did-you-know? rent-now

Amazon no longer offers textbook rentals. We do!

did-you-know? rent-now

Amazon no longer offers textbook rentals. We do!

We're the #1 textbook rental company. Let us show you why.

9780521686891

Data Analysis Using Regression and Multilevel/Hierarchical Models

by
  • ISBN13:

    9780521686891

  • ISBN10:

    052168689X

  • Edition: 1st
  • Format: Paperback
  • Copyright: 2006-12-18
  • Publisher: Cambridge University Press

Note: Supplemental materials are not guaranteed with Rental or Used book purchases.

Purchase Benefits

  • Free Shipping Icon Free Shipping On Orders Over $35!
    Your order must be $35 or more to qualify for free economy shipping. Bulk sales, PO's, Marketplace items, eBooks and apparel do not qualify for this offer.
  • eCampus.com Logo Get Rewarded for Ordering Your Textbooks! Enroll Now
  • Write a Review Icon Write a Review
List Price: $64.99 Save up to $26.00
  • Rent Book $38.99
    Add to Cart Free Shipping Icon Free Shipping

    TERM
    PRICE
    DUE
    USUALLY SHIPS IN 24-48 HOURS
    *This item is part of an exclusive publisher rental program and requires an additional convenience fee. This fee will be reflected in the shopping cart.

Supplemental Materials

What is included with this book?

Summary

Data Analysis Using Regression and Multilevel/Hierarchical Models is a comprehensive manual for the applied researcher who wants to perform data analysis using linear and nonlinear regression and multilevel models. The book introduces a wide variety of models, whilst at the same time instructing the reader in how to fit these models using available software packages. The book illustrates the concepts by working through scores of real data examples that have arisen from the authors' own applied research, with programming codes provided for each one. Topics covered include causal inference, including regression, poststratification, matching, regression discontinuity, and instrumental variables, as well as multilevel logistic regression and missing-data imputation. Practical tips regarding building, fitting, and understanding are provided throughout.

Author Biography

Jennifer Hill is Assistant Professor of Public Affairs in the Department of International and Public Affairs at Columbia University.

Table of Contents

List of examplesp. xvii
Prefacep. xix
Why?p. 1
What is multilevel regression modeling?p. 1
Some examples from our own researchp. 3
Motivations for multilevel modelingp. 6
Distinctive features of this bookp. 8
Computingp. 9
Concepts and methods from basic probability and statisticsp. 13
Probability distributionsp. 13
Statistical inferencep. 16
Classical confidence intervalsp. 18
Classical hypothesis testingp. 20
Problems with statistical significancep. 22
55,000 residents desperately need your help!p. 23
Bibliographic notep. 26
Exercisesp. 26
Single-level regressionp. 29
Linear regression: the basicsp. 31
One predictorp. 31
Multiple predictorsp. 32
Interactionsp. 34
Statistical inferencep. 37
Graphical displays of data and fitted modelp. 42
Assumptions and diagnosticsp. 45
Prediction and validationp. 47
Bibliographic notep. 49
Exercisesp. 49
Linear regression: before and after fitting the modelp. 53
Linear transformationsp. 53
Centering and standardizing, especially for models with interactionsp. 55
Correlation and "regression to the mean"p. 57
Logarithmic transformationsp. 59
Other transformationsp. 65
Building regression models for predictionp. 68
Fitting a series of regressionsp. 73
Bibliographic notep. 74
Exercisesp. 74
Logistic regressionp. 79
Logistic regression with a single predictorp. 79
Interpreting the logistic regression coefficientsp. 81
Latent-data formulationp. 85
Building a logistic regression model: wells in Bangladeshp. 86
Logistic regression with interactionsp. 92
Evaluating, checking, and comparing fitted logistic regressionsp. 97
Average predictive comparisons on the probability scalep. 101
Identifiability and separationp. 104
Bibliographic notep. 105
Exercisesp. 105
Generalized linear modelsp. 109
Introductionp. 109
Poisson regression, exposure, and overdispersionp. 110
Logistic-binomial modelp. 116
Probit regression: normally distributed latent datap. 118
Ordered and unordered categorical regressionp. 119
Robust regression using the t modelp. 124
Building more complex generalized linear modelsp. 125
Constructive choice modelsp. 127
Bibliographic notep. 131
Exercisesp. 132
Working with regression inferencesp. 135
Simulation of probability models and statistical inferencesp. 137
Simulation of probability modelsp. 137
Summarizing linear regressions using simulation: an informal Bayesian approachp. 140
Simulation for nonlinear predictions: congressional electionsp. 144
Predictive simulation for generalized linear modelsp. 148
Bibliographic notep. 151
Exercisesp. 152
Simulation for checking statistical procedures and model fitsp. 155
Fake-data simulationp. 155
Example: using fake-data simulation to understand residual plotsp. 157
Simulating from the fitted model and comparing to actual datap. 158
Using predictive simulation to check the fit of a time-series modelp. 163
Bibliographic notep. 165
Exercisesp. 165
Causal inference using regression on the treatment variablep. 167
Causal inference and predictive comparisonsp. 167
The fundamental problem of causal inferencep. 170
Randomized experimentsp. 172
Treatment interactions and poststratificationp. 178
Observational studiesp. 181
Understanding causal inference in observational studiesp. 186
Do not control for post-treatment variablesp. 188
Intermediate outcomes and causal pathsp. 190
Bibliographic notep. 194
Exercisesp. 194
Causal inference using more advanced modelsp. 199
Imbalance and lack of complete overlapp. 199
Subclassification: effects and estimates for different subpopulationsp. 204
Matching: subsetting the data to get overlapping and balanced treatment and control groupsp. 206
Lack of overlap when the assignment mechanism is known: regression discontinuityp. 212
Estimating causal effects indirectly using instrumental variablesp. 215
Instrumental variables in a regression frameworkp. 220
Identification strategies that make use of variation within or between groupsp. 226
Bibliographic notep. 229
Exercisesp. 231
Multilevel regressionp. 235
Multilevel structuresp. 237
Varying-intercept and varying-slope modelsp. 237
Clustered data: child support enforcement in citiesp. 237
Repeated measurements, time-series cross sections, and other non-nested structuresp. 241
Indicator variables and fixed or random effectsp. 244
Costs and benefits of multilevel modelingp. 246
Bibliographic notep. 247
Exercisesp. 248
Multilevel linear models: the basicsp. 251
Notationp. 251
Partial pooling with no predictorsp. 252
Partial pooling with predictorsp. 254
Quickly fitting multilevel models in Rp. 259
Five ways to write the same modelp. 262
Group-level predictorsp. 265
Model building and statistical significancep. 270
Predictions for new observations and new groupsp. 272
How many groups and how many observations per group are needed to fit a multilevel model?p. 275
Bibliographic notep. 276
Exercisesp. 277
Multilevel linear models: varying slopes, non-nested models, and other complexitiesp. 279
Varying intercepts and slopesp. 279
Varying slopes without varying interceptsp. 283
Modeling multiple varying coefficients using the scaled inverse-Wishart distributionp. 284
Understanding correlations between group-level intercepts and slopesp. 287
Non-nested modelsp. 289
Selecting, transforming, and combining regression inputsp. 293
More complex multilevel modelsp. 297
Bibliographic notep. 297
Exercisesp. 298
Multilevel logistic regressionp. 301
State-level opinions from national pollsp. 301
Red states and blue states: what's the matter with Connecticut?p. 310
Item-response and ideal-point modelsp. 314
Non-nested overdispersed model for death sentence reversalsp. 320
Bibliographic notep. 321
Exercisesp. 322
Multilevel generalized linear modelsp. 325
Overdispersed Poisson regression: police stops and ethnicityp. 325
Ordered categorical regression: storable votesp. 331
Non-nested negative-binomial model of structure in social networksp. 332
Bibliographic notep. 342
Exercisesp. 342
Fitting multilevel modelsp. 343
Multilevel modeling in Bugs and R: the basicsp. 345
Why you should learn Bugsp. 345
Bayesian inference and prior distributionsp. 345
Fitting and understanding a varying-intercept multilevel model using R and Bugsp. 348
Step by step through a Bugs model, as called from Rp. 353
Adding individual- and group-level predictorsp. 359
Predictions for new observations and new groupsp. 361
Fake-data simulationp. 363
The principles of modeling in Bugsp. 366
Practical issues of implementationp. 369
Open-ended modeling in Bugsp. 370
Bibliographic notep. 373
Exercisesp. 373
Fitting multilevel linear and generalized linear models in Bugs and Rp. 375
Varying-intercept, varying-slope modelsp. 375
Varying intercepts and slopes with group-level predictorsp. 379
Non-nested modelsp. 380
Multilevel logistic regressionp. 381
Multilevel Poisson regressionp. 382
Multilevel ordered categorical regressionp. 383
Latent-data parameterizations of generalized linear modelsp. 384
Bibliographic notep. 385
Exercisesp. 385
Likelihood and Bayesian inference and computationp. 387
Least squares and maximum likelihood estimationp. 387
Uncertainty estimates using the likelihood surfacep. 390
Bayesian inference for classical and multilevel regressionp. 392
Gibbs sampler for multilevel linear modelsp. 397
Likelihood inference, Bayesian inference, and the Gibbs sampler: the case of censored datap. 402
Metropolis algorithm for more general Bayesian computationp. 408
Specifying a log posterior density, Gibbs sampler, and Metropolis algorithm in Rp. 409
Bibliographic notep. 413
Exercisesp. 413
Debugging and speeding convergencep. 415
Debugging and confidence buildingp. 415
General methods for reducing computational requirementsp. 418
Simple linear transformationsp. 419
Redundant parameters and intentionally nonidentifiable modelsp. 419
Parameter expansion: multiplicative redundant parametersp. 424
Using redundant parameters to create an informative prior distribution for multilevel variance parametersp. 427
Bibliographic notep. 434
Exercisesp. 434
Prom data collection to model understanding to model checkingp. 435
Sample size and power calculationsp. 437
Choices in the design of data collectionp. 437
Classical power calculations: general principles, as illustrated by estimates of proportionsp. 439
Classical power calculations for continuous outcomesp. 443
Multilevel power calculation for cluster samplingp. 447
Multilevel power calculation using fake-data simulationp. 449
Bibliographic notep. 454
Exercisesp. 454
Understanding and summarizing the fitted modelsp. 457
Uncertainty and variabilityp. 457
Superpopulation and finite-population variancesp. 459
Contrasts and comparisons of multilevel coefficientsp. 462
Average predictive comparisonsp. 466
R[superscript 2] and explained variancep. 473
Summarizing the amount of partial poolingp. 477
Adding a predictor can increase the residual variance!p. 480
Multiple comparisons and statistical significancep. 481
Bibliographic notep. 484
Exercisesp. 485
Analysis of variancep. 487
Classical analysis of variancep. 487
ANOVA and multilevel linear and generalized linear modelsp. 490
Summarizing multilevel models using ANOVAp. 492
Doing ANOVA using multilevel modelsp. 494
Adding predictors: analysis of covariance and contrast analysisp. 496
Modeling the variance parameters: a split-plot latin squarep. 498
Bibliographic notep. 501
Exercisesp. 501
Causal inference using multilevel modelsp. 503
Multilevel aspects of data collectionp. 503
Estimating treatment effects in a multilevel observational studyp. 506
Treatments applied at different levelsp. 507
Instrumental variables and multilevel modelingp. 509
Bibliographic notep. 512
Exercisesp. 512
Model checking and comparisonp. 513
Principles of predictive checkingp. 513
Example: a behavioral learning experimentp. 515
Model comparison and deviancep. 524
Bibliographic notep. 526
Exercisesp. 527
Missing-data imputationp. 529
Missing-data mechanismsp. 530
Missing-data methods that discard datap. 531
Simple missing-data approaches that retain all the datap. 532
Random imputation of a single variablep. 533
Imputation of several missing variablesp. 539
Model-based imputationp. 540
Combining inferences from multiple imputationsp. 542
Bibliographic notep. 542
Exercisesp. 543
Appendixesp. 545
Six quick tips to improve your regression modelingp. 547
Fit many modelsp. 547
Do a little work to make your computations faster and more reliablep. 547
Graphing the relevant and not the irrelevantp. 548
Transformationsp. 548
Consider all coefficients as potentially varyingp. 549
Estimate causal inferences in a targeted way, not as a byproduct of a large regressionp. 549
Statistical graphics for research and presentationp. 551
Reformulating a graph by focusing on comparisonsp. 552
Scatterplotsp. 553
Miscellaneous tipsp. 559
Bibliographic notep. 562
Exercisesp. 563
Softwarep. 565
Getting started with R, Bugs, and a text editorp. 565
Fitting classical and multilevel regressions in Rp. 565
Fitting models in Bugs and Rp. 567
Fitting multilevel models using R, Stata, SAS, and other softwarep. 568
Bibliographic notep. 573
Referencesp. 575
Author indexp. 601
Subject indexp. 607
Table of Contents provided by Ingram. All Rights Reserved.

Supplemental Materials

What is included with this book?

The New copy of this book will include any supplemental materials advertised. Please check the title of the book to determine if it should include any access cards, study guides, lab manuals, CDs, etc.

The Used, Rental and eBook copies of this book are not guaranteed to include any supplemental materials. Typically, only the book itself is included. This is true even if the title states it includes any access cards, study guides, lab manuals, CDs, etc.

Rewards Program