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The Philosophical Implications of Mathematics Open in a new windowLink Details
- This weblog examines what we can learn about our humanness from the act of doing mathematics.
- http://meaningofmath.blogspot.com

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The Philosophy of Mathematics Open in a new windowLink Details
- Notes by R.B. Jones of foundations, problems, logicism and philosophers of mathematics.
- http://www.rbjones.com/rbjpub/philos/maths/

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19th Century Logic between Philosophy and Mathematics Open in a new windowLink Details
- Online article by Volker Peckhaus.
- http://www.meta-religion.com/Mathematics/Philosophy_of_mathematics/19_century_logic.htm

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Hilbert's Program Open in a new windowLink Details
- In 1921, David Hilbert made a proposal for a formalist foundation of mathematics, for which a finitary consistency proof should establish the security of mathematics. From the Stanford Encyclopedia, by Richard Zach.
- http://plato.stanford.edu/entries/hilbert-program/

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Holistic Math Open in a new windowLink Details
- An enlarged paradigm of mathematical reality that includes psychology as an integral component.
- http://www.iol.ie/~peter/

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Structuralism, Category Theory and Philosophy of Mathematics Open in a new windowLink Details
- By Richard Stefanik (Washington: MSG Press,1994).
- http://www.mmsysgrp.com/strctcat.htm

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Canadian Society for History and Philosophy of Mathematics Open in a new windowLink Details
- Bulletin, members' pages, meetings.
- http://home.adelphi.edu/~cshpm/

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Foundations: Philosophy of Mathematics Open in a new windowLink Details
- A study guide on the Philosophy of Mathematics provided by The Objectivist Center, including a study guide on the subject.
- http://ios.org/articles/foundations_phil-of-mathematics.asp

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On Gödel's Philosophy of Mathematics Open in a new windowLink Details
- A paper by Harold Ravitch, Los Angeles Valley College.
- http://www.friesian.com/goedel/

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Mathematical Structures Group Open in a new windowLink Details
- Research topics include mathematical models and theories in the empirical sciences, models and theories in mathematics, category theory, and the use of mathematical structures in theoretical computer science. Bibliographic data.
- http://www.mmsysgrp.com/mathstrc.htm

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The Logical and Metaphysical Foundations of Classical Mathematics Open in a new windowLink Details
- Arché Research Project at the University of St Andrews. Description of the project, sponsors, researchers and publications.
- http://www.st-andrews.ac.uk/academic/philosophy/arche/math.shtml

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PHILTAR - Philosophy of Mathematics Open in a new windowLink Details
- Links to pages on individual philosophers.
- http://philtar.ucsm.ac.uk/philosophy_of_mathematics/individual_philosophers/

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Paul Ernest's Page Open in a new windowLink Details
- Based at School of Education, University of Exeter, United Kingdom, includes the text of back issues of the Philosophy of Mathematics Education Journal, and other papers on the philosophy of mathematics and related subjects.
- http://www.ex.ac.uk/~PErnest/

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Social Constructivism as a Philosophy of Mathematics Open in a new windowLink Details
- Article by Paul Ernest.
- http://www.ex.ac.uk/~PErnest/soccon.htm

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Nineteenth Century Geometry Open in a new windowLink Details
- Philosophical-historical survey of the development of geometry in the 19th century. From the Stanford Encyclopedia, by Roberto Toretti.
- http://plato.stanford.edu/entries/geometry-19th/

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Philosophy of Mathematics Class Notes Open in a new windowLink Details
- Notes to a class by Carl Posy at Duke University, Fall 1992.
- http://www.cs.washington.edu/homes/gjb/doc/philmath.htm

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Inconsistent Mathematics Open in a new windowLink Details
- Inconsistent mathematics is the study of the mathematical theories that result when classical mathematical axioms are asserted within the framework of a (non-classical) logic which can tolerate the presence of a contradiction without turning every sente
- http://plato.stanford.edu/entries/mathematics-inconsistent/

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Constructive Mathematics Open in a new windowLink Details
- Constructive mathematics is distinguished from its traditional counterpart, classical mathematics, by the strict interpretation of the phrase `there exists' as `we can construct'. In order to work constructively, we need to re-interpret not only the exis
- http://plato.stanford.edu/entries/mathematics-constructive/

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Indispensability Arguments in the Philosophy of Mathematics Open in a new windowLink Details
- From the fact that mathematics is indispensable to science, some philosophers have drawn serious metaphysical conclusions. In particular, Quine and Putnam have argued that the indispensability of mathematics to empirical science gives us good reason to b
- http://plato.stanford.edu/entries/mathphil-indis/

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Intuitionistic Logic Open in a new windowLink Details
- Intuitionistic logic encompasses the principles of logical reasoning which were used by L. E. J. Brouwer in developing his intuitionistic mathematics, beginning in [1907]. Because these principles also underly Russian recursive analysis and the construc
- http://plato.stanford.edu/entries/logic-intuitionistic/

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