The Weibull Distribution: A Handbook - Index of

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752 Bibliography tions; Publications of the Institute of Statistics, University Paris IV, 27, 75–92 SINHA, S.K. (1986a): Bayesian estimation of the reliability function and hazard rate of a Weibull failure time distribution; Trabajos de Estadística 37, 47–56 SINHA, S.K. (1986b): Reliability and Life Testing; Wiley, New York SINHA, S.K. (1987): Bayesian estimation of the parameters and reliability function of a mixture of Weibull life distributions; Journal of Statistical Planning and Inference 16, 377–387 SINHA, S.K. / GUTTMAN, I. (1988): Bayesian analysis of life–testing problems involving the Weibull distribution; Communications in Statistics — Theory and Methods 17, 343–356 SINHA, S.K. / SLOAN, J.A. (1988): Bayesian estimation of the parameters and reliability function of the 3–parameter Weibull distribution; IEEE Transactions on Reliability 37, 364–369 SINHA, S.K. / SLOAN, J.A. (1989): Prediction interval for a mixture of Weibull failure time distributions: A Bayesian approach; South African Statistical Journal 23, 119–130 SIRVANCI, M. (1984): An estimator for the scale parameter of the two parameter Weibull distribution for type I singly right–censored data; Communications in Statistics — Theory and Methods 13, 1759–1768 SIRVANCI, M. / YANG, G. (1984): Estimation of the Weibull parameters under type I censoring; Journal of the American Statistical Association 79, 183–187 SKINNER, C.J. / HUMPHREYS, K. (1999): Weibull regression for lifetimes measured with errors; Lifetime Data Analysis 5, 23–37 SLYMEN, D.J. / LACHENBRUCH, P.A. (1984): Survival distributions arising from two families and generated by transformations; Communications in Statistics — Theory and Methods 13, 1179–1201 SMITH, R.L. (1985): Maximum likelihood estimation in a class of nonregular cases; Biometrika 72, 67–90 SMITH, R.L. / NAYLOR, J.C. (1987): A comparison of maximum likelihood and Bayesian estimators for the three–parameter Weibull distribution; Applied Statistics 36, 358–369 SMITH, R.M. (1977): Some results on interval estimation for the two parameter Weibull or extreme–value distribution; Communications in Statistics — Theory and Methods 6, 1311–1321 SMITH, R.M. / BAIN, L.J. (1975): An exponential power life–testing distribution; Communications in Statistics — Theory and Methods 4, 469–481 SMITH, R.M. / BAIN, L.J. (1976): Correlation type goodness–of–fit statistics with censored sampling; Communications in Statistics — Theory and Methods 5, 119–132 SMITH, W.L. (1958): Renewal theory and its ramifications; Journal Royal Statistical Society B 20, 243–302 SMITH, W.L. (1959): On the cumulants of renewal processes; Biometrika 46 SMITH, W.L. / LEADBETTER, M.R. (1963): On the renewal function for the Weibull distribution; Technometrics 5, 393–396 SOLAND, R.M. (1966): Use of the Weibull distribution in Bayesian decision theory; Technical Paper RAC–TP 225, Research Analysis Corporation, McLean, VA SOLAND, R.M. (1968a): Renewal functions for gamma and Weibull distribution with increasing hazard rate; Technical Paper RAC–TP 329, Research Analysis Corporation, McLean, VA SOLAND, R.M. (1968b): Bayesian analysis of the Weibull process with unknown scale parameter and its application to acceptance sampling; IEEE Transactions on Reliability 17, 84–90 © 2009 by Taylor & Francis Group, LLC
Bibliography 753 SOLAND, R.M. (1968c): A renewal theoretic approach to the estimation of future demand for replacement parts; Operations Research 16, 36–51 SOLAND, R.M. (1969a): Bayesian analysis of the Weibull process with unknown scale and shape parameters; IEEE Transactions on Reliability 18, 181–184 SOLAND, R.M. (1969b): Availability of renewal functions for gamma and Weibull distributions with increasing hazard rate; Operations Research 17, 536–543 SOMERVILLE, P.N. (1977): Some aspects of the use of the Mann–Fertig statistic to obtain confidence interval estimates for the treshold parameter of the Weibull; in TSOKOS, C.P. / SHIMI, I.N., (eds.): The Theory and Applications of Reliability, Vol. I, Academic Press, New York, 423–432 SPLITSTONE, D. (1967): Estimation of the Weibull shape and scale parameters; Master thesis, Iowa State University SPURRIER, J.D. / WEIER, D.R. (1981): Bivariate survival model derived from a Weibull distribution; IEEE Transactions on Reliability 30, 194–197 SRINIVASAN, R. / WHARTON, R.M. (1975): Confidence bands for the Weibull distribution; Technometrics 17, 375–380 SRIVASTAVA, J. (1987): More efficient and less time–consuming designs for life testing; Journal of Statistical Planning and Inference 16, 389–413 SRIVASTAVA, J. (1989): Advances in the statistical theory of comparison of lifetimes of machines under the generalized Weibull distribution; Communications in Statistics — Theory and Methods 18, 1031–1045 SRIVASTAVA, M.S. (1967): A characterization of the exponential distribution; American Mathematical Monthly 74, 414–416 SRIVASTAVA, T.N. (1974): Life tests with periodic change in the scale parameter of a Weibull distribution; IEEE Transactions on Reliability 23, 115–118 STACY, E.W. (1962): A generalization of the gamma distribution; Annals of Mathemagtical Stastistics 33, 1187–1192 STACY, E.W. / MIHRAM, G.A. (1965): Parameter estimation for a generalized gamma distribution; Technometrics 7, 349–357 STALLARD, N. / WHITEHEAD, A. (2000): Modified Weibull multi–state models for the analysis of animal carciogenicity; Environmental and Ecological Statistics 7, 117–133 STANGE, K. (1953a): A generalization of the Rosin–Rammler–Sperling size distribution for finely ground material (in German); Mitteilungsblatt für Mathematische Statistik 5, 143–158 STANGE, K. (1953b): On the laws of size distribution in grinding processes (in German); Ingenieur–Archiv 21, 368–380 STAUFFER, H.B. (1979): A derivation of the Weibull distribution; Journal of Theoretical Biology 81, 55–63 STEIN, W.E. / DATTERO, R. (1984): A new discrete Weibull distribution; IEEE Transactions on Reliability 33, 196–197 STEINECKE, V. (1979): Weibull Probability Paper — Explanation and Handling (in German); 2nd ed.; DGQ–Schrift Nr. 17–25, Beuth, Berlin STEPHENS, M.A. (1977): Goodness–of–fit for the extreme value distribution; Biometrika 64, 583– 588 © 2009 by Taylor & Francis Group, LLC
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© 2009 by Taylor & Francis Group,
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Chapman & Hall/CRC Taylor & Francis
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IV Contents 2.7 Aging criteria . .
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VI Contents 6.2 WEIBULL characteriz
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VIII Contents 11 Parameter estimati
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X Contents 15.1.1 The key ideas . .
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XII Contents 22 WEIBULL goodness-of
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XIV Preface by the three parameters
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List of Figures 1/1 Densities of th
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List of Figures XIX 9/7 Dataset #1
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List of Tables 1/1 Comparison of th
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List of Tables XXIII 12/6 Elements
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© 2009 by Taylor & Francis Group,
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4 1 History and meaning of the WEIB
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10 1 History and meaning of the WEI
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28 2 Definition and properties of t
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3 Related distributions This chapte
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100 3 Related distributions Figure
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102 3 Related distributions Whereas
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104 3 Related distributions The adv
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106 3 Related distributions and the
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108 3 Related distributions Unfortu
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110 3 Related distributions Type-II
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112 3 Related distributions The DF
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114 3 Related distributions Using T
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116 3 Related distributions Table 3
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118 3 Related distributions With n
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120 3 Related distributions viewpoi
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122 3 Related distributions The typ
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124 3 Related distributions is the
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126 3 Related distributions This le
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130 3 Related distributions The haz
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132 3 Related distributions with ©
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134 3 Related distributions truncat
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136 3 Related distributions The fir
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138 3 Related distributions by link
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140 3 Related distributions c=3 f2(
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142 3 Related distributions for ind
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144 3 Related distributions The DF
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146 3 Related distributions but has
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150 3 Related distributions discret
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152 3 Related distributions From (3
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156 3 Related distributions Let ©
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158 3 Related distributions Var(X |
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160 3 Related distributions The cor
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162 3 Related distributions • λ
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164 3 Related distributions • λ
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166 3 Related distributions We ment
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168 3 Related distributions 3.3.8 W
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170 3 Related distributions where (
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172 3 Related distributions popular
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174 3 Related distributions There i
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176 3 Related distributions Three i
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178 3 Related distributions The are
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180 3 Related distributions LU (198
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182 3 Related distributions Differe
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184 3 Related distributions 3.3.9.2
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186 3 Related distributions The joi
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188 3 Related distributions They di
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190 4 WEIBULL processes and WEIBULL
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224 5 Order statistics and related
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6 Characterizations 1 Characterizat
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256 6 Characterizations Proof of Pr
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258 6 Characterizations has the sam
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260 6 Characterizations Integration
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262 6 Characterizations Theorem 8 (
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264 6 Characterizations Theorem 9 (
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266 6 Characterizations Tn Xn:n), f
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268 6 Characterizations Theorem 16
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270 6 Characterizations i.e., u,v,w
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272 6 Characterizations and the com
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7 WEIBULL applications and aids in
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7.1 A survey of WEIBULL application
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7.2 Aids in WEIBULL analysis 285 7.
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8.2 Parameters of a life test plan
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8.2 Parameters of a life test plan
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8.3 Types of life test plans 291 in
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8.3 Types of life test plans 293 Th
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8.3 Types of life test plans 295 Ta
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8.3 Types of life test plans 297 be
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8.3 Types of life test plans 299 an
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8.3 Types of life test plans 301 As
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8.3 Types of life test plans 303
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8.3 Types of life test plans 305 4.
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8.3 Types of life test plans 307 wh
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8.3 Types of life test plans 309 No
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8.3 Types of life test plans 311 Fi
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9 Parameter estimation — Graphica
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9.1 General remarks on parameter es
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9.2 Motivation for and types of gra
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9.3 WEIBULL plotting techniques 335
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10 Parameter estimation — Least s
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10.1 From OLS to linear estimation
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10.2 BLUEs for the Log-WEIBULL dist
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10.3 BLIEs for Log-WEIBULL paramete
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10.4 Approximations to BLUEs and BL
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10.5 Linear estimation with a few o
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Table 10/8: BLUES of a ∗ and b
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10.6 Linear estimation of a subset
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10.6 Linear estimation of a subset
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10.7 Miscellaneous problems of line
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10.7 Miscellaneous problems of line
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11.1 Likelihood functions and likel
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11.2 Statistical and computational
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11.3 Uncensored samples with non-gr
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11.4 Uncensored samples with groupe
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11.5 Samples censored on both sides
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11.6 Samples singly censored on the
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11.7 Samples progressively censored
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11.7 Samples progressively censored
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11.8 Randomly censored samples 453
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12 Parameter estimation — Methods
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12.1 Traditional method of moments
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12.2 Modified method of moments 467
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12.2 Modified method of moments 469
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12.3 W. WEIBULL’s approaches to e
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12.4 Method of probability weighted
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12.5 Method of fractional moments 4
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13.1 Method of percentiles 477 For
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13.1 Method of percentiles 479 dete
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13.1 Method of percentiles 481 It f
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13.1 Method of percentiles 483 size
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13.2 Minimum distance estimators 48
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13.2 Minimum distance estimators 48
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13.3 Some hybrid estimation methods
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13.4 Miscellaneous approaches 491
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13.4 Miscellaneous approaches 493 E
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13.4 Miscellaneous approaches 495 A
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13.4 Miscellaneous approaches 497 (
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13.5 Further estimators for only on
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13.6 Comparisons of classical estim
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14 Parameter estimation — BAYESIA
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14.1 Foundations of BAYESIAN infere
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14.1 Foundations of BAYESIAN infere
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14.2 Two-parameter WEIBULL distribu
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14.3 Empirical BAYES estimation 529
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15 Parameter estimation — Further
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15.2 Structural inference 533 15.2.
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15.2 Structural inference 535 In th
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16.1 Life-stress relationships 537
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16.1 Life-stress relationships 539
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16.2 ALT using constant stress mode
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16.3 ALT using step-stress models 5
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16.4 ALT using progressive stress m
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16.5 Models for PALT 553 tions is F
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16.5 Models for PALT 555 and the co
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17 Parameter estimation for mixed W
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17.1 Classical estimation approache
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17.2 BAYESIAN estimation approaches
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17.2 BAYESIAN estimation approaches
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18 Inference of WEIBULL processes T
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18.1 Failure truncation 573 as note
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18.1 Failure truncation 575 distrib
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18.1 Failure truncation 577 18.1.2
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18.2 Time truncation 579 18.2 Time
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18.3 Other methods of collecting da
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18.4 Estimation based on DUANE’s
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19 Estimation of percentiles and re
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19.1 Percentiles, reliability and t
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19.2 Classical methods of estimatin
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19.4 Tolerance intervals 601 each i
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19.4 Tolerance intervals 603 Table
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19.4 Tolerance intervals 605 by whe
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19.5 BAYESIAN approaches 607 Assumi
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19.5 BAYESIAN approaches 609 When s
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20.1 Classical prediction 611 calle
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20.1 Classical prediction 613 The s
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20.1 Classical prediction 615 Examp
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20.1 Classical prediction 617 for s
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20.1 Classical prediction 619 Sect.
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20.1 Classical prediction 621 The F
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20.2 BAYESIAN prediction 623 where
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21.1 Testing hypotheses on function
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22 WEIBULL goodness-of-fit testing
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22.1 Goodness-of-fit testing 653 (s
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22.1 Goodness-of-fit testing 655 Th
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22.1 Goodness-of-fit testing 657 Re
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22.1 Goodness-of-fit testing 659 Ta
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22.1 Goodness-of-fit testing 663 Fi
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22.1 Goodness-of-fit testing 665 3.
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22.1 Goodness-of-fit testing 667 Co
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22.1 Goodness-of-fit testing 671 Th
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22.2 Discrimination between WEIBULL
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22.3 Selecting the better of severa
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22.3 Selecting the better of severa
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Table of the gamma, digamma and tri
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Abbreviations 695 Abbreviations ABL
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Abbreviations 697 RP renewal proces
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Mathematical and statistical notati
Page 721 and 722: Bibliography A-A-A-A-A ABDEL-GHALY,
Page 723 and 724: Bibliography 703 AROIAN, L.A. / ROB
Page 725 and 726: Bibliography 705 BALASOORIYA, U. /
Page 727 and 728: Bibliography 707 BHATTACHARYYA, G.K
Page 729 and 730: Bibliography 709 CALABRIA, R. / PUL
Page 731 and 732: Bibliography 711 CHRISTOPEIT, N. (1
Page 733 and 734: Bibliography 713 DALLAS, A.C. (1982
Page 735 and 736: Bibliography 715 DUFOUR, R. / MAAG,
Page 737 and 738: Bibliography 717 ESCOBAR, L.A. / ME
Page 739 and 740: Bibliography 719 GALAMBOS, J. (1981
Page 741 and 742: Bibliography 721 density functions;
Page 743 and 744: Bibliography 723 HASSANEIN, K.M. (1
Page 745 and 746: Bibliography 725 HUGHES, D.W. (1978
Page 747 and 748: Bibliography 727 KAGAN, A.M. / LINN
Page 749 and 750: Bibliography 729 KIM, B.H. / CHANG,
Page 751 and 752: Bibliography 731 tion and Computati
Page 753 and 754: Bibliography 733 LOVE, G.E. / GUO,
Page 755 and 756: Bibliography 735 MANN, N.R. / FERTI
Page 757 and 758: Bibliography 737 MEEKER, W.Q. JR. (
Page 759 and 760: Bibliography 739 MUDHOLKAR, G.S. /
Page 761 and 762: Bibliography 741 NEWBY, M.J. (1982)
Page 763 and 764: Bibliography 743 PANCHANG, V.G. / G
Page 765 and 766: Bibliography 745 PROSCHAN, F. (1963
Page 767 and 768: Bibliography 747 RIGDON, S.E. / BAS
Page 769 and 770: Bibliography 749 SALVIA, A.A. (1996
Page 771: Bibliography 751 SHESHADRI, V. (196
Page 775 and 776: Bibliography 755 TALKNER, P. / WEBE
Page 777 and 778: Bibliography 757 U-U-U-U-U UMBACH,
Page 779 and 780: Bibliography 759 WHITE, J.S. (1964a
Page 781: Bibliography 761 YILDIRIM, F. (1996
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