Michael Evans

Measuring Statistical Evidence Using Relative Belief

Name: Measuring Statistical Evidence Using Relative Belief
Brand: Taylor & Francis Ltd
SKU: 9781032098562
Price: 63.99 EUR
Availability: InStock

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A01=Michael Evans

ANOVA Problem

Author_Michael Evans

bayes

Bayes Factor

Bayes Rule

Bayesian inference

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Category=PBT

Category=PS

checking

Coherent Forecast

conditional

distribution

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evidence measurement in statistics

factor

framework for statistical analyses

inference methodology

inference problems

Jeffreys Lindley Paradox

Joint Probability Measure

meaning of probability

measure

minimal

Minimal Sufficient

Minimal Sufficient Statistic

model

Model Checking

model selection

Negative Binomial Sampling

Nuisance Parameter Problem

Posterior Density

Posterior Distribution

Posterior Probability

Prior Data Conflict

prior elicitation

Prior Pi

Prior Predictive

Prior Predictive Distribution

probability

probability theory

Profile Likelihood

Proper Scoring Rule

Prosecutor's Fallacy

Prosecutor’s Fallacy

Relative Belief

relative belief theory

Small Prior Probability

statistical objectivity

sufficient

theory of inference based on relative belief

Theory of Statistical Inference

Volume Distortion

Weakly Informative

Product details

ISBN 9781032098562
Weight: 362g
Dimensions: 156 x 234mm
Publication Date: 30 Jun 2021
Publisher: Taylor & Francis Ltd
Publication City/Country: GB
Product Form: Paperback

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A Sound Basis for the Theory of Statistical Inference

Measuring Statistical Evidence Using Relative Belief provides an overview of recent work on developing a theory of statistical inference based on measuring statistical evidence. It shows that being explicit about how to measure statistical evidence allows you to answer the basic question of when a statistical analysis is correct.

The book attempts to establish a gold standard for how a statistical analysis should proceed. It first introduces basic features of the overall approach, such as the roles of subjectivity, objectivity, infinity, and utility in statistical analyses. It next discusses the meaning of probability and the various positions taken on probability. The author then focuses on the definition of statistical evidence and how it should be measured. He presents a method for measuring statistical evidence and develops a theory of inference based on this method. He also discusses how statisticians should choose the ingredients for a statistical problem and how these choices are to be checked for their relevance in an application.

Michael Evans is a professor in the Department of Statistics at the University of Toronto. His research focuses on statistical inference, particularly a theory of inference based on the concept of relative belief. He is an associate editor of Bayesian Analysis and a former president of the Statistical Society of Canada.