , 35 : 772 – 792 .
- Karlin , S. and Studden , W. 1966 . “ Tchebysheff Systems: With Application in Analysis and Statistics ” . New York : Wiley .
- Szegö , G. 1975 . “ Orthogonal Polynomials ” . Providence, R.I : American Mathematical Society .
- Fedorov , V. and Müller , W. 1997 . Another view on optimal design for estimating the point of extremum in quadratic regression . Metrika , 46 : 147 – 157 .
- Lestrel , P. 1997 . “ Fourier Descriptors and their Applications in Biology ” . New York : Cambridge University Press .
- Lau , T.-S. and Studden , W. 1985 . Optimal designs for trigonometric and polynomial regression using canonical moments . Ann. Statist. , 13 : 383 – 394 .
- Wu , H. 2002 . Optimal designs for first-order trigonometric regression on a partial circle . Statist. Sinica , 12 : 917 – 930 .
- Zen , M.-M. and Tsai , M.-H. 2004 . Criterion-robust optimal designs for model discrimination and parameter estimation in Fourier regression models . J. Statist. Plann. Inference , 124 : 475 – 487 .
- Fedorov , V. 1972 . “ Theory of Optimal Experiments ” . New York : Academic Press .