Abstract
This paper presents detailed formalizations of ontological arguments in a simple modal natural deduction calculus. The first formal proof closely follows the hints in Scott’s manuscript about Gödel’s argument and fills in the gaps, thus verifying its correctness. The second formal proof improves the first one, by relying on the weaker modal logic KB instead of S5 and by avoiding the equality relation. The second proof is also technically shorter than the first one, because it eliminates unnecessary detours and uses Axiom 1 for the positivity of properties only once. The third and fourth proofs formalize, respectively, Anderson’s and Bjørdal’s variants of the ontological argument, which are known to be immune to modal collapse.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Adams, R. M., Introductory note to [Gödel 1970], 1995.
Anderson, C. A., Some emendations of Gödel’s ontological proof, Faith and Philosophy 7(3):291–303, 1990.
Anderson, C. A., and M. Gettings, Gödel’s ontological proof revisited, in P. Hájek (ed.), Gödel ’96, Springer, New York, 1996.
Bentert, M., C. Benzmüller, D. Streit, and B. Woltzenlogel Paleo, Analysis of an Ontological Proof Proposed by Leibniz. [to appear in] Death and Anti-Death, Volume 14: Four Decades after Michael Polanyi, Three Centuries after G. W. Leibniz, (C. Tandy, ed.), Ria University Press, Palo Alto, CA, 2016.
Benzmüller, C., C. Brown, and M. Kohlhase, Higher-order semantics and extensionality, Journal of Symbolic Logic 69(4):1027–1088, 2004.
Benzmüller, C., L. Weber, and B. Woltzenlogel Paleo, Computer-assisted analysis of the Anderson-Hájek ontological controversy, in R. S. Silvestre and J.-Y. Béziau (eds.), Handbook of the 1st World Congress on Logic and Religion, Springer, New York, 2015.
Benzmüller, C., L. Weber, and B. Woltzenlogel Paleo, Computer-Assisted Analysis of the Anderson-Hájek Ontological Controversy. To appear in: Logica Universalis volume 11, issue 1, S. Silvestre and J.-Y. Béziau (eds.), Springer, New York, 2017, pp. 1–11.
Benzmüller, C., and B. Woltzenlogel Paleo, Gödel’s god on the computer, in S. Schulz, G. Sutcliffe, and B. Konev (eds.), Proceedings of the 10th International Workshop on the Implementation of Logics, 2013, pp. 1–2.
Benzmüller, C., and B. Woltzenlogel Paleo, Gödel’s God in Isabelle/HOL. Archive of Formal Proofs, 2013.
Benzmüller, C., and B. Woltzenlogel Paleo, On logic embeddings and Gödel’s God, in M. Codescu et al. (eds.), Procedings WADT 2014: Revised Selected Papers of the 22nd International Workshop on Algebraic Development Techniques, Recent Trends in Algebraic Development Techniques, Springer-Verlag, New York, 2014, pp. 3–6.
Benzmüller, C., and B. Woltzenlogel Paleo, On Logic Embeddings and Gödel’s God, in R. Diaconescu et al. (eds.), Preliminary Proceedings of the 22nd International Workshop on Algebraic Development Techniques, 2014, pp. 8–9.
Benzmüller, C., and B. Woltzenlogel Paleo, Formalization and automated verification of Gödel’s proof of God’s existence, in J.-Y. Béziau and K. Gan-Krzywoszyńska (eds.), Handbook of the World Congress on the Square of Opposition IV, 2014, pp. 24–25.
Benzmüller, C., and B. Woltzenlogel Paleo, Automating Gödel’s ontological proof of God’s existence with higher-order automated theorem provers, in T. Schaub et al. (eds.), Proceedings ECAI 2014—21st European Conference on Artificial Intelligence- Including Prestigious Applications of Intelligent Systems (PAIS 2014), 2014, pp. 93–98.
Benzmüller, C., and B. Woltzenlogel Paleo, Interacting with modal logics in the coq proof assistant, in L. D. Beklemishev and D. V. Musatov (eds.), Computer Science—Theory and Applications—Proceedings of the 10th International Computer Science Symposium in Russia, CSR 2015, Lecture Notes in Computer Science, Springer, New York, 2015, pp. 398–411.
Benzmüller, C., and B. Woltzenlogel Paleo, Higher-order modal logics: automation and applications, in W. Faber and A. Paschke (eds.), Reasoning Web. Web Logic Rules—11th International Summer School 2015. Tutorial Lectures, Lecture Notes in Computer Science, Springer, New York, 2015, pp. 32–74.
Benzmüller, C., and B. Woltzenlogel Paleo, Experiments in Computational Metaphysics: Gödel’s Proof of God’s Existence, in S. C. Mishra, S. Ghosh, and V. Agarwal (eds.), Science and Spiritual Quest: Proceedings of the 9th All India Students’ Conference on Science and Spiritual Quest, vol. 9, Bhaktivedanta Institute, Berkeley, 2015, pp. 23–40.
Benzmüller, C., and B. Woltzenlogel Paleo, The Inconsistency in Gödel’s Ontological Argument: A Success Story for AI in Metaphysics, in S. Kambhampati (ed.), Proceedings of the Twenty-Fifth International Joint Conference on Artificial Intelligence—IJCAI, AAAI Press, Menlo Park, CA, 2016.
Benzmüller, C., and B. Woltzenlogel Paleo, The Modal Collapse as a Collapse of the Modal Square of Opposition, in J.-Y. Béziau and G. Basti (eds.), Studies in Universal Logic. The Square of Opposition: A Cornerstone of Thought, Springer, New York, 2016, pp. 1–7.
Bjørdal, F., Understanding Gödel’s ontological argument, in T. Childers (ed.), The Logica Yearbook 1998, Filosofia, Praha, 1999, pp. 214–217.
Blackburn, P., M. de Rijke, and Y. Venema. Modal Logic, Cambridge, 2001.
Church, A., A formulation of the simple theory of types, Journal of Symbolic Logic 5:56–68, 1940.
Fitting, M., and R. Mendelsohn, First-Order Modal Logic, Synthese Library, vol. 277, Kluwer Academic Publishers, Dordrecht, 1998.
Fitting, M., Types, Tableaus, and Gödel’s God, Kluwer Academic Publishers, Dordrecht, 2002.
Fuhrmann, A., Existenz und Notwendigkeit—Kurt Gödel’s Axiomatische Theologie, in E. J. Olsson, P. Schröder-Heister, and W. Spohn (eds.), Logik in der Philosophie, Synchr.-Wissenschafts-Verlag, Söochtenau, 2005, pp. 349–374.
Gabbay, D., Labelled Deductive Systems: Volume I, Oxford Science Publications, New York, 1996.
Gödel, K., Ontological proof, in S. Feferman et al. (eds.), Kurt Gödel Collected Works, vol. III, pp. 403–404, 139, 145 or Appendix A. Notes in Kurt Gödel’s hand in [Sobel 2001].
HÁJEK, P., Magari and others on Gödel’s ontological proof, in A. Ursini et al. (eds.), Logic and Logical Algebra, Marcel Dekker, New York, 1996, pp. 125–136.
Koons, R., Sobel on Gödel’s ontological proof, Philosophia Christi 2:235–248, 2006.
Magari, R., Logica e Teofilia. In: Notizie di Logica VII.4. 1988.
Muskens, R., Higher order modal logic, in P. Blackburn, J. F. A. K. van Benthem, and F. Wolter (eds.), Handbook of Modal Logic, Studies in Logic and Practical Reasoning, Elsevier, Dordrecht, 2006, pp. 621–653.
Nipkow, T., L. C. Paulson, and M. Wenzel, Isabelle/HOL: A Proof Assistant for Higher-Order Logic. Number 2283 in LNCS, Springer, New York, 2002.
Oppenheimer, P., and E. Zalta, A computationally-discovered simplification of the ontological argument, Australasian Journal of Philosophy 89(2):333–349, 2011.
Paulin-Mohring, C., Introduction to the calculus of inductive constructions, in D. Delahaye and B. Woltzenlogel Paleo (eds.), All about Proofs, Proofs for All, Mathematical Logic and Foundations, College Publications, London, 2015.
Prawitz, D., Natural Deduction: A Proof-theoretical Study, Dover Publications, Mineola, NY, 2006 (1st ed. 1965).
Rushby, J., The Ontological Argument in PVS, in N. Shilov (ed.), Proceedings of CAV Workshop “Fun with Formal Methods”, St. Petersburg, 2013.
Scott, D., Appendix B. Notes in Dana Scott’s hand, in J. H. Sobel (ed.), Logic and Theism: Arguments For and Against Beliefs in God, Cambridge University Press, Cambridge, 2004, pp. 145–146.
Sobel, J. H., Gödel’s ontological proof, in J. J. Thompson (ed.), On Being and Saying: Essays for Richard Cartwright, MIT Press, Cambridge, 1987.
Sobel, J. H., Logic and Theism: Arguments for and Against Beliefs in God, Cambridge University Press, Cambridge, 2001.
Thiele, R., Hilbert’s twenty-fourth problem, American Mathematical Monthly, January 2003.
Wang, H., A Logical Journey: From Gödel to Philosophy, The MIT Press, Cambridge, 1996.
Woltzenlogel Paleo, B., Automated verification and reconstruction of Gödel’s proof of God’s existence, Journal of the Austrian Computer Society 38:4–6, 2013.
Author information
Authors and Affiliations
Corresponding author
Additional information
Presented by Heinrich Wansing
Rights and permissions
About this article
Cite this article
Kanckos, A., Woltzenlogel Paleo, B. Variants of Gödel’s Ontological Proof in a Natural Deduction Calculus. Stud Logica 105, 553–586 (2017). https://doi.org/10.1007/s11225-016-9700-1
Received:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11225-016-9700-1