Derived measurement, dimensions, and dimensional analysis

Philosophy of Science 36 (3):252-270 (1969)
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Abstract

This paper presents a representational theory of derived physical measurements. The theory proceeds from a formal definition of a class of similar systems. It is shown that such a class of systems possesses a natural proportionality structure. A derived measure of a class of systems is defined to be a proportionality-preserving representation whose values are n-tuples of positive real numbers. Therefore, the derived measures are measures of entire physical systems. The theory provides an interpretation of the dimensional parameters in a large class of physical laws, and it accounts for the monomial dimensions of these parameters. It is also shown that a class of similar systems obeys a dimensionally invariant law, which one may safely subject to a dimensional analysis

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10.1086/288255

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Citations of this work

Dimensional explanations.Marc Lange - 2009 - Noûs 43 (4):742-775.
Realist foundations of measurement.Henry C. Byerly & Vincent A. Lazara - 1973 - Philosophy of Science 40 (1):10-28.

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References found in this work

On the possible psychophysical laws.R. Duncan Luce - 1959 - Psychological Review 66 (2):81-95.
Basic Concepts of Measurement.Brian Ellis - 1967 - British Journal for the Philosophy of Science 17 (4):323-326.
On the nature of dimensions.Brian Ellis - 1964 - Philosophy of Science 31 (4):357-380.

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