Details

<p>List of Figures xv</p> <p>List of Tables xvii</p> <p>Foreword to the First Edition xix</p> <p>Preface to the Second Edition xxiii</p> <p>Preface to the First Edition xxvii</p> <p><b>1 *Introduction 1</b></p> <p>1.1 What is a Small Area? 1</p> <p>1.2 Demand for Small Area Statistics 3</p> <p>1.3 Traditional Indirect Estimators 4</p> <p>1.4 Small Area Models 4</p> <p>1.5 Model-Based Estimation 5</p> <p>1.6 Some Examples 6</p> <p>1.6.1 Health 6</p> <p>1.6.2 Agriculture 7</p> <p>1.6.3 Income for Small Places 8</p> <p>1.6.4 Poverty Counts 8</p> <p>1.6.5 Median Income of Four-Person Families 8</p> <p>1.6.6 Poverty Mapping 8</p> <p><b>2 Direct Domain Estimation 9</b></p> <p>2.1 Introduction 9</p> <p>2.2 Design-Based Approach 10</p> <p>2.3 Estimation of Totals 11</p> <p>2.3.1 Design-Unbiased Estimator 11</p> <p>2.3.2 Generalized Regression Estimator 13</p> <p>2.4 Domain Estimation 16</p> <p>2.4.1 Case of No Auxiliary Information 16</p> <p>2.4.2 GREG Domain Estimation 17</p> <p>2.4.3 Domain-Specific Auxiliary Information 18</p> <p>2.5 Modified GREG Estimator 21</p> <p>2.6 Design Issues 23</p> <p>2.6.1 Minimization of Clustering 24</p> <p>2.6.2 Stratification 24</p> <p>2.6.3 Sample Allocation 24</p> <p>2.6.4 Integration of Surveys 25</p> <p>2.6.5 Dual-Frame Surveys 25</p> <p>2.6.6 Repeated Surveys 26</p> <p>2.7 *Optimal Sample Allocation for Planned Domains 26</p> <p>2.7.1 Case (i) 26</p> <p>2.7.2 Case (ii) 29</p> <p>2.7.3 Two-Way Stratification: Balanced Sampling 31</p> <p>2.8 Proofs 32</p> <p>2.8.1 Proof of <i>Ŷ</i>_GR(<b>𝐱</b>) = <b>𝐗</b> 32</p> <p>2.8.2 Derivation of Calibration Weights <i>𝑤</i>^∗<i>_j </i>32</p> <p>2.8.3 Proof of <i>Y </i>= <b>X^</b><i>^T</i><b>𝐁</b><b><i>^</i></b>when <i>c_j </i>= <b><i>𝝂</i></b><i>^T</i><b>𝐗</b><i>_j</i> 32</p> <p><b>3 Indirect Domain Estimation 35</b></p> <p>3.1 Introduction 35</p> <p>3.2 Synthetic Estimation 36</p> <p>3.2.1 No Auxiliary Information 36</p> <p>3.2.2 *Area Level Auxiliary Information 36</p> <p>3.2.3 *Unit Level Auxiliary Information 37</p> <p>3.2.4 Regression-Adjusted Synthetic Estimator 42</p> <p>3.2.5 Estimation of MSE 43</p> <p>3.2.6 Structure Preserving Estimation 45</p> <p>3.2.7 *Generalized SPREE 49</p> <p>3.2.8 *Weight-Sharing Methods 53</p> <p>3.3 Composite Estimation 57</p> <p>3.3.1 Optimal Estimator 57</p> <p>3.3.2 Sample-Size-Dependent Estimators 59</p> <p>3.4 James–Stein Method 63</p> <p>3.4.1 Common Weight 63</p> <p>3.4.2 Equal Variances <i>𝜓_i </i>= <i>𝜓</i> 64</p> <p>3.4.3 Estimation of Component MSE 68</p> <p>3.4.4 Unequal Variances <i>𝜓_i</i> 70</p> <p>3.4.5 Extensions 71</p> <p>3.5 Proofs 71</p> <p><b>4 Small Area Models 75</b></p> <p>4.1 Introduction 75</p> <p>4.2 Basic Area Level Model 76</p> <p>4.3 Basic Unit Level Model 78</p> <p>4.4 Extensions: Area Level Models 81</p> <p>4.4.1 Multivariate Fay–Herriot Model 81</p> <p>4.4.2 Model with Correlated Sampling Errors 82</p> <p>4.4.3 Time Series and Cross-Sectional Models 83</p> <p>4.4.4 *Spatial Models 86</p> <p>4.4.5 Two-Fold Subarea Level Models 88</p> <p>4.5 Extensions: Unit Level Models 88</p> <p>4.5.1 Multivariate Nested Error Regression Model 88</p> <p>4.5.2 Two-Fold Nested Error Regression Model 89</p> <p>4.5.3 Two-Level Model 90</p> <p>4.5.4 General Linear Mixed Model 91</p> <p>4.6 Generalized Linear Mixed Models 92</p> <p>4.6.1 Logistic Mixed Models 92</p> <p>4.6.2 *Models for Multinomial Counts 93</p> <p>4.6.3 Models for Mortality and Disease Rates 93</p> <p>4.6.4 Natural Exponential Family Models 94</p> <p>4.6.5 *Semi-parametric Mixed Models 95</p> <p><b>5 Empirical Best Linear Unbiased Prediction (EBLUP): Theory 97</b></p> <p>5.1 Introduction 97</p> <p>5.2 General Linear Mixed Model 98</p> <p>5.2.1 BLUP Estimator 98</p> <p>5.2.2 MSE of BLUP 100</p> <p>5.2.3 EBLUP Estimator 101</p> <p>5.2.4 ML and REML Estimators 102</p> <p>5.2.5 MSE of EBLUP 105</p> <p>5.2.6 Estimation of MSE of EBLUP 106</p> <p>5.3 Block Diagonal Covariance Structure 108</p> <p>5.3.1 EBLUP Estimator 108</p> <p>5.3.2 Estimation of MSE 109</p> <p>5.3.3 Extension to Multidimensional Area Parameters 110</p> <p>5.4 *Model Identification and Checking 111</p> <p>5.4.1 Variable Selection 111</p> <p>5.4.2 Model Diagnostics 114</p> <p>5.5 *Software 118</p> <p>5.6 Proofs 119</p> <p>5.6.1 Derivation of BLUP 119</p> <p>5.6.2 Equivalence of BLUP and Best Predictor <i>E</i>(<b>𝐦</b><i>^T</i><b>𝐯</b>|<b>𝐀</b><i>^T</i><b>𝐲</b>) 120</p> <p>5.6.3 Derivation of MSE Decomposition (5.2.29) 121</p> <p><b>6 Empirical Best Linear Unbiased Prediction (EBLUP): Basic Area Level Model 123</b></p> <p>6.1 EBLUP Estimation 123</p> <p>6.1.1 BLUP Estimator 124</p> <p>6.1.2 Estimation of <i>𝜎</i>²<i>_𝑣 </i>126</p> <p>6.1.3 Relative Efficiency of Estimators of <i>𝜎</i>²<i>_𝑣 </i>128</p> <p>6.1.4 *Applications 129</p> <p>6.2 MSE Estimation 136</p> <p>6.2.1 Unconditional MSE of EBLUP 136</p> <p>6.2.2 MSE for Nonsampled Areas 139</p> <p>6.2.3 *MSE Estimation for Small Area Means 140</p> <p>6.2.4 *Bootstrap MSE Estimation 141</p> <p>6.2.5 *MSE of a Weighted Estimator 143</p> <p>6.2.6 Mean Cross Product Error of Two Estimators 144</p> <p>6.2.7 *Conditional MSE 144</p> <p>6.3 *Robust Estimation in the Presence of Outliers 146</p> <p>6.4 *Practical Issues 148</p> <p>6.4.1 Unknown Sampling Error Variances 148</p> <p>6.4.2 Strictly Positive Estimators of <i>𝜎</i>²<i>_𝑣 </i>151</p> <p>6.4.3 Preliminary Test Estimation 154</p> <p>6.4.4 Covariates Subject to Sampling Errors 156</p> <p>6.4.5 Big Data Covariates 159</p> <p>6.4.6 Benchmarking Methods 159</p> <p>6.4.7 Misspecified Linking Model 165</p> <p>6.5 *Software 169</p> <p><b>7 Basic Unit Level Model 173</b></p> <p>7.1 EBLUP Estimation 173</p> <p>7.1.1 BLUP Estimator 174</p> <p>7.1.2 Estimation of <i>𝜎</i>²<i>_𝑣 </i>and <i>𝜎</i>²<i>_e </i>177</p> <p>7.1.3 *Nonnegligible Sampling Fractions 178</p> <p>7.2 MSE Estimation 179</p> <p>7.2.1 Unconditional MSE of EBLUP 179</p> <p>7.2.2 Unconditional MSE Estimators 181</p> <p>7.2.3 *MSE Estimation: Nonnegligible Sampling Fractions 182</p> <p>7.2.4 *Bootstrap MSE Estimation 183</p> <p>7.3 *Applications 186</p> <p>7.4 *Outlier Robust EBLUP Estimation 193</p> <p>7.4.1 Estimation of Area Means 193</p> <p>7.4.2 MSE Estimation 198</p> <p>7.4.3 Simulation Results 199</p> <p>7.5 *M-Quantile Regression 200</p> <p>7.6 *Practical Issues 205</p> <p>7.6.1 Unknown Heteroscedastic Error Variances 205</p> <p>7.6.2 Pseudo-EBLUP Estimation 206</p> <p>7.6.3 Informative Sampling 211</p> <p>7.6.4 Measurement Error in Area-Level Covariate 216</p> <p>7.6.5 Model Misspecification 218</p> <p>7.6.6 Semi-parametric Nested Error Model: EBLUP 220</p> <p>7.6.7 Semi-parametric Nested Error Model: REBLUP 224</p> <p>7.7 *Software 227</p> <p>7.8 *Proofs 231</p> <p>7.8.1 Derivation of (7.6.17) 231</p> <p>7.8.2 Proof of (7.6.20) 232</p> <p><b>8 EBLUP: Extensions 235</b></p> <p>8.1 *Multivariate Fay–Herriot Model 235</p> <p>8.2 Correlated Sampling Errors 237</p> <p>8.3 Time Series and Cross-Sectional Models 240</p> <p>8.3.1 *Rao–Yu Model 240</p> <p>8.3.2 State-Space Models 243</p> <p>8.4 *Spatial Models 248</p> <p>8.5 *Two-Fold Subarea Level Models 251</p> <p>8.6 *Multivariate Nested Error Regression Model 253</p> <p>8.7 Two-Fold Nested Error Regression Model 254</p> <p>8.8 *Two-Level Model 259</p> <p>8.9 *Models for Multinomial Counts 261</p> <p>8.10 *EBLUP for Vectors of Area Proportions 262</p> <p>8.11 *Software 264</p> <p><b>9 Empirical Bayes (EB) Method 269</b></p> <p>9.1 Introduction 269</p> <p>9.2 Basic Area Level Model 270</p> <p>9.2.1 EB Estimator 271</p> <p>9.2.2 MSE Estimation 273</p> <p>9.2.3 Approximation to Posterior Variance 275</p> <p>9.2.4 *EB Confidence Intervals 281</p> <p>9.3 Linear Mixed Models 287</p> <p>9.3.1 EB Estimation of <i>𝜇_i </i>= <b>𝐥</b><i>_i^T</i><b><i>𝜷 </i></b>+ <b>𝐦</b><i>^T_i </i><b>𝐯</b><i>_i</i> 287</p> <p>9.3.2 MSE Estimation 288</p> <p>9.3.3 Approximations to the Posterior Variance 288</p> <p>9.4 *EB Estimation of General Finite Population Parameters 289</p> <p>9.4.1 BP Estimator Under a Finite Population 290</p> <p>9.4.2 EB Estimation Under the Basic Unit Level Model 290</p> <p>9.4.3 FGT Poverty Measures 293</p> <p>9.4.4 Parametric Bootstrap for MSE Estimation 294</p> <p>9.4.5 ELL Estimation 295</p> <p>9.4.6 Simulation Experiments 296</p> <p>9.5 Binary Data 298</p> <p>9.5.1 *Case of No Covariates 299</p> <p>9.5.2 Models with Covariates 304</p> <p>9.6 Disease Mapping 308</p> <p>9.6.1 Poisson–Gamma Model 309</p> <p>9.6.2 Log-Normal Models 310</p> <p>9.6.3 Extensions 312</p> <p>9.7 *Design-Weighted EB Estimation: Exponential Family Models 313</p> <p>9.8 Triple-Goal Estimation 315</p> <p>9.8.1 Constrained EB 316</p> <p>9.8.2 Histogram 318</p> <p>9.8.3 Ranks 318</p> <p>9.9 Empirical Linear Bayes 319</p> <p>9.9.1 LB Estimation 319</p> <p>9.9.2 Posterior Linearity 322</p> <p>9.10 Constrained LB 324</p> <p>9.11 *Software 325</p> <p>9.12 Proofs 330</p> <p>9.12.1 Proof of (9.2.11) 330</p> <p>9.12.2 Proof of (9.2.30) 330</p> <p>9.12.3 Proof of (9.8.6) 331</p> <p>9.12.4 Proof of (9.9.1) 331</p> <p><b>10 Hierarchical Bayes (HB) Method 333</b></p> <p>10.1 Introduction 333</p> <p>10.2 MCMC Methods 335</p> <p>10.2.1 Markov Chain 335</p> <p>10.2.2 Gibbs Sampler 336</p> <p>10.2.3 M–H Within Gibbs 336</p> <p>10.2.4 Posterior Quantities 337</p> <p>10.2.5 Practical Issues 339</p> <p>10.2.6 Model Determination 342</p> <p>10.3 Basic Area Level Model 347</p> <p>10.3.1 Known <i>𝜎</i>²<i>_𝑣 </i>347</p> <p>10.3.2 *Unknown <i>𝜎</i>²<i>_𝑣</i>: Numerical Integration 348</p> <p>10.3.3 Unknown <i>𝜎</i>²<i>_𝑣</i>: Gibbs Sampling 351</p> <p>10.3.4 *Unknown Sampling Variances <i>𝜓_i</i> 354</p> <p>10.3.5 *Spatial Model 355</p> <p>10.4 *Unmatched Sampling and Linking Area Level Models 356</p> <p>10.5 Basic Unit Level Model 362</p> <p>10.5.1 Known <i>𝜎</i>²<i>_𝑣 </i>and <i>𝜎</i>²<i>_e</i> 362</p> <p>10.5.2 Unknown <i>𝜎</i>²<i>_𝑣 </i>and <i>𝜎</i>²<i>_e</i>: Numerical Integration 363</p> <p>10.5.3 Unknown <i>𝜎</i>²<i>_𝑣 </i>and <i>𝜎</i>²<i>_e</i>: Gibbs Sampling 364</p> <p>10.5.4 Pseudo-HB Estimation 365</p> <p>10.6 General ANOVA Model 368</p> <p>10.7 *HB Estimation of General Finite Population Parameters 369</p> <p>10.7.1 HB Estimator under a Finite Population 370</p> <p>10.7.2 Reparameterized Basic Unit Level Model 370</p> <p>10.7.3 HB Estimator of a General Area Parameter 372</p> <p>10.8 Two-Level Models 374</p> <p>10.9 Time Series and Cross-Sectional Models 377</p> <p>10.10 Multivariate Models 381</p> <p>10.10.1 Area Level Model 381</p> <p>10.10.2 Unit Level Model 382</p> <p>10.11 Disease Mapping Models 383</p> <p>10.11.1 Poisson-Gamma Model 383</p> <p>10.11.2 Log-Normal Model 384</p> <p>10.11.3 Two-Level Models 386</p> <p>10.12 *Two-Part Nested Error Model 388</p> <p>10.13 Binary Data 389</p> <p>10.13.1 Beta-Binomial Model 389</p> <p>10.13.2 Logit-Normal Model 390</p> <p>10.13.3 Logistic Linear Mixed Models 393</p> <p>10.14 *Missing Binary Data 397</p> <p>10.15 Natural Exponential Family Models 398</p> <p>10.16 Constrained HB 399</p> <p>10.17 *Approximate HB Inference and Data Cloning 400</p> <p>10.18 Proofs 402</p> <p>10.18.1 Proof of (10.2.26) 402</p> <p>10.18.2 Proof of (10.2.32) 402</p> <p>10.18.3 Proof of (10.3.13)–(10.3.15) 402</p> <p>References 405</p> <p>Author Index 431</p> <p>Subject Index 437</p>

<p>"The book is an excellent reference for practicing statisticians and survey methodologists as well as practitioners interested in learning SAE methods. The <i>second edition</i> is also an ideal textbook for graduate-level courses in SAE and reliable small area statistics." (<i>Zentralblatt MATH</i>, 2016)</p>

<p><b>J. N. K. Rao, PhD,</b> is Professor Emeritus and Distinguished Research Professor in the School of Mathematics and Statistics, Carleton University, Ottawa, Canada. He is an editorial advisor for the Wiley Series in Survey Methodology.</p> <p><b>Isabel Molina, PhD,</b> is Associate Professor of Statistics at Universidad Carlos III de Madrid, Spain.</p>

<p><b>Praise for the <i>First Edition</i> </b></p> <p>"This pioneering work, in which Rao provides a comprehensive and up-to-date treatment of small area estimation, will become a classic...I believe that it has the potential to turn small area estimation...into a larger area of importance to both researchers and practitioners."<br />—<b><i>Journal of the American Statistical Association</i></b></p> <p>Written by two experts in the field, <i>Small Area Estimation, Second Edition</i> provides a comprehensive and up-to-date account of the methods and theory of small area estimation (SAE), particularly indirect estimation based on explicit small area linking models. The model-based approach to small area estimation offers several advantages including increased precision, the derivation of "optimal" estimates and associated measures of variability under an assumed model, and the validation of models from the sample data.</p> <p>Emphasizing real data throughout, the <i>Second Edition</i> maintains a self-contained account of crucial theoretical and methodological developments in the field of SAE. The new edition provides extensive accounts of new and updated research, which often involves complex theory to handle model misspecifications and other complexities. Including information on survey design issues and traditional methods employing indirect estimates based on implicit linking models, <i>Small Area Estimation, Second Edition</i> also features:</p> <ul> <li>Additional sections describing the use of R code data sets for readers to use when replicating applications</li> <li>Numerous examples of SAE applications throughout each chapter, including recent applications in U.S. Federal programs</li> <li>New topical coverage on extended design issues, synthetic estimation, further refinements and solutions to the Fay-Herriot area level model, basic unit level models, and spatial and time series models</li> <li>A discussion of the advantages and limitations of various SAE methods for model selection from data as well as comparisons of estimates derived from models to reliable values obtained from external sources, such as previous census or administrative data</li> </ul> <p><i>Small Area Estimation, Second Edition</i> is an excellent reference for practicing statisticians and survey methodologists as well as practitioners interested in learning SAE methods. The <i>Second Edition</i> is also an ideal textbook for graduate-level courses in SAE and reliable small area statistics.</p>

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