On the Strict Determination of Hypothesis Testing Games.

Abstract

Measurably parameterized subsets of the set of all probability measures on a space are examined. The setup involves an arbitrary composite null hypothesis and the complementary alternative hypothesis. Suppose that for every probability measure on the parameter space, the averaged null hypothesis measure is orthogonal to the averaged alternative hypothesis measure. Whether, there then exists a Borel set in the range space which separates the null and alternative hypotheses is explored. It is shown that, in cases usually considered in hypothesis testing, there does exist such a Borel set. The relevance to this question to Bayesian vs. classical statistics is also discussed. (Author)

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Document Details

Document Type
Technical Report
Publication Date
Jul 22, 1977
Accession Number
ADA043201

Entities

People

  • Richard Clark Persons

Organizations

  • Massachusetts Institute of Technology

Tags

Communities of Interest

  • Air Platforms
  • Counter IED

DTIC Thesaurus Topics

  • Composite Materials
  • Construction
  • Governments
  • Hypotheses
  • Integrals
  • Intervals
  • Massachusetts
  • Mathematics
  • Notation
  • Orthogonality
  • Probability
  • Standards
  • Statistics
  • Theorems
  • United States
  • United States Government

Fields of Study

  • Mathematics

Readers

  • Approximation Theory.
  • Systems Analysis and Design
  • Team-Based Human-Centered Cognitive Task Decision Making and Information Performance.

Technology Areas

  • AI & ML
  • AI & ML - Bayesian Inference
  • AI & ML - Machine Learning Algorithms
  • Space