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  • Search: person:"Butler, Neil A."
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ARMA model 1 ARMA-Modell 1 Forecasting model 1 Prognoseverfahren 1 Theorie 1 Theory 1
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Undetermined 8
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Article 14
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Undetermined 13 English 1
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Butler, Neil A. 14 Denham, Michael C. 1 Eskridge, Kent M. 1 Gilmour, Steven G. 1 Mead, Roger 1 Ramos, Victorino M. 1 Yang, Guijun 1
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Statistics & Probability Letters 6 Biometrika 4 Journal of the Royal Statistical Society Series B 3 Journal of forecasting 1
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RePEc 13 ECONIS (ZBW) 1
Showing 1 - 10 of 14
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Schur- and E-optimal two-level factorial designs
Butler, Neil A. - In: Statistics & Probability Letters 78 (2008) 5, pp. 518-527
Schur-optimality is a very general class of optimality criteria that includes, as special cases, A- D- and E-optimality and Cheng Type 1 optimality. In this paper, Schur-optimal two-level factorial designs under a second-order model are derived for 3 and 5 factors for all numbers of runs where...
Persistent link: https://www.econbiz.de/10005319843
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Nonregular two-level designs of resolution IV or more containing clear two-factor interactions
Yang, Guijun; Butler, Neil A. - In: Statistics & Probability Letters 77 (2007) 5, pp. 566-575
In this paper, the concepts of clear effects, alias sets and grid representations are generalized to nonregular two-level designs. Many good generalized join designs of n runs with resolution IV or more containing many clear two-factor interactions are given for n=48 up to 192 and n being a...
Persistent link: https://www.econbiz.de/10005259336
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Optimal additions to and deletions from two-level orthogonal arrays
Butler, Neil A.; Ramos, Victorino M. - In: Journal of the Royal Statistical Society Series B 69 (2007) 1, pp. 51-61
Consider the problem of selecting a two-level factorial design. It is well known that two-level orthogonal arrays of strength 4 or more with "e" extra runs have various optimality properties including generalized Cheng (type 1) optimality when "e"=1, restricted Cheng (type 1) optimality when...
Persistent link: https://www.econbiz.de/10005203042
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Optimal blocking of two-level factorial designs
Butler, Neil A. - In: Biometrika 93 (2006) 2, pp. 289-302
Blocking of two-level factorial designs is considered for block sizes 2 and 4 using the method of fractional partial confounding. A-, D- and E-optimal designs are obtained for block size 2 within the class of orthogonal designs for which main effects and two-factor interactions are all...
Persistent link: https://www.econbiz.de/10005559388
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Generalised minimum aberration construction results for symmetrical orthogonal arrays
Butler, Neil A. - In: Biometrika 92 (2005) 2, pp. 485-491
Generalised minimum aberration is a recently-established design criterion for the whole class of orthogonal arrays and fractional factorial designs. The criterion is, as its name suggests, a generalisation of minimum aberration for regular designs and of minimum G-sub-2-aberration for twolevel...
Persistent link: https://www.econbiz.de/10005559413
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Minimax 16-run supersaturated designs
Butler, Neil A. - In: Statistics & Probability Letters 73 (2005) 2, pp. 139-145
Two-level supersaturated designs are invariably chosen using either E(s2)-optimality or the minimax criterion. Of these, E(s2)-optimality has received more interest and is the most well developed, partly because the problem seems to be more tractable. Nonetheless, minimax designs have already...
Persistent link: https://www.econbiz.de/10005223563
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Minimum G2-aberration properties of two-level foldover designs
Butler, Neil A. - In: Statistics & Probability Letters 67 (2004) 2, pp. 121-132
This paper provides theoretical results on the construction of two-level fractional factorial designs with minimum G2-aberration. Attention focuses on foldover designs which are shown to have minimum G2-aberration across the whole class of orthogonal designs for n=24 runs and any...
Persistent link: https://www.econbiz.de/10005254388
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Some theory for constructing minimum aberration fractional factorial designs
Butler, Neil A. - In: Biometrika 90 (2003) 1, pp. 233-238
Minimum aberration is the most established criterion for selecting a regular fractional factorial design of maximum resolution. Minimum aberration designs for n runs and n/2 = m n factors have previously been constructed using the novel idea of complementary designs. In this paper, an...
Persistent link: https://www.econbiz.de/10005743462
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Minimum aberration construction results for nonregular two-level fractional factorial designs
Butler, Neil A. - In: Biometrika 90 (2003) 4, pp. 891-898
Nonregular two-level fractional factorial designs are designs which cannot be specified in terms of a set of defining contrasts. The aliasing properties of nonregular designs can be compared by using a generalisation of the minimum aberration criterion called minimum G-sub-2-aberration. Until...
Persistent link: https://www.econbiz.de/10005743502
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A general method of constructing "E"("s"-super-2)-optimal supersaturated designs
Butler, Neil A.; Mead, Roger; Eskridge, Kent M.; … - In: Journal of the Royal Statistical Society Series B 63 (2001) 3, pp. 621-632
Persistent link: https://www.econbiz.de/10005658809
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