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Crispin Wright
Summary
Crispin James Garth Wright (raɪt; born 21 December 1942) is a British philosopher, who has written on neo-Fregean (neo-logicist) philosophy of mathematics, Wittgenstein's later philosophy, and on issues related to truth, realism, cognitivism, skepticism, knowledge, and objectivity. He is Professor of Philosophical Research at the University of Stirling, and taught previously at the University of St Andrews, University of Aberdeen, New York University, Princeton University and University of Michigan.
Wright was born in Surrey and was educated at Birkenhead School (1950–61) and at Trinity College, Cambridge, graduating in Moral Sciences in 1964 and taking a PhD in 1968. He took an Oxford BPhil in 1969 and was elected Prize Fellow and then Research Fellow at All Souls College, Oxford, where he worked until 1978. He then moved to the University of St. Andrews, where he was appointed Professor of Logic and Metaphysics and then the first Bishop Wardlaw University Professorship in 1997. From fall 2008 to spring 2023, he was professor in the Department of Philosophy at New York University (NYU). He has also taught at the University of Michigan, Oxford University, Columbia University, and Princeton University. Crispin Wright was founder and director of Arché at the University of St. Andrews, which he left in September 2009 to take up leadership of the Northern Institute of Philosophy (NIP) at the University of Aberdeen. Once NIP ceased operations in 2015, Wright moved to the University of Stirling.
In the philosophy of mathematics, he is best known for his book Frege's Conception of Numbers as Objects (1983), where he argues that Frege's logicist project could be revived by removing the axiom schema of unrestricted comprehension (sometimes referred to as Basic Law V) from the formal system. Arithmetic is then derivable in second-order logic from Hume's principle. He gives informal arguments that (i) Hume's principle plus second-order logic is consistent, and (ii) from it one can produce the Dedekind–Peano axioms.
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