Alan R. H. Baker scite author profile

Many explanations in science make use of mathematics. But are there cases where the mathematical component of a scientific explanation is explanatory in its own right? This issue of mathematical explanations in science has been for the most part neglected. I argue that there are genuine mathematical explanations in science, and present in some detail an example of such an explanation, taken from evolutionary biology, involving periodical cicadas. I also indicate how the answer to my title question impacts on broader issues in the philosophy of mathematics; in particular it may help platonists respond to a recent challenge by Joseph Melia concerning the force of the Indispensability Argument.

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Mathematical Explanation in Science

Baker

2009

The British Journal for the Philosophy of Science

195

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Quantitative Parsimony and Explanatory Power

Baker¹

2003

The British Journal for the Philosophy of Science

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The desire to minimize the number of individual new entities postulated is often referred to as quantitative parsimony. Its influence on the default hypotheses formulated by scientists seems undeniable. I argue that there is a wide class of cases for which the preference for quantitatively parsimonious hypotheses is demonstrably rational. The justification, in a nutshell, is that such hypotheses have greater explanatory power than less parsimonious alternatives. My analysis is restricted to a class of cases I shall refer to as additive. Such cases involve the postulation of a collection of qualitatively identical individual objects which collectively explain some particular observed phenomenon. Especially clear examples of this sort occur in particle physics. 1 Introduction 2 Particle physics: a case study 3 Three kinds of simplicity 4 Explanatory power 5 Explanation and non-observation 6 Parsimony and scientific methodology

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Mechanisms of Chemical-Mechanical Polishing of SiO₂Dielectric on Integrated Circuits

Levert

Mess

Salant

et al. 1998

Tribology Transactions

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Occam’s Razor in science: a case study from biogeography

Baker

2006

Biol Philos

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Alan R. H. Baker

Are there Genuine Mathematical Explanations of Physical Phenomena?

Mathematical Explanation in Science

Quantitative Parsimony and Explanatory Power

Mechanisms of Chemical-Mechanical Polishing of SiO₂Dielectric on Integrated Circuits

Occam’s Razor in science: a case study from biogeography

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About

Alan R. H. Baker

Are there Genuine Mathematical Explanations of Physical Phenomena?

Mathematical Explanation in Science

Quantitative Parsimony and Explanatory Power

Mechanisms of Chemical-Mechanical Polishing of SiO2Dielectric on Integrated Circuits

Occam’s Razor in science: a case study from biogeography

Contact Info

Product

Resources

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Mechanisms of Chemical-Mechanical Polishing of SiO₂Dielectric on Integrated Circuits