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Measurement without archimedean axioms
Philosophy of Science 41 (4):374-393 (1974)
Abstract
Axiomatizations of measurement systems usually require an axiom--called an Archimedean axiom--that allows quantities to be compared. This type of axiom has a different form from the other measurement axioms, and cannot--except in the most trivial cases--be empirically verified. In this paper, representation theorems for extensive measurement structures without Archimedean axioms are given. Such structures are represented in measurement spaces that are generalizations of the real number system. Furthermore, a precise description of "Archimedean axioms" is given and it is shown that in all interesting cases "Archimedean axioms" are independent of other measurement axiomsMy notes
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References found in this work
Introduction to Model Theory and the Metamathematics of Algebra.Abraham Robinson - 1963 - Journal of Symbolic Logic 29 (1):56-56.
Axiomatic thermodynamics and extensive measurement.Fred S. Roberts & R. Duncan Luce - 1968 - Synthese 18 (4):311 - 326.
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