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Viser: A Student's Guide to Bayesian Statistics
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- Paperback: 520 sider
- Udgiver: SAGE Publications, Limited (Maj 2018)
- ISBN: 9781473916364
Supported by a wealth of learning features, exercises, and visual elements as well as online video tutorials and interactive simulations, this book is the first student-focused introduction to Bayesian statistics.
Without sacrificing technical integrity for the sake of simplicity, the author draws upon accessible, student-friendly language to provide approachable instruction perfectly aimed at statistics and Bayesian newcomers. Through a logical structure that introduces and builds upon key concepts in a gradual way and slowly acclimatizes students to using R and Stan software, the book covers:
- An introduction to probability and Bayesian inference Understanding Bayes' rule Nuts and bolts of Bayesian analytic methods Computational Bayes and real-world Bayesian analysis Regression analysis and hierarchical methods
This unique guide will help students develop the statistical confidence and skills to put the Bayesian formula into practice, from the basic concepts of statistical inference to complex applications of analyses.
Chapter 1: How to best use this book The purpose of this book Who is this book for? Pre-requisites Book outline Route planner - suggested journeys through Bayesland Video Problem sets Code R and Stan Why don''t more people use Bayesian statistics? What are the tangible (non-academic) benefits of Bayesian statistics?
Part I: An introduction to Bayesian inferenceChapter 2: The subjective worlds of Frequentist and Bayesian statistics Bayes'' rule - allowing us to go from the effect back to its cause The purpose of statistical inference The world according to Frequentists The world according to Bayesians Do parameters actually exist and have a point value? Frequentist and Bayesian inference Bayesian inference via Bayes'' rule Implicit versus Explicit subjectivityChapter 3: Probability - the nuts and bolts of Bayesian inference Probability distributions: helping us explicitly state our ignorance Independence Central Limit Theorems A derivation of Bayes'' rule The Bayesian inference process from the Bayesian formulaPart II: Understanding the Bayesian formulaChapter 4: Likelihoods What is a likelihood? Why use ''likelihood'' rather than ''probability''? What are models and why do we need them? How to choose an appropriate likelihood? Exchangeability vs random sampling Maximum likelihood - a short introductionChapter 5: Priors What are priors, and what do they represent? The explicit subjectivity of priors Combining a prior and likelihood to form a posterior Constructing priors A strong model is less sensitive to prior choiceChapter 6: The devil''s in the denominator An introduction to the denominator The difficulty with the denominator How to dispense with the difficulty: Bayesian computationChapter 7: The posterior - the goal of Bayesian inference Expressing parameter uncertainty in posteriors Bayesian statistics: updating our pre-data uncertainty The intuition behind Bayes'' rule for inference Point parameter estimates Intervals of uncertainty From posterior to predictions by samplingPart III: Analytic Bayesian methodsChapter 8: An introduction to distributions for the mathematically-un-inclined The interrelation among distributions Sampling distributions for likelihoods Prior distributions How to choose a likelihood Table of common likelihoods, their uses, and reasonable priors Distributions of distributions, and mixtures - link to website, and relevanceChapter 9: Conjugate priors and their place in Bayesian analysis What is a conjugate prior and why are they useful? Gamma-poisson example Normal example: giraffe height Table of conjugate priors The lessons and limits of a conjugate analysisChapter 10: Evaluation of model fit and hypothesis testing Posterior predictive checks Why do we call it a p value? Statistics measuring predictive accuracy: AIC, Deviance, WAIC and LOO-CV Marginal likelihoods and Bayes factors Choosing one model, or a number? Sensitivity analysisChapter 11: Making Bayesian analysis objective? The illusion of the ''uninformative'' uniform prior Jeffreys'' priors Reference priors Empirical Bayes A move towards weakly informative priorsPart IV: A practical guide to doing real life Bayesian analysis: Computational BayesChapter 12: Leaving conjugates behind: Markov Chain Monte Carlo The difficulty with real life Bayesian inference Discrete approximation to continuous posteriors The posterior through quadrature Integrating using independent samples: an introduction to Monte Carlo Why is independent sampling easier said than done? Ideal sampling from a posterior using only the un-normalised posterior Moving from independent to dependent sampling What''s the catch with dependent samplers?
Chapter 13: Random Walk Metropolis Sustainable fishing Prospecting for gold Defining the Metropolis algorithm When does Metropolis work? Efficiency of convergence: the importance of choosing the right proposal scale Metropolis-Hastings Judging convergence Effective sample size revisitedChapter 14: Gibbs sampling Back to prospecting for gold Defining the Gibbs algorithm Gibbs'' earth: the intuition behind the Gibbs algorithm The benefits and problems with Gibbs and Random Walk Metropolis A change of parameters to speed up explorationChapter 15: Hamiltonian Monte Carlo Hamiltonian Monte Carlo as a sledge NLP space Solving for the sledge motion over NLP space How to shove the sledge The acceptance probability of HMC The complete Hamiltonian Monte Carlo algorithm The performance of HMC versus Random Walk Metropolis and Gibbs Optimal step length of HMC: introducing the "No U-Turn Sampler"
Chapter 16: Stan Why Stan, and how to get it Getting setup with Stan using RStan Our first words in Stan Essential Stan reading What to do when things go wrong How to get further helpPart V: Hierarchical models and regressionChapter 17: Hierarchical models The spectrum from fully-pooled to heterogeneous Non-centered parameterisations in hierarchical models Case study: Forecasting the EU referendum result The importance of fake data simulation for complex modelsChapter 18: Linear regression models Example: high school test scores in England Pooled model Interactions Heterogeneous coefficient model Hierarchical model Incorporating LEA-level dataChapter 19: Generalised linear models and other animals Example: electoral participation in European countries Discrete parameter models in Stan