Use of One-Point Coverage Representations, Product Space Conditional Event Algebra, and Second-Order Probability Theory for Constructing and Using Probability-Compatible Inference Rules in Data-Fusion Problems

Abstract

This paper covers issues relating to the establishment of a sound and conditional probability-compatible rationale for generating linguistic-based inference rules concerning a population. By extending previous preliminary results, the authors detail, in a fully rigorous manner and within the confines of traditional probability theory, that a comprehensive technique can be derived that converts linguistic-based conditional information, couched only in fuzzy-logic terms, into naturally corresponding conditional probabilities. In turn, they demonstrate how such typically underconstrained conditional probabilities can be combined for suitable conclusions and decision making, via a new use of second-order probability logic. This research is part of the ongoing SSC San Diego In-house Laboratory Independent Research FY 01 project CRANOF (a Complexity-Reducing Algorithm for Near-Optimal Fusion).

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Document Details

Document Type
Technical Report
Publication Date
Aug 01, 2001
Accession Number
ADA434188

Entities

People

  • I. R. Goodman

Organizations

  • Naval Information Warfare Systems Command

Tags

Communities of Interest

  • C4I
  • Ground and Sea Platforms
  • Human Systems
  • Weapons Technologies

DTIC Thesaurus Topics

  • Abstracts
  • Acquisition
  • Algorithms
  • Bayesian Networks
  • Boolean Algebra
  • Data Acquisition
  • Data Fusion
  • Distribution Functions
  • Fuzzy Logic
  • Fuzzy Sets
  • Information Retrieval
  • Information Science
  • Logic
  • Probability
  • Probability Distributions
  • Random Variables
  • Rule Based Systems

Readers

  • Artificial Intelligence
  • Theoretical Analysis.

Technology Areas

  • AI & ML
  • AI & ML - Bayesian Inference
  • Space