Author:
Bueno Otávio,French Steven,Ladyman James
Abstract
We examine, from the partial structures perspective, two forms of applicability of mathematics: at the “bottom” level, the applicability of theoretical structures to the “appearances”, and at the “top” level, the applicability of mathematical to physical theories. We argue that, to accommodate these two forms of applicability, the partial structures approach needs to be extended to include a notion of “partial homomorphism”. As a case study, we present London's analysis of the superfluid behavior of liquid helium in terms of Bose-Einstein statistics. This involved both the introduction of group theory at the top level, and some modeling at the “phenomenological” level, and thus provides a nice example of the relationships we are interested in. We conclude with a discussion of the “autonomy” of London's model.
Publisher
Cambridge University Press (CUP)
Subject
History and Philosophy of Science,Philosophy,History
Reference47 articles.
1. Models and mathematics in physics: the role of group theory
2. Pragmatic Truth and Approximation to Truth;Mikenberg;Pragmatic Truth and Approximation to Truth,1986
3. The Phenomenological Approach to Physics: Essay Review of Fritz London, by Kostas Gavroglu;French;The Phenomenological Approach to Physics: Essay Review of Fritz London, by Kostas Gavroglu,1999b
4. The λ-Phenomenon of Liquid Helium and the Bose-Einstein Degeneracy;London;The λ-Phenomenon of Liquid Helium and the Bose-Einstein Degeneracy,1938a
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