Table of Contents

Chapter 2 The 2-level model
2.1 Introduction
2.2 The 2-level model
2.3 Parameter estimation
2.4 Maximum likelihood estimation using Iterative Generalised Least Squares (IGLS)
2.5 Marginal models and Generalized Estimating Equations (GEE)
2.6 Residuals
2.7 The adequacy of Ordinary Least Squares estimates.
2.8 A 2-level example using longitudinal educational achievement data
2.9 General model diagnostics
2.10 Higher level explanatory variables and compositional effects
2.11 Transforming to normality
2.12 Hypothesis testing and confidence intervals
2.13 Bayesian estimation using Markov Chain Monte Carlo (MCMC)
2.14 Data augmentation
Appendix 2.1 The general structure and maximum likelihood estimation for a multilevel model
Appendix 2.2 Multilevel residuals estimation
Appendix 2.3 Estimation using profile and extended likelihood
Appendix 2.4 The EM algorithm
Appendix 2.5 MCMC sampling

Chapter 3. Three level models and more complex hierarchical structures.
3.1 Complex variance structures
3.2 A 3-level complex variation model example.
3.3 Parameter Constraints
3.4 Weighting units
3.5 Robust (Sandwich) Estimators and Jacknifing
3.6 The bootstrap
3.7 Aggregate level analyses
3.8 Meta analysis
3.9 Design issues

Chapter 4. Multilevel Models for discrete response data
4.1 Generalised linear models
4.2 Proportions as responses
4.3 Examples
4.4 Models for multiple response categories
4.5 Models for counts
4.6 Mixed discrete - continuous response models
4.7 A latent normal model for binary responses
4.8 Partitioning variation in discrete response models
Appendix 4.1. Generalised linear model estimation

Appendix 4.2 Maximum likelihood estimation for generalised linear models

Appendix 4.3 MCMC estimation for generalised linear models

Appendix 4.4. Bootstrap estimation for generalised linear models

Chapter 5. Models for repeated measures data
5.1 Repeated measures data
5.2 A 2-level repeated measures model
5.3 A polynomial model example for adolescent growth and the prediction of adult height
5.4 Modelling an autocorrelation structure at level 1.
5.5 A growth model with autocorrelated residuals
5.6 Multivariate repeated measures models
5.7 Scaling across time
5.8 Cross-over designs
5.9 Missing data
5.10 Longitudinal discrete response data

Chapter 6. Multivariate multilevel data
6.1 Introduction
6.2 The basic 2-level multivariate model
6.3 Rotation Designs
6.4 A rotation design example using Science test scores
6.5 Informative response selection: subject choice in examinations
6.6 Multivariate structures at higher levels and future predictions
6.7 Multivariate responses at several levels
6.8 Principal Components analysis

Appendix 6.1 MCMC algorithm for a multivariate normal response model with constraints

Chapter 7. Latent normal models for multivariate data
7.1 The normal multilevel multivariate model
7.2 Sampling binary responses
7.3 Sampling ordered categorical responses
7.4 Sampling unordered categorical responses
7.5 Sampling count data
7.6 Sampling continuous non-normal data
7.7 Sampling the level 1 and level 2 covariance matrices
7.8 Model fit
7.9 Partially ordered data
7.10 Hybrid normal/ordered variables
7.11 Discussion

Chapter 8. Multilevel factor analysis, structural equation and mixture models

8.1 A 2-stage 2-level factor model

8.2 A general multilevel factor model

8.3 MCMC estimation for the factor model

8.4 Structural equation models

8.5 Discrete response multilevel structural equation models

8.6 More complex hierarchical latent variable models

8.7 Multilevel mixture models 

Chapter 9. Nonlinear multilevel models
9.1 Introduction
9.2 Nonlinear functions of linear components
9.3 Estimating population means
9.4 Nonlinear functions for variances and covariances
9.5 Examples of nonlinear growth and nonlinear level 1 variance
Appendix 9.1 Nonlinear model estimation

Chapter 10. Multilevel modelling in sample surveys
10.1 Sample survey structures
10.2 Population structures
10.3 Small area estimation

Chapter 11 Multilevel event history and survival models
11.1 Introduction
11.2 Censoring
11.3 Hazard and survival funtions
11.4 Parametric proportional hazard models
11.5 The semiparametric Cox model
11.6 Tied observations
11.7 Repeated events proportional hazard models
11.8 Example using birth interval data
11.9 Log duration models
11.10 Examples with birth interval data and children’s activity episodes
11.11 The grouped discrete time hazards model
11.12 Discrete time latent normal event history models

Chapter 12. Cross classified data structures
12.1 Random cross classifications
12.2 A basic cross classified model
12.3 Examination results for a cross classification of schools
12.4 Interactions in cross classifications
12.5 Cross classifications with one unit per cell
12.6 Multivariate cross classified models
12.7 A general notation for cross classifications
12.8 MCMC estimation in cross classified models
Appendix 12.1 IGLS Estimation for cross classified data.

Chapter 13 Multiple membership models
13.1 Multiple membership structures
13.2 Notation and classifications for multiple membership structures
13.3 An example of salmonella infection
13.4 A repeated measures multiple membership model
13.5 Individuals as higher level units
13.5.1 Example of research grant awards
13.6 Spatial models
13.7 Missing identification models

Appendix 13.1 MCMC estimation for multiple membership models.

Chapter 14 Measurement errors in multilevel models
14.1 A basic measurement error model
14.2 Moment based estimators
14.3 A 2-level example with measurement error at both levels.
14.4 Multivariate responses
14.5 Nonlinear models
14.6 Measurement errors for discrete explanatory variables
14.7 MCMC estimation for measurement error models
Appendix 14.1 Measurement error estimation
14.2 MCMC estimation for measurement error models

Chapter 15. Smoothing models for multilevel data.
15.1 Introduction
15.2. Smoothing estimators
15.3 Smoothing splines
15.4 Semi parametric smoothing models
15.5 Multilevel smoothing models
15.6 General multilevel semi-parametric smoothing models
15.7 Generalised linear models
15.8 An example
Fixed
Random
15.9 Conclusions

Chapter 16. Missing data, partially observed data and multiple imputation
16.1 Creating a completed data set
16.2 Joint modelling for missing data
16.3 A two level model with responses of different types at both levels.
16.4 Multiple imputation
16.5 A simulation example of multiple imputation for missing data
16.6 Longitudinal data with attrition
16.7 Partially known data values
16.8 Conclusions

Chapter 17 Multilevel models with correlated random effects
17.1 Non-independence of level 2 residuals
17.2 MCMC estimation for non-independent level 2 residuals
17.3 Adaptive proposal distributions in MCMC estimation
17.4 MCMC estimation for non-independent level 1 residuals
17.5 Modelling the level 1 variance as a function of explanatory variables with random effects
17.6 Discrete responses with correlated random effects
17.7 Calculating the DIC statistic
17.8 A growth data set
17.9 Conclusions

Chapter 18. Software for multilevel modelling

References

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