О независимости, взаимозаменяемости и логической корреляции случайных переменных в метрологии

Information about the set of input quantities to a measurement model comprises statements about correlation of the random variables associated with the quantities. In a Bayesian framework, underlying internationally agreed evaluation procedures applied to measurement data, the correlation coefficients, or equivalently the covariances, of a joint probability density function (PDF), are fixed and calculable parameters. It will be shown that correlation often is due to logical inference and not necessarily expresses physical cause and effect. A Bayesian understanding of measurements under repeatability conditions is presented, finally leading to the replacement of (complete) independence within the sequence of random variables generating the observations, with a conditional independence which means a hidden correlation of the random variables in the sequence. The concept of anchangeable joint PDF is introduced to briefly discuss the relation of measurements under repeatability conditions to de Finetti’s purely mathematical General Representation Theorem that, moreover, calls for a Bayesian approach.

плотность расширения вероятностей, взаимозаменяемость, корреляция, байесовский подход, случайные переменные, probability density function, correlation, Bayesian approach, random variables

1. JaynesE. T.Probability Theory: The Logic of Science.Cambridge: Cambridge University Press, 2003.

2. JaynesE. T. Clearing up Mysteries –The Original Goal, in Maximum-Entropy and Bayesian Methods,J. Skilling (ed.). Dordrecht:Kluwer,1989. P. 1.

3. Bernardo J. M., Smith A. F. M.Bayesian Theory// John Wiley & Sons, Ltd, Chichester, 2000.

4. DawidA. P. Conditional independence in statistical theory// J. Roy. Statist.Soc. B 41.1979. P.1–31.

5. FinettiB. de.Theory of ProbabilityChichester:John Wiley & Sons, Ltd, ,1974.