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John L. Bell (bell-jl)

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Bibliography

    Bell, John L. 1977. Boolean-Valued Models and Independence Proofs in Set Theory. Oxford Logic Guides n. 4. Oxford: Oxford University Press.
    Bell, John L. 1984. Boolean-Valued Models and Independence Proofs in Set Theory. Oxford Logic Guides n. 12. Oxford: Oxford University Press.
    Bell, John L. 1986. From Absolute to Local Mathematics.” Synthese 69: 409–426.
    Bell, John L. 1988a. Toposes and Local Set Theories. Oxford Logic Guides n. 14. Oxford: Oxford University Press.
    Bell, John L. 1988b. Predictive Conditionals, Nonmonotonicity, and Reasoning about the Future.” PhD dissertation, Colchester: University of Essex.
    Bell, John L. 1990. The Logic of Nonmonotonicity.” Artificial Intelligence 41(3): 365–374.
    Bell, John L. 1991a. Pragmatic Logics.” in KR’91: Proceedings of the Second International Conference on Principles of Knowledge Representation and Reasoning, edited by James F. Allen, Richard E. Fikes, and Erik Sandewall, pp. 50–60. San Francisco, California: Morgan Kaufmann Publishers.
    Bell, John L. 1991b. Extended Causal Theories.” Artificial Intelligence 48(2): 211–224.
    Bell, John L. 1993. Hilbert’s \(\epsilon\)-Operator and Classical Logic.” The Journal of Philosophical Logic 22(1): 1–18.
    Bell, John L. 1994. Fregean Extensions of First-Order Theories.” Mathematical Logic Quarterly 40: 27–30. Reprinted in Demopoulos (1995a, 432–437).
    Bell, John L. 1995a. Pragmatic Reasoning: a Model-Based Theory.” in Applied Logic: How, What, and Why? Logical Approaches to Natural Language, edited by László Pólos and Michael Masuch, pp. 1–27. Synthese Library n. 247. Dordrecht: Kluwer Academic Publishers.
    Bell, John L. 1995b. Appendix [to Demopoulos (1995b)].” in Frege’s Philosophy of Mathematics, edited by William Demopoulos, pp. 21–28. Cambridge, Massachusetts: Harvard University Press.
    Bell, John L. 1996. Logical Reflections on the Kochen-Specker Theorem.” in Perspectives on Quantum Reality: Non-Relativistic, Relativistic, and Field-Theoretic, pp. 227–236. The University of Western Ontario Series in Philosophy of Science n. 57. Dordrecht: Kluwer Academic Publishers.
    Bell, John L. 1998. Causation, Conditionals and Common Sense.” in AAAI-98. Working Notes of the AAAI Spring Symposium on Prospects for a Commonsense Theory of Causation, edited by Charles L. Ortiz Jr., pp. 1–11. Menlo Park, California: The AAAI Press.
    Bell, John L., ed. 1999a. IJCAI-99. Workshop on Practical Reasoning and Rationality. Murray Hill, New Jersey: International Joint Conference on Artificial Intelligence.
    Bell, John L. 1999b. The Art of the Intelligible. An Elementary Survey of Mathematics in its Conceptual Development. The University of Western Ontario Series in Philosophy of Science n. 63. Dordrecht: Springer.
    Bell, John L. 1999c. Pragmatic Reasoning: Inferring Contexts.” in CONTEXT’99. Modeling and Using Contexts: Proceedings of the Second International and Interdisciplinary Conference, edited by Paolo Bouquet, Luigi Serfini, Patrick Brézillon, Massimo Benerecetti, and Francesca Castellani, pp. 42–53. Lecture Notes in Computer Science. Berlin: Springer.
    Bell, John L. 1999d. Frege’s Theorem in a Constructive Setting.” The Journal of Symbolic Logic 64(2): 486–488.
    Bell, John L. 1999e. Primary and Secondary Events.” in IJCAI-99. Workshop on Nonmonotonic Reasoning, Action and Change, edited by Michael Thielscher, pp. 65–72. Murray Hill, New Jersey: International Joint Conference on Artificial Intelligence.
    Bell, John L. 2000a. Sets and Classes as Many.” The Journal of Philosophical Logic 29(6): 585–601.
    Bell, John L. 2000b. Hermann Weyl on Intuition and the Continuum.” Philosophia Mathematica 8(3): 259–273.
    Bell, John L. 2000c. Infinitary Logic.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/spr2000/entries/logic-infinitary/.
    Bell, John L. 2001a. Pragmatic Reasoning: Pragmatic Semantics and Semantic Pragmatics.” in CONTEXT’01. Modeling and Using Context: Proceedings of the Third International and Interdisciplinary Conference, edited by Varol Akman, Paolo Bouquet, Richmond H. Thomason, and Roger A. Young, pp. 45–58. Lecture Notes in Computer Science n. 2116. Berlin: Springer.
    Bell, John L. 2001b. Observations on Category Theory.” Axiomathes 12(1–2): 151–155.
    Bell, John L. 2003. A Common Sense Theory of Causation.” in CONTEXT’03. Modeling and Using Context: Proceedings of the Fourth International and Interdisciplinary Conference, edited by Patrick Blackburn, Fausto Giunchiglia, Chiara Ghidini, and Roy M. Turner, pp. 40–53. Lecture Notes in Computer Science n. 2680. Berlin: Springer.
    Bell, John L. 2004a. Whole and Part in Mathematics.” Axiomathes 14(4): 285–294.
    Bell, John L. 2004b. Russell’s Paradox and Diagonalization in a Constructive Context.” in One Hundred Years of Russell’s Paradox. Mathematics, Logic, Philosophy, edited by Godehard Link, pp. 221–226. de Gruyter Series in Logic and Its Applications n. 6. Berlin: de Gruyter.
    Bell, John L. 2004c. Infinitary Logic.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/sum2004/entries/logic-infinitary/.
    Bell, John L. 2005a. Divergent Conceptions of the Continuum in 19th and Early 20th Century Mathematics and Philosophy.” Axiomathes 15(1): 63–84.
    Bell, John L. 2005b. Opposition and Paradoxes in Mathematics and Philosophy.” Axiomathes 15(2): 165–180.
    Bell, John L. 2005c. Continuity and Infinitesimals.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/fall2005/entries/continuity/.
    Bell, John L. 2006a. Choice Principles in Intuitionistic Set Theory.” in A Logical Approach to Philosophy. Essays in Honour of Graham Solomon, edited by David DeVidi and Timothy Kenyon, pp. 36–44. The University of Western Ontario Series in Philosophy of Science n. 69. Dordrecht: Springer, doi:10.1007/1-4020-4054-7.
    Bell, John L. 2006b. Infinitary Logic.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/spr2006/entries/logic-infinitary/.
    Bell, John L. 2007. Review of Synthetic Differential Geometry, by Anders Kock.” The Bulletin of Symbolic Logic 13(2): 244–245.
    Bell, John L. 2008. The Axiom of Choice.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/spr2008/entries/axiom-choice/.
    Bell, John L. 2009a. Continuity and Infinitesimals.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/fall2009/entries/continuity/.
    Bell, John L. 2009b. Hermann Weyl.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/fall2009/entries/weyl/.
    Bell, John L. 2011. Set Theory. Boolean-Valued Models and Independence Proofs. 3rd ed. Oxford Logic Guides n. 47. Oxford: Oxford University Press.
    Bell, John L. 2012a. Types, Sets, and Categories.” in Handbook of the History of Logic. Volume 6: Sets and Extensions in the Twentieth Century, edited by Dov M. Gabbay, Akihiro Kanamori, and John Woods, pp. 633–688. Amsterdam: Elsevier Science Publishers B.V.
    Bell, John L. 2012b. The Axiom of Choice in an Elementary Theory of Operations and Sets.” in Analysis and Interpretation in the Exact Sciences. Essays in Honour of William Demopoulos, edited by Mélanie Frappier, Derek Henry Brown, and Robert DiSalle, pp. 163–178. The University of Western Ontario Series in Philosophy of Science n. 78. Dordrecht: Springer.
    Bell, John L. 2012c. Infinitary Logic.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/spr2012/entries/logic-infinitary/.
    Bell, John L. 2017. Categorical Logic and Model Theory.” in Categories for the Working Philosopher, edited by Elaine M. Landry, pp. 113–135. Oxford: Oxford University Press, doi:10.1093/oso/9780198748991.001.0001.
    Bell, John L. 2021. The Axiom of Choice.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/win2021/entries/axiom-choice/.
    Bell, John L. 2022. Continuity and Infinitesimals.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/spr2022/entries/continuity/.
    Bell, John L. 2023. Infinitary Logic.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/fall2023/entries/logic-infinitary/.
    Bell, John L. and Huang, Zhisheng. 1997. Dynamic Goal Hierarchies.” in AAAI-97. Working Papers of the AAAI Spring Symposium on Qualitative Preferences in Deliberation and Practical Reasoning, edited by Jon Doyle and Richmond H. Thomason, pp. 9–17. Menlo Park, California: The AAAI Press. Republished as Bell and Huang (1999).
    Bell, John L. and Huang, Zhisheng. 1999. Dynamic Obligation Hierarchies.” in Norms, Logics and Information Systems: New Studies in Deontic Logic and Computer Science, edited by Paul McNamara and Henry Prakken, pp. 231–246. Frontiers in Artificial Intelligence and its Applications. Amsterdam: IOS Press.
    Bell, John L. and Korté, Herbert. 2011. Hermann Weyl.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/spr2011/entries/weyl/.
    Bell, John L. and Korté, Herbert. 2015. Hermann Weyl.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/sum2015/entries/weyl/.
    Bell, John L. and Korté, Herbert. 2024. Hermann Weyl.” in The Stanford Encyclopedia of Philosophy. Stanford, California: The Metaphysics Research Lab, Center for the Study of Language; Information, https://plato.stanford.edu/archives/sum2024/entries/weyl/.
    Demopoulos, William and Bell, John L. 1993. Frege’s Theory of Concepts and Objects and the Interpretation of Second-order Logic.” Philosophia Mathematica 1(2): 139–156.
    Hellman, Geoffrey and Bell, John L. 2006. Pluralism and the Foundations of Mathematics.” in Minnesota Studies in the Philosophy of Science, Volume XIX: Scientific Pluralism, edited by Stephen H. Kellert, Helen E. Longino, and Kenneth C. Waters, pp. 64–79. Minneapolis, Minnesota: University of Minnesota Press.
    White, Graham, Bell, John L. and Hodges, Wilfrid. 1998. Building Models of Prediction Theories.” in KR’98: Principles of Knowledge Representation and Reasoning, edited by Anthony G. Cohn, Lenhart K. Schubert, and Stuart C. Shapiro, pp. 557–568. San Francisco, California: Morgan Kaufmann Publishers.

Further References

    Demopoulos, William, ed. 1995a. Frege’s Philosophy of Mathematics. Cambridge, Massachusetts: Harvard University Press.
    Demopoulos, William. 1995b. Introduction.” in Frege’s Philosophy of Mathematics, edited by William Demopoulos, pp. 1–21. Cambridge, Massachusetts: Harvard University Press.