Overview

Mathematics plays a central role in much of contemporary science, but philosophers have struggled to understand what this role is or how significant it might be for mathematics and science. In this book Christopher Pincock tackles this perennial question in a new way by asking how mathematics contributes to the success of our best scientific representations. In the first part of the book this question is posed and sharpened using a proposal for how we can determine the content of a scientific representation. Several different sorts of contributions from mathematics are then articulated. Pincock argues that each contribution can be understood as broadly epistemic, so that what mathematics ultimately contributes to science is best connected with our scientific knowledge. In the second part of the book, Pincock critically evaluates alternative approaches to the role of mathematics in science. These include the potential benefits for scientific discovery and scientific explanation. A major focus of this part of the book is the indispensability argument for mathematical platonism. Using the results of part one, Pincock argues that this argument can at best support a weak form of realism about the truth-value of the statements of mathematics. The book concludes with a chapter on pure mathematics and the remaining options for making sense of its interpretation and epistemology. Thoroughly grounded in case studies drawn from scientific practice, this book aims to bring together current debates in both the philosophy of mathematics and the philosophy of science and to demonstrate the philosophical importance of applications of mathematics.

Full Product Details

Author:   Christopher Pincock (Associate Professor of Philosophy, Associate Professor of Philosophy, University of Missouri, Columbia, MO)
Publisher:   Oxford University Press Inc
Imprint:   Oxford University Press Inc
Dimensions:   Width: 17.10cm , Height: 2.10cm , Length: 23.10cm
Weight:   0.503kg
ISBN:  

9780190201395

ISBN 10:   0190201398
Pages:   352
Publication Date:   25 December 2014
Audience:   College/higher education ,  Postgraduate, Research & Scholarly
Format:   Paperback
Publisher's Status:   Active
Availability:   To order  
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Table of Contents

1 Introduction 1.1 A Problem 1.2 Classifying Contributions 1.3 An Epistemic Solution 1.4 Explanatory Contributions 1.5 Other Approaches 1.6 Interpretative Flexibility 1.7 Key Claims I Epistemic Contributions 2 Content and Confirmation 2.1 Concepts 2.2 Basic Contents 2.3 Enriched Contents 2.4 Schematic and Genuine Contents 2.5 Inference 2.6 Core Conceptions 2.7 Intrinsic and Extrinsic 2.8 Confirmation Theory 2.9 Prior Probabilities 3 Causes 3.1 Accounts of Causation 3.2 A Causal Representation 3.3 Some Acausal Representations 3.4 The Value of Acausal Representations 3.5 Batterman and Wilson 4 Varying Interpretations 4.1 Abstraction as Variation 4.2 Irrotational Fluids and Electrostatics 4.3 Shock Waves 4.4 The Value of Varying Interpretations 4.5 Varying Interpretations and Discovery 4.6 The Toolkit of Applied Mathematics 5 Scale Matters 5.1 Scale and ScientificRepresentation 5.2 Scale Separation 5.3 Scale Similarity 5.4 Scale and Idealization 5.5 Perturbation Theory 5.6 Multiple Scales 5.7 Interpreting Multiscale Representations 5.8 Summary 6 Constitutive Frameworks 6.1 A Different Kind of Contribution 6.2 Carnap's Linguistic Frameworks 6.3 Kuhn's Paradigms 6.4 Friedman on the Relative A Priori 6.5 The Need for Constitutive Representations 6.6 The Need for the Absolute A Priori 7 Failures 7.1 Mathematics and Scientific Failure 7.2 Completeness and Segmentation Illusions 7.3 The Parameter Illusion 7.4 Illusions of Scale 7.5 Illusions of Traction 7.6 Causal Illusions 7.7 Finding the Scope of a Representation II Other Contributions 8 Discovery 8.1 Semantic and Metaphysical Problems 8.2 A Descriptive Problem 8.3 Description and Discovery 8.4 Defending Naturalism 8.5 Natural Kinds 9 Indispensability 9.1 Descriptive Contributions and Pure Mathematics 9.2 Quine and Putnam 9.3 Against the Platonist Conclusion 9.4 Colyvan 10 Explanation 10.1 Explanatory Contributions 10.2 Inference to the Best Mathematical Explanation 10.3 Belief and Understanding 11 The Rainbow 11.1 Asymptotic Explanation 11.2 Angle and Color 11.3 Explanatory Power 11.4 Supernumerary Bows 11.5 Interpretation and Scope 11.6 Batterman and Belot 11.7 Looking Ahead 12 Fictionalism 413 12.1 Motivations 12.2 Literary Fiction 12.3 Mathematics 12.4 Models 12.5 Understanding and Truth 13 Facades 13.1 Physical and Mathematical Concepts 13.2 Against Semantic Finality 13.3 Developing and Connecting Patches 13.4 A New Approach to Content 13.5 Azzouni and Rayo 14 Conclusion: Pure Mathematics 14.1 Taking Stock 14.2 Metaphysics . 14.3 Structuralism 14.4 Epistemology 14.5 Peacocke and Jenkins 14.6 Historical Extensions 14.7 Non-conceptual Justification 14.8 Past and Future Appendices A Method of Characteristics B Black-Scholes Model C Speed of Sound D Two Proofs of Euler's Formula

Reviews

Mathematics and Scientific Representation is an engaging piece of contemporary philosophy of mathematics and science. Its deeply science-informed approach and focus on applied mathematics, with an aim to seriously tackle also more traditional issues in philosophy of mathematics, exemplify exciting and fertile scholarly 'border-hopping'. Juha Saatsi, Notre Dame Philosophical Reviews

a rare and fairly comprehensive philosophical account of the success of mathematics in science and after reading it you may be left with the impression that something like this should have been published years ago. This book is a major contribution to an otherwise underdeveloped area in the philosophy of science and is most likely to be well referenced ... this book is at the cutting-edge. Stuart Rowlands, Science & Education Mathematics and Scientific Representation is an engaging piece of contemporary philosophy of mathematics and science. Its deeply science-informed approach and focus on applied mathematics, with an aim to seriously tackle also more traditional issues in philosophy of mathematics, exemplify exciting and fertile scholarly 'border-hopping'. Juha Saatsi, Notre Dame Philosophical Reviews Pincocks writing style is engaging, and the book is structured in a way that makes it easy to follow the contours of the main lines of argumentan...an impressive book and one that repays detailed reading and re-reading. Alan Baker, The British Journal for the Philosophy of Science

Mathematics and Scientific Representation is an engaging piece of contemporary philosophy of mathematics and science. Its deeply science-informed approach and focus on applied mathematics, with an aim to seriously tackle also more traditional issues in philosophy of mathematics, exemplify exciting and fertile scholarly 'border-hopping'. --Juha Saatsi, Notre Dame Philosophical Reviews

Author Information

Christopher Pincock received his Ph.D. in philosophy from the University of California, Berkeley in 2002. After eight years at Purdue University, he recently joined the philosophy department at the University of Missouri as an Associate Professor.

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