Metodo

International Studies in Phenomenology and Philosophy

Series | Book | Chapter

196393

Metaphor and model-based reasoning in Maxwell's mathematical physics

Ryan D. Tweney

pp. 395-414

Abstract

The role of model-based reasoning in experimental and theoretical scientific thinking has been extensively studied. However, little work has been done on the role of mathematical representations in such thinking. I will describe how the nature of mathematical expressions in physics can be analyzed using an extension of the metaphoric analysis of mathematics. Lakoff and Núñez [29] argued that embodied metaphors underlie basic mathematical ideas (e.g., the concept of "number" is based on the embodied operations of "collecting objects"), with more complex expressions developed via conceptual blends from simpler expressions (e.g., "addition" as "combining collections"). In physics, however, the need to represent physical processes and observed entities (including measurements) places different demands on the blending processes. In model-based reasoning, conceptual blends must often be based on immediately available embodiments as well as highly developed mathematical expressions that draw upon long term working memory. Thus, Faraday's representations of magnetic fields as "lines of force" were modeled by Maxwell as vectors. In the paper, I compare Faraday's experimental investigation of the magnetic field within a magnet to Maxwell's mathematical treatment of the same problem. Both can be understood by unpacking the metaphoric underpinnings as physical representations. The implications for analogical and model-based reasoning accounts of scientific thinking are discussed.

Publication details

Published in:

Magnani Lorenzo (2014) Model-based reasoning in science and technology: theoretical and cognitive issues. Dordrecht, Springer.

Pages: 395-414

DOI: 10.1007/978-3-642-37428-9_21

Full citation:

Tweney Ryan D. (2014) „Metaphor and model-based reasoning in Maxwell's mathematical physics“, In: L. Magnani (ed.), Model-based reasoning in science and technology, Dordrecht, Springer, 395–414.