On D-optimal robust second order slope-rotatable designs

被引:6
|
作者
Das, Rabindra Nath [2 ]
Park, Sung H. [1 ]
Aggarwal, Manohar [3 ]
机构
[1] Seoul Natl Univ, Dept Stat, Seoul 151747, South Korea
[2] Univ Burdwan, Dept Stat, Burdwan 713104, W Bengal, India
[3] Univ Memphis, Dept Math Sci, Memphis, TN 38152 USA
来源
JOURNAL OF STATISTICAL PLANNING AND INFERENCE | 2010年 / 140卷 / 05期
关键词
D-optimal robust slope-rotatable; Response surface design; Robust rotatability; Robust slope-rotatability; Robust symmetric balanced design; RESPONSE-SURFACE METHODOLOGY; CORRELATED OBSERVATIONS;
D O I
10.1016/j.jspi.2009.11.012
中图分类号
O21 [概率论与数理统计]; C8 [统计学];
学科分类号
020208 ; 070103 ; 0714 ;
摘要
Das and Park (2006) introduced slope-rotatable designs overall directions for correlated observations which is known as A-optimal robust slope-rotatable designs. This article focuses D-optimal slope-rotatable designs for second-order response surface model with correlated observations. It has been established that robust second-order rotatable designs are also D-optimal robust slope-rotatable designs. A class of D-optimal robust second-order slope-rotatable designs has been derived for special correlation Structures of errors. (C) 2009 Elsevier B.V. All rights reserved.
引用
收藏
页码:1269 / 1279
页数:11
相关论文
共 50 条
  • [1] Modified Robust Second-Order Slope-Rotatable Designs
    Das, Rabindra Nath
    Pal, Partha
    Park, Sung H.
    [J]. COMMUNICATIONS IN STATISTICS-THEORY AND METHODS, 2015, 44 (01) : 80 - 94
  • [2] Robust Second-Order Slope-Rotatable Designs with Maximum Directional Variance
    Das, Rabindra Nath
    Park, Sung H.
    Aggarwal, Manohar
    [J]. COMMUNICATIONS IN STATISTICS-THEORY AND METHODS, 2010, 39 (05) : 803 - 814
  • [3] SLOPE-ROTATABLE CENTRAL COMPOSITE DESIGNS
    HADER, RJ
    PARK, SH
    [J]. TECHNOMETRICS, 1978, 20 (04) : 413 - 417
  • [4] Slope-rotatable designs with equal maximum directional variance for second order response surface models
    Park, SH
    Kwon, HT
    [J]. COMMUNICATIONS IN STATISTICS-THEORY AND METHODS, 1998, 27 (11) : 2837 - 2851
  • [5] Quality Improvement through Second-Order Slope-Rotatable Designs Over All Directions
    Anjaneyulu, G. V. S. R.
    Rao, P. Venkateswara
    Narasimham, V. L.
    [J]. INTERNATIONAL JOURNAL OF AGRICULTURAL AND STATISTICAL SCIENCES, 2008, 4 (01): : 47 - 51
  • [6] A NEW METHOD OF CONSTRUCTION OF SECOND-ORDER SLOPE-ROTATABLE DESIGNS USING BALANCED INCOMPLETE BLOCK DESIGNS
    Vietorbabu, B. Re
    Surekha, Ch. V. V. S.
    [J]. PAKISTAN JOURNAL OF STATISTICS, 2011, 27 (03): : 221 - 230
  • [7] A Note on Second Order Slope Rotatable Designs
    Victorbabu, Bejjam Re
    [J]. THAILAND STATISTICIAN, 2019, 17 (02): : 242 - 247
  • [8] On second order slope rotatable designs - A review
    Victorbabu, B. Re.
    [J]. JOURNAL OF THE KOREAN STATISTICAL SOCIETY, 2007, 36 (03) : 373 - 386
  • [9] A SERIES OF NEARLY D-OPTIMAL 3RD ORDER ROTATABLE DESIGNS
    BAGCHI, S
    [J]. SANKHYA-THE INDIAN JOURNAL OF STATISTICS SERIES B, 1986, 48 : 186 - 198
  • [10] Characterizing D-optimal Rotatable Designs with Finite Reflection Groups
    Sawa M.
    Hirao M.
    [J]. Sankhya A, 2017, 79 (1): : 101 - 132
12345