Koellner, Peter - Department of Philosophy, Harvard University

• On the Question of Absolute Undecidability Peter Koellner
• Large Cardinals from Determinacy Peter Koellner and W. Hugh Woodin
• Strong Logics of First and Second Order Peter Koellner
• Truth in Mathematics: The Question of Peter Koellner
• Peter Koellner Department of Philosophy
• Carnap on the Foundations of Logic and Mathematics
• The Cambridge companion to Bertrand Russell, edited by Nicholas Griffin, Cambridge University Press, Cambridge, UK and New York, US, xvii + 550 pp.--
• Incompatible -Complete Theories Peter Koellner and W. Hugh Woodin
• Mathematics Needs New Axioms John R. Steel
• Definability in the Computably Enumerable Rachel Epstein
• Ultraproducts and Large Cardinals
• Exploring the Frontiers of Incompleteness (Phil 143r, Fall 2011)
• The Transfinite Universe W. Hugh Woodin
• The HOD Dichotomy W. Hugh Woodin
• Fine structure and internal theory of extender Martin Zeman
• Effective Randomness and Continuous Theodore A. Slaman
• The Continuum Hypothesis, the generic-multiverse of sets, and the Conjecture
• The realm of the infinite W. Hugh Woodin
• The Continuum Hypothesis Peter Koellner
• Independence and Large Cardinals Peter Koellner
• The search for mathmematical truth W. Hugh Woodin
• Peter Koellner Department of Philosophy 50 Follen St.
• Proceedings of the International Congress of Mathematicians Hyderabad, India, 2010
• Large Cardinals and Determinacy Peter Koellner
• Research Statement Peter Koellner
• The evolution of hod mice The evolution of hod mice
• Wittgenstein and the "Skeptical Paradoxes" Saul Kripke (1982) reads out of Wittgenstein's later writings two skeptical
• In Defense of the Ideal This paper lies at the edge of the topic of the workshop. We can write
• Truth and Proof: The Platonism of Mathematics
• Speculations on nature of set theoretic truth: A thesis in 4 parts followed by 4 conjectures
• Draft 10/20/11. Not to be quoted or cited without permission. Evidence and the hierarchy of mathematical theories
• Reason and Intuition* Charles Parsons
• IS THE CONTINUUM HYPOTHESIS A DEFINITE MATHEMATICAL
• The Myth of the Mind Of course, I do not mean by the title of this paper to deny the existence of
• Version 3.0, 10/26/11. Brief Remarks on Putnam and Realism in Mathematics*
• Copyright 1999 by Charles Parsons STRICT PREDICATIVITY1
• Objectivity in Mathematics One of the many things about the practice of mathematics
• Mathematics Needs New Axioms John R. Steel
• Generic absoluteness and the Continuum John R. Steel
• G odel's legacy in set theory John R. Steel
• The triple helix John R. Steel
• Global Reflection Principles by P.D. Welch