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Collected Papers III: Design of Experiments 1st ed. 1985, Reprint 2015 of the 1985 edition [Pehme köide]

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  • Formaat: Paperback / softback, 718 pages, kõrgus x laius: 235x155 mm, kaal: 1128 g, XXV, 718 p., 1 Paperback / softback
  • Sari: Springer Collected Works in Mathematics
  • Ilmumisaeg: 17-Dec-2015
  • Kirjastus: Springer-Verlag New York Inc.
  • ISBN-10: 1493934988
  • ISBN-13: 9781493934980
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Collected Papers III: Design of Experiments 1st ed. 1985, Reprint 2015 of the 1985 editionSuurem pilt
  • Formaat: Paperback / softback, 718 pages, kõrgus x laius: 235x155 mm, kaal: 1128 g, XXV, 718 p., 1 Paperback / softback
  • Sari: Springer Collected Works in Mathematics
  • Ilmumisaeg: 17-Dec-2015
  • Kirjastus: Springer-Verlag New York Inc.
  • ISBN-10: 1493934988
  • ISBN-13: 9781493934980
Teised raamatud teemal:
Püsilink: https://www.kriso.ee/db/9781493934980.html
Märksõnad:
Published with the Cooperation of the Institute of Mathematical Statistics

From the Preface: "The theory of optimal design of experiments as we know it today is built on asolid foundation developed by Jack Kiefer, who formulated and resolved some of the major problems of data collection via experimentation. A principal ingredient in his formulation was statistical efficiency of a design. Kiefer's theoretical contributions to optimal designs can be broadly classified into several categories: He rigorously defined, developed, and interrelated statistical notions of optimality. He developed powerful tools for verifying and searching for optimal designs; this includes the "averaging technique"... for approximate or exact theory, and "patchwork"... for exact theory... Kiefer and Wolfowitz provided a theorem now known as the Equivalence Theorem. This result has become a classical theorem in the field. One important feature of this theorem is that it provides a measure of how far a given design is from the optimal design. He characterized and constructed families of optimal designs. Some of the celebrated ones are balanced block designs, generalized Youden designs, and weighing designs. He also developed combinatorial structures of these designs. 
Kiefer's papers are sometimes difficult. In part this is due to the precision and care he exercised, which at times forced a consideration of pathologies and special cases...A reading of his papers on design is replete with examples of his scholarship, his innovativeness, ingenuity, and strength as a researcher."


Published with the Cooperation of the Institute of Mathematical Statistics
Bibliography of Jack Kiefer ix
Jack Kiefer's Contributions to Experimental Design xvii
H. P. Wynn
*[ 22] On the Nonrandomized Optimality and Randomized Nonoptimality of Symmetrical Designs
1(28)
*[ 23] Optimum Designs in Regression Problems
29(25)
J. Wolfowitz
*[ 26] Optimum Experimental Designs
54(49)
*[ 28] Optimum Experimental Designs V, with Applications to Systematic and Rotatable Designs
103(26)
*[ 29] The Equivalence of Two Extremum Problems
129(5)
J. Wolfowitz
*[ 31] Optimum Designs in Regression Problems, II
134(28)
*[ 33] Two More Criteria Equivalent to D-Optimality of Designs
162(5)
*[ 34] An Extremum Result
167(6)
*[ 40] Optimum Extrapolation and Interpolation Designs, I
173(30)
J. Wolfowitz
*[ 41] Optimum Extrapolation and Interpolation Designs, II
203(9)
J. Wolfowitz
*[ 43] On a Problem Connected with the Vandermonde Determinant
212(5)
J. Wolfowitz
*[ 44] On a Theorem of Hoel and Levine on Extrapolation Designs
217(30)
J. Wolfowitz
[ 46] Optimum Multivariate Designs
247(26)
R. H. Farrell
A. Walbran
[ 53] Optimal Experimental Designs
273(6)
*[ 55] The Role of Symmetry and Approximation in Exact Design Optimality
279(10)
*[ 57] Optimum Designs for Fitting Biased Multiresponse Surfaces
289(12)
*[ 58] General Equivalence Theory for Optimum Designs (Approximate Theory)
301(32)
[ 59] Discussion on the Paper "Planning Experiments for Discriminating Between Models"
333(2)
A. C. Atkinson
D. R. Cox
[ 60] Balanced Block Designs and Generalized Youden Designs, I. Construction (Patchwork)
335(10)
*[ 61] Construction and Optimality of Generalized Youden Designs
345(22)
*[ 63] Optimal Design: Variation in Structure and Performance Under Change of Criterion
367(12)
[ 64] Optimal Designs for Large Degree Polynomial Regression
379(12)
W. J. Studden
*[ 72] Comparison of Rotatable Designs for Regression on Balls, I (Quadratic)
391(14)
Z. Galil
*[ 74] Comparison of Design for Quadratic Regression on Cubes
405(12)
Z. Galil
*[ 75] Comparison of Simplex Designs for Quadratic Mixture Models
417(10)
Z. Galil
*[ 76] Comparison of Box--Draper and D-Optimum Designs for Experiments with Mixtures
427(4)
Z. Galil
[ 77] Asymptotic Approach to Families of Design Problems
431(16)
[ 78] A Diophantine Problem in Optimum Design Theory
447(18)
[ 79] Comment on "Pseudorandom Number Assignment in Statistically Designed Simulation and Distribution Sampling Experiments"
465(2)
Lee W. Schruben
Barry H. Margolin
*[ 80] Extrapolation Designs and φp-Optimum Designs for Cubic Regression on the q-Ball
467(12)
Z. Galil
[ 83] Optimal Design Theory in Relation to Combinatorial Design
479(18)
*[ 84] Designs for Extrapolation when Bias is Present
497(16)
[ 85] D-Optimum Weighing Designs
513(14)
Z. Galil
*[ 86] Time- and Space-Saving Computer Methods, Related to Mitchell's DETMAX, for Finding D-Optimum Designs
527(14)
Z. Galil
[ 87] Optimum Weighing Designs
541(8)
Z. Galil
[ 88] Optimum Balanced Block and Latin Square Designs for Correlated Observations
549(22)
H. P. Wynn
[ 89] The Interplay of Optimality and Combinatorics in Experimental Design
571(10)
[ 90] Relationships of Optimality for Individual Factors of a Design
581(8)
J. Eccleston
[ 92] On the Characterization of D-Optimum Weighing Designs for n ≡ 3 (mod 4)
589(35)
Z. Galil
[ 95] Construction Methods for D-Optimum Weighing Designs when n ≡ 3 (mod 4)
624(9)
Z. Galil
[ 96] Autocorrelation-robust Design of Experiments
633(22)
H. P. Wynn
[ 97] Comparison of Designs Equivalent Under One or Two Criteria
655(14)
Z. Galil
[ 98] Optimum and Minimax Exact Treatment Designs for One-Dimensional Autoregressive Error Processes
669(20)
H. P. Wynn
[ 110] D-Optimality of the GYD for v ≥ 6
689(2)
[ 111] Optimality Criteria for Designs
691(4)
Commentary on Papers [ 22], [ 55], [ 60], [ 61] 695(6)
Ching-Shui Cheng
Commentary on Papers [ 72], [ 74], [ 75], [ 76], [ 80] 701(3)
Zvi Galil
Commentary on Paper [ 86] 704(2)
Toby Mitchell
Commentary on Papers [ 23], [ 29], [ 31], [ 33], [ 34], [ 43], [ 44], [ 58], [ 61] 706(3)
Friedrich Pukelsheim
Commentary on Papers [ 57], [ 63], [ 76], [ 84] 709(3)
Jerome Sacks
Commentary on Papers [ 40], [ 41], [ 44], [ 80], [ 84] 712(2)
W. J. Studden
Commentary on Papers [ 23], [ 26], [ 28], [ 31], [ 88], [ 96], [ 98] 714
H. P. Wynn