
Charles Chihara's new book develops and defends a structural view of the nature of mathematics, and uses it to explain a number of striking features of mathematics that have puzzled philosophers for centuries. The view is used to show that, in order to understand how mathematical systems are applied in science and everyday life, it is not necessary to assume that its theorems either presuppose mathematical objects or are even true. Chihara builds upon his previous work, in which he presented a new system of mathematics, the constructibility theory, which did not make reference to, or presuppose, mathematical objects. Now he develops the project further by analysing mathematical systems currently used by scientists to show how such systems are compatible with this nominalistic outlook. He advances several new ways of undermining the heavily discussed indispensability argument for the existence of mathematical objects made famous by Willard Quine and Hilary Putnam. And Chihara presents a rationale for the nominalistic outlook that is quite different from those generally put forward, which he maintains have led to serious misunderstandings. A Structural Account of Mathematics will be required reading for anyone working in this field.
This book investigates whether mathematical systems require the existence of abstract mathematical objects to be valid or applicable in scientific contexts. Charles S. Chihara, a philosopher known for his work in logic and the philosophy of mathematics, builds upon his constructibility theory to argue for a nominalistic perspective. He posits that mathematical theorems do not necessarily presuppose the existence of objects or require truth-values in the traditional sense, providing a framework that aligns mathematical practice with a nominalist ontology.
What You Will Find
Scope Limits
Scholars in the philosophy of mathematics recognize this work as a significant contribution to the nominalist tradition. Readers frequently note the technical density of the prose, which requires a strong background in logic and analytic philosophy to fully grasp the author's arguments.
Page Count:
394
Publication Date:
2004-01-01
Publisher:
Clarendon Press
ISBN-10:
0191533106
ISBN-13:
9780191533105
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