05827nam 2200745Ia 450 991083015960332120170919194609.01-282-30740-197866123074090-470-31685-30-470-31769-8(CKB)1000000000687543(EBL)468694(OCoLC)264621195(SSID)ssj0000665019(PQKBManifestationID)12259379(PQKBTitleCode)TC0000665019(PQKBWorkID)10631148(PQKB)10221802(SSID)ssj0000344198(PQKBManifestationID)11275588(PQKBTitleCode)TC0000344198(PQKBWorkID)10306765(PQKB)10658547(MiAaPQ)EBC468694(PPN)159339294(EXLCZ)99100000000068754319910516d1992 uy 0engur|n|---|||||txtccrVariance components[electronic resource] /Shayle R. Searle, George Casella, Charles E. McCullochNew York Wileyc19921 online resource (537 p.)Wiley series in probability and mathematical statistics. Applied probability and statistics"A Wiley-Interscience publication."0-470-00959-4 0-471-62162-5 Includes bibliographical references (p. 475-489) and indexes.Variance Components; CONTENTS; 1. Introduction; 1.1. Factors, levels, cells and effects; 1.2. Balanced and unbalanced data; a. Balanced data; b. Special cases of unbalanced data; -i. Planned unbalancedness; -ii. Estimating missing observations; c. Unbalanced data; 1.3. Fixed effects and random effects; a. Fixed effects models; Example 1 (Tomato varieties); Example 2 (Medications); Example 3 (Soils and, fertilizers); b. Random eflecrs models; Example 4 (Clinics); Example 5 (Dairy bulls); Example 6 (Ball bearings and calipers); c. Mixed models; Example 7 (Medications and clinics)Example 8 ( Varieties and gardens)1.4. Fixed or random?; Example 9 (Mice and technicians); 1.5. Finite populations; 1.6. Summary; a. Characteristics of the fixed effects model and the random eflects model for the I-way classification; b. Examples; c. Fixed or random; 2. History and Comment; 2.1. Analysis of variance; 2.2. Early years: 1861-1949; a. Sources; b. Pre-1900; C. 1900-1939; -i. R. A. Fisher; -ii. L. C. Tippett; -iii. The late 1930s; -iv. Unbalanced data; d. The 1940s; 2.3. Great strides: 1950-1969; a. The Henderson methods; b. ANOVA estimation, in general; -i. Negative estimates-ii. Unhiasedness-iii. Best unbiasedness; -iv. Minimal sujicient statistics; -v. Lack of uniqueness; 2.4 Into the 1970s and beyond; a. Maximum likelihood (M L); b. Restricted maximum likelihood (REML); c. Minimum norm estimation; d. The dispersion-mean model; e. Bayes estimation; f: The recent decade; 3. The I-Way Classification; 3.1. The model; a. The model equation; b. First moments; c. Second moments; 3.2. Matrix formulation of the model; a. Example 1; b. The general case; c. Dispersion matrices; -i. The traditional random model; -ii. Other alternatives; d. Unbalanced data; -i. Example 2-ii. The general case-iii. Dispersion matrix; 3.3 Estimating the mean; 3.4 Predicting random effects; 3.5 ANOVA estimation-balanced data; a. Expected sums of squares; -i. A direct derivation; -ii. Using the matrix formulation; b. ANOVA estimators; c. Negative estimates; d. Normality assumptions; -i. X2-distributions of sums of squares; -ii. Independence of sums of squares; -iii. Sampling variances of estimators; -iv. An F-statistic to test H:σ 2/a =0; -v. Confidence intervals; -vi. Probability of a negative estimate; -vii. Distribution of estimators; 3.6 ANOVA estimation-unbalanced dataa. Expected sums of squares-i. A direct derivation; -ii. Using the matrix formulation; b. ANOVA estimators; c. Negative estimates; d. Normality assumptions; -i. X2-distributions of sums oj squares; -ii. Independence of sums of squares; -iii. Sampling variances of estimators; -iv. The eflect of unhalancedness on sampling variances; -v. F-statistics; -vi. Confidence intervals; 3.7. Maximum likelihood estimation; a. Balanced data; -i. Likelihood; -ii. M L equations and their solutions; -iii. ML estimators; -iv. Expected values and bias; -v. Sampling variances; b. Unbalanced data; -i. Likelihood-ii. ML equations and their solutions<b>WILEY-INTERSCIENCE PAPERBACK SERIES</b> The <b>Wiley-Interscience Paperback Series</b> consists of selected books that have been made more accessible to consumers in an effort to increase global appeal and general circulation. With these new unabridged softcover volumes, Wiley hopes to extend the lives of these works by making them available to future generations of statisticians, mathematicians, and scientists. "". . .<i>Variance Components</i> is an excellent book. It is organized and well written, and provides many references to a variety of topics. I recommend it to anyone with inteWiley series in probability and mathematical statistics.Applied probability and statistics.Analysis of varianceMathematical statisticsAnalysis of variance.Mathematical statistics.519.5519.538Searle S. R(Shayle R.),1928-105121Casella George27435McCulloch Charles E89127MiAaPQMiAaPQMiAaPQBOOK9910830159603321Variance components1130889UNINA