Dialetheism is the view that some statements can be both true and false simultaneously. More precisely, it is the belief that there can be a true statement whose negation is also true. Such statements are called "true contradictions", or dialetheia.

Dialetheism is not a system of formal logic; instead, it is a thesis about truth, that influences the construction of a formal logic logic, often based on pre-existing systems. Introducing dialetheism has various consequences, depending on the theory into which it is introduced. For example, in traditional systems of logic (e.g., classical logic and intuitionistic logic), every statement becomes true if a contradiction is true; this means that such systems become trivial when dialetheism is included as an axiom. Other logical systems do not explode in this manner when contradictions are introduced; such contradiction-tolerant systems are known as paraconsistent logics.

Graham Priest, of the University of Melbourne and the CUNY Graduate Center, is dialetheism's most prominent contemporary champion. He defines Dialetheism as the view that there are true contradictions.^[1] JC Beall of the University of Connecticut is another contemporary advocate. His position differs from Priest's in advocating constructive (methodological) deflationism regarding the truth predicate.^[2]

Motivations[link]

Dialetheism resolves certain paradoxes[link]

The Liar's paradox and Russell's paradox deal with self-contradictory statements in classical logic and naïve set theory, respectively. Contradictions are problematic in these theories because they cause the theories to explode—if a contradiction is true, then every proposition is true. The classical way to solve this problem is to ban contradictory statements, to revise the axioms of the logic so that self-contradictory statements do not appear. Dialetheists, on the other hand, respond to this problem by accepting the contradictions as true. Dialetheism allows for the unrestricted [axiom of comprehension] in set theory, claiming that any resulting contradiction is a theorem ^[3].

Dialetheism may accurately model human reasoning[link]

Ambiguous situations may cause humans to affirm both a proposition and its negation. For example, if John stands in the doorway to a room, it may seem reasonable both to affirm that John is in the room and to affirm that John is not in the room. Critics argue that this merely reflects an ambiguity in our language rather than a dialetheic quality in our thoughts; if we replace the given statement with one that is less ambiguous (such as "John is halfway in the room" or "John is in the doorway"), the contradiction disappears.

Dialetheism appears in other philosophical doctrines[link]

The Jain philosophical doctrine of anekantavada — non-one-sidedness — states that^{[citation needed]} all statements are true in some sense and false in another. Some interpret this as saying that dialetheia not only exist but are ubiquitous. Technically, however, a logical contradiction is a proposition that is true and false in the same sense; a proposition which is true in one sense and false in another does not constitute a logical contradiction. (For example, although in one sense a man cannot both be a "father" and "celibate", there is no contradiction for a man to be a spiritual father and also celibate; the sense of the word father is different here.)

The Buddhist logic system named Catuṣkoṭi similarly implies that a statement and its negation may possibly co-exist.

Graham Priest argues in Beyond the Limits of Thought that dialetheia arise at the borders of expressibility, in a number of philosophical contexts other than formal semantics.

Formal consequences[link]

In some logics, we can show that taking a contradiction Failed to parse (Missing texvc executable; please see math/README to configure.): p \wedge \neg p

as a premise (that is, taking as a premise the truth of both Failed to parse (Missing texvc executable; please see math/README to configure.): p
and Failed to parse (Missing texvc executable; please see math/README to configure.): \neg p

), we can prove any statement Failed to parse (Missing texvc executable; please see math/README to configure.): q . Indeed, since Failed to parse (Missing texvc executable; please see math/README to configure.): p

is true, the statement Failed to parse (Missing texvc executable; please see math/README to configure.): p \vee q
is true (by generalization). Taking Failed to parse (Missing texvc executable; please see math/README to configure.): p \vee q
together with Failed to parse (Missing texvc executable; please see math/README to configure.): \neg p
is a disjunctive syllogism from which we can conclude Failed to parse (Missing texvc executable; please see math/README to configure.): q

. (This is often called the principle of explosion, since the truth of a contradiction makes the number of theorems in a system "explode".)

Any system in which any formula is provable is trivial and uninformative; this is the motivation for solving the semantic paradoxes. Dialethesists solve this problem by rejecting the principle of explosion, and, along with it, at least one of the more basic principles that lead to it, e.g. disjunctive syllogism or transitivity of entailment, or disjunction introduction.

Advantages[link]

The proponents of dialetheism mainly advocate its ability to avoid problems faced by other more orthodox resolutions as a consequence of their appeals to hierarchies. Graham Priest once wrote "the whole point of the dialetheic solution to the semantic paradoxes is to get rid of the distinction between object language and meta-language".^[1]

There are also dialetheic solutions to the sorites paradox.

Criticisms[link]

One important criticism of dialetheism is that it fails to capture something crucial about negation and, consequently, disagreement. Imagine John's utterance of P. Sally's typical way of disagreeing with John is a consequent utterance of ¬P. Yet, if we accept dialetheism, Sally's so uttering does not prevent her from also accepting P; after all, P may be a dialetheia and therefore it and its negation are both true. The absoluteness of disagreement is lost. The dialetheist can respond by saying that disagreement can be displayed by uttering "¬P and, furthermore, P is not a dialetheia". Again, though, the dialetheist's own theory is his Achilles' heel: the most obvious codification of "P is not a dialetheia" is ¬(P & ¬P). But what if this itself is a dialetheia as well? One dialetheist response is to offer a distinction between assertion and rejection. This distinction might be hashed out in terms of the traditional distinction between logical qualities, or as a distinction between two illocutionary speech acts: assertion and rejection. Another criticism is that Dialetheism cannot describe logical consequences because of its inability to describe hierarchies.^[1]

Works cited[link]

• Frege, Gottlob. "Negation." Logical Investigations. Trans. P. Geach and R. H Stoothoff. New Haven, Conn.: Yale University Press, 1977. 31–53.
• Parsons, Terence. "Assertion, Denial, and the Liar Paradox." Journal of Philosophical Logic 13 (1984): 137–152.
• Parsons, Terence. "True Contradictions." Canadian Journal of Philosophy 20 (1990): 335–354.
• Priest, Graham. In Contradiction. Dordrecht: Martinus Nijhoff (1987). (Second Edition, Oxford: Oxford University Press, 2006.)
• Priest, Graham. "What Is So Bad About Contradictions?" Journal of Philosophy 95 (1998): 410–426.

See also[link]

Logic portal

• Problem of future contingents
• Jorge Luis Borges' The Garden of Forking Paths
• Many-worlds interpretation
• Leibniz's compossibility
• Liar paradox
• Gödel's incompleteness theorems
• Doublethink

References[link]

External links[link]

• Graham Priest. Dialetheism. In the Stanford Encyclopedia of Philosophy, 2004.
• JC Beall UCONN Homepage
• (Blog & ~Blog)
• Kabay on dialetheism and trivialism (includes both published and unpublished works)

Graham Priest

Born	1948
Era	Contemporary philosophy,
Region	Western Philosophy
School	Analytic philosophy
Main interests	Logic
Notable ideas	Dialetheism

Graham Priest^[1] (born 1948, London) is Boyce Gibson Professor of Philosophy at the University of Melbourne and Distinguished Professor of Philosophy at the CUNY Graduate Center, as well as a regular visitor at St. Andrews University. Priest is a fellow in residence at Ormond College. He was educated at the University of Cambridge and the London School of Economics. His thesis advisor was John Lane Bell.

Work[link]

He is known for his defense of dialetheism, his in-depth analyses of the logical paradoxes,^[2] and his many writings related to paraconsistent and other non-classical logics.

Priest, a long-time resident of Australia, is the author of numerous books, and has published articles in nearly every major philosophical and logical journal. He was a frequent collaborator with the late Richard Sylvan, a fellow proponent of dialetheism and paraconsistent logic.

Priest has also published on metaphilosophy.

In addition to his work in philosophy and logic, Priest practices Karate-do. He is 3rd Dan, International Karate-do Shobukai; 4th Dan, Shi’to Ryu, and an Australian National Kumite Referee and Kata Judge.

Selected works[link]

Books[link]

• On Paraconsistency (with R. Routley). Research Report #l3, Research School of Social Sciences, Australian National University l983. Reprinted as the introductory chapters of Paraconsistent Logic, G.Priest, R. Routley and J. Norman (eds.), Philosophia Verlag, 1989. Translated into Romanian as chapters in I. Lucica (ed.), Ex Falso Quodlibet: studii de logica paraconsistenta (in Romanian), Editura Technica, 2004.
• In Contradiction: A Study of the Transconsistent, Martinus Nijhoff, 1987. Second edition Oxford University Press, 2006. ISBN 0-19-926330-2
• Beyond the Limits of Thought, Cambridge University Press, 1995. Second edition, Oxford University Press, 2002. ISBN 0-19-924421-9
• Logic: a Very Short Introduction, Oxford University Press, 2000. ISBN 0-19-289320-3 Translated into Portuguese as Lógica para Começar, Temas & Debates, 2002. Translated into Spanish as Una Brevísima Introducción a la Lógica, Oceano, 2006. Translated into Czech, as Logika – průvodce pro každého, Dokořán, 2007. Translated into Farsi(Persian) By Bahram Asadian, 2007. Translated into Japanese, Iwanami Shoten, 2008.
• Introduction to Non-Classical Logic, Cambridge University, 2001. Second edition: Introduction to Non-Classical Logic: From If to Is, Cambridge University Press, 2008. ISBN 978-0-521-67026-5 [1] German translation of Part 1 of Introduction to Non-Classical Logic: From If to Is: Einführung in die nicht-klassische logic, Mentis 2008.
• Towards Non-Being: the Semantics and Metaphysics of Intentionality, Oxford University Press, 2005. ISBN 0-19-926254-3
• Doubt Truth to be a Liar, Oxford University Press, 2006. ISBN 0-19-926328-0
• Logic: A Brief Insight, Sterling 2010. ISBN 1-4027-6896-6

Articles[link]

• 'Gruesome Simplicity', Philosophy of Science 1976, 43, 432-7.
• 'Modality as a Metaconcept', Notre Dame Journal of Formal Logic 1976, XVII, 401-414. http://projecteuclid.org/DPubS?service=UI&version=1.0&verb=Display&handle=euclid.ndjfl/1093887632
• 'The Formalization of Ockham's Theory of Supposition' (with S. Read), Mind 1977, LXXXVI, 109-113.
• 'A Refoundation of Modal Logic', Notre Dame Journal of Formal Logic 1977, XVIII, 340-354. http://projecteuclid.org/DPubS?service=UI&version=1.0&verb=Display&handle=euclid.ndjfl/1093888007
• 'Logic of Paradox', Journal of Philosophical Logic 1979, 8, 219-241. Translated into French as ‘La Logique du Paradoxe’, Philosophie 94 (2007), 72-94.
• 'Indefinite Descriptions', Logique et Analyse 1979, 22, 5-21.
• 'A Note on the Sorites Paradox', Australasian Journal of Philosophy 1979, 57, 74-75.
• 'Two Dogmas of Quineanism', Philosophical Quarterly 1979, 29, 289-301.
• 'Sense, Entailment and Modus Ponens', Journal of Philosophical Logic 1980, 9, 415-35.
• 'Merely Confused Supposition' (with S. Read), Franciscan Studies 1980, 40, XVIII, 265-297.
• 'Ockham's Rejection of Ampliation' (with S. Read), Mind 1981, 90, 274-9.
• 'The Argument from Design', Australasian Journal of Philosophy 1981, 59, 422-43.
• 'The Logical Paradoxes and the Law of Excluded Middle', Philosophical Quarterly 1983, 33, 160-65.
• 'To be and not to be: Dialectical Tense Logic', Studia Logica 198l, 41, 157-176; translated into Bulgarian and reprinted in Filosofska Missal XL(8), 1984, 63-76.
• 'Lessons from Pseudo-Scotus' (with R. Routley), Philosophical Studies 1982, 42, 189-99.
• 'The Truth Teller Paradox' (with C. Mortensen), Logique et Analyse 1981, 95-6, 381-8.
• 'An Anti-Realist Account of Mathematical Truth', Synthese 1983, 57, 49-65. Reprinted as ch. 8 of D. Jacquette (ed.) Philosophy of Mathematics, Blackwell, 2002.
• 'Logic of Paradox Revisited', Journal of Philosophical Logic, 1984, 12, 153-179.
• 'Semantic Closure', Studia Logica l984, 43, 117-29.
• 'Introduction to Paraconsistent Logic' (with R. Routley), Studia Logica l983, 44, 3-16.
• 'Hypercontradictions', Logique et Analyse 1984, 107, 237-43.
• 'Hume's Final Argument', History of Philosophy Quarterly 1985, 2, 349-352.
• 'Contradictions in Motion', American Philosophical Quarterly 1985, 22, 339-46.
• 'Contradiction, Belief and Rationality', Proc. Aristotelian Society 1985/6, LXXXVI, 99-116.
• 'Tense and Truth Conditions', Analysis 1986, 46, 162-6.
• 'The Logic of Nuclear Armaments', Critical Philosophy 1986, 3, 107-113.
• 'Unstable Solutions to the Liar Paradox' in Self Reference: Reflections and Reflexivity, S.J. Bartlett and P. Suber (eds.), Nijhoff, 1987.
• 'Tense, Tense and TENSE', Analysis 47, 1987, 177-9.
• 'Reasoning about Truth', Technical Report TR-ARP-2/88, Automated Reasoning Project, Australian National University, 1988.
• 'Consistency by Default', Technical Report TR-ARP-3/88, Automated Reasoning Project, Australian National University, 1988.
• 'When Inconsistency is Inescapable', South African Journal of Philosophy, 7, 1988, 83-89.
• 'Primary Qualities are Secondary Qualities Too', British Journal for the Philosophy of Science, 1989, 40 , 29-37.
• 'Contradiction, Assertion, and "Frege's Point"' (with R. Sylvan), Analysis, 49, 1989, 23-6.
• 'Reasoning About Truth', Artificial Intelligence, 39, 1989, 231-44.
• 'Denyer's $ not Backed by Sterling Arguments', Mind, 98, (1989), 265-8.
• 'Classical Logic Aufgehogen' in Paraconsistent Logic, G. Priest, R. Routley and J. Norman (eds.), Philosophia Verlag, 1989.
• 'Reductio ad Absurdum et Modus Tollendo Ponens' in Paraconsistent Logic, G. Priest, R. Routley and J. Norman (eds.), Philosophia Verlag, 1989. Reprinted in Rumanian in I. Lucica (ed.), Ex Falso Quodlibet: studii de logica paraconsistenta (in Romanian), Editura Technica, 2004.
• 'Relevance, Truth and Meaning' (with J. Crosthwaite) in Directions of Relevant Logic, R. Sylvan and J. Norman (eds.), Nijhoff, 1989.
• 'Gegen Wessel', Philosophische Logik 1989, 2, 109-20.
• 'Dialectic and Dialetheic', Science and Society 1990, 53, 388-415.
• 'Boolean Negation, and All That', Journal of Philosophical Logic 1990, 19, 201-15.
• 'Paraconsistent Dialogues' (with J.McKenzie), Logique et Analyse, 131-2 (1990), 339-57.
• 'Was Marx a Dialetheist?', Science and Society, 1991, 54, 468-75.
• 'Minimally Inconsistent LP', Studia Logica, 1991, 50, 321-331.
• 'Intensional Paradoxes', Notre Dame Journal of Formal Logic 32 (1991), 193-211. http://projecteuclid.org/DPubS?service=UI&version=1.0&verb=Display&handle=euclid.ndjfl/1093635745
• 'The Limits of Thought - and Beyond', Mind 100 (1991), 361-70.
• Sorites and Identity', Logique et Analyse, 135-6 (1991), 293-6.
• 'Simplified Semantics for Basic Relevant Logics' (with R.Sylvan), Journal of Philosophical Logic, 1992, 21, 217-32.
• 'On Time', Philosophia, 50 (1992), 9-18.
• 'What is a Non-Normal World?', Logique et Analyse 35 (1992), 291-302.
• Another Disguise of the same Fundamental Problems: Barwise and Etchemendy on the Liar', Australasian Journal of Philosophy, 71 (1993), 60-9.
• 'Yu and Your Mind', Synthese, 95 (1993), 459-60.
• 'Can Contradictions be True?, II', Proc. Aristotelian Society, Supplementary Volume 67 (1993), 35-54.
• 'Derrida and Self-Reference', Australasian Journal of Philosophy 72 (1994), 103-11.
• 'The Structure of the Paradoxes of Self-Reference', Mind 103 (1994), 25-34.
• 'Is Arithmetic Consistent?', Mind, 103 (1994), 337-49.
• 'What Could the Least Inconsistent Number be?', Logique et Analyse, 37 (1994), 3-12.
• 'Goedel's Theorem and Creativity', in Creativity, ed. T Dartnall, Kluwer Academic Publishers, 1994. Reprinted with a different introduction as 'Goedel's Theorem and the Mind... Again', in Philosophy of Mind: the place of philosophy in the study of mind, eds. M.Michaelis and J. O'Leary-Horthorne, Kluwer, 1994.
• 'Etchemendy and Logical Consequence', Canadian Journal of Philosophy 25 (1995), 283-92.
• 'Gaps and Gluts: Reply to Parsons', Canadian Journal of Philosophy, 25 (1995), 57-66.
• 'Multiple Denotation, Ambiguity and the Strange Case of the Missing Amoeba', Logique et Analyse, 38 (1995), 361-73.
• 'Some Priorities of Berkeley', Logic and Reality: Essays on the Legacy of Arthur Prior, ed. B.J.Copeland, Oxford University Press, 1996.
• 'Everett's Trilogy', Mind, 105 (1996), 631-47.
• 'On Inconsistent Arithmetics: Reply to Denyer', Mind, 105 (1996), 649-59.
• 'The Definition of Sexual Harassment' (with J.Crosthwaite), Australasian Journal of Philosophy 74 (1996), 66-82. Reprinted in G. Lee Bowie and Meredith Michaels (eds.), 13 Questions in Ethics and Social Philosophy, Harcourt, Brace, Jovanovich, 2nd ed., 1997.
• 'Paraconsistent Logic', Encyclopaedia of Mathematics; Supplement, ed. M. Hazenwinkle, Kluwer Academic Publishers, 1997, 400-1.
• 'Logic, Nonstandard', pp. 307–10, Encyclopedia of Philosophy; Supplement, ed. D.Borshert, MacMillan, 1996.
• Paraconsistent Logic' (with K.Tanaka), Stanford Internet Encyclopedia of Philosophy, created 1996. [2]
• On a Paradox of Hilbert and Bernays', Journal of Philosophical Logic 26 (1997), 45-56.
• 'The Linguistic Construction of Reality', Exordium 6 (1997), 1-7.
• 'Sylvan's Box', Notre Dame Journal of Formal Logic 38 (1997), 573-82. http://projecteuclid.org/DPubS?service=UI&version=1.0&verb=Display&handle=euclid.ndjfl/1039540770
• 'Inconsistent Models of Arithmetic; I Finite Models', Journal of Philosophical Logic, 26 (1997), 223-35.
• Sexual Perversion', Australasian Journal of Philosophy 75 (1997), 360-72. Translated into Croatian, ch. 9 of I. Primoratz (ed.), Suvremena filozofija seksualnosti, Zagreb: KruZak, 2003.
• 'Yablo's Paradox', Analysis 57 (1997), 236-42.
• 'Language, its Possibility, and Ineffability', pp. 790–794 of P. Wiengartner, G.Schurz and G.Dorn (eds.), Proceedings of the 20th International Wittgenstein Symposium, The Austrian Ludwig Wittgenstein Society, 1997.
• 'What's so Bad about Contradictions?', Journal of Philosophy 95 (1998), pp. 410–26
• On an Error in Grove's Proof' (with K.Tanaka), Logique et Analyse 158 (1997), 215-7.
• 'Paraconsistent Logic', Encyclopedia of Philosophy, Vol.7, 208-11, ed. E.Craig, Routledge, 1998.
• 'Fuzzy Identity and Local Validity', Monist 81 (1998), 331-42.
• 'Number', Encyclopedia of Philosophy, Vol.7, 47-54, ed. E.Craig, Routledge, 1998.
• 'To be and Not to Be - That is the Answer. On Aristotle on the Law of Non-Contradiction', Philosophiegeschichte und Logische Analyse 1 (1998), 91-130.
• 'The Trivial Object and the Non-Triviality of a Semantically Closed Theory with Descriptions', Journal of Applied and Non-Classical Logic, 8 (1998), 171-83.
• 'The Import of Inclosure; some Comments on Grattan-Guiness’, Mind 107 (1998), 835-40.
• 'Dialetheism', Stanford Internet Encyclopedia of Philosophy, created 1998. [3]
• 'What not? A Defence of a Dialetheic Account of Negation', in D.Gabbay and H.Wansing (eds.), What is Negation?, Kluwer Academic Publishers, 1999.
• 'Negation as Cancellation, and Connexivism', Topoi 18 (1999), 141-8.
• 'On a Version of one of Zeno's Paradoxes', Analysis 59 (1999), 1-2.
• 'Perceiving Contradictions', Australasian Journal of Philosophy 77 (1999), 439-46.
• 'Semantic Closure, Descriptions and Triviality’, the Journal of Philosophical Logic 28 (1999), 549-58.
• 'Validity', pp. 183–206 of A.Varzi (ed.) The Nature of Logic, CSLI Publications, 1999. (European Review of Philosophy, vol. 4). An abbreviated version under the same title appears as pp. 18–25 of The Logica Yearbook, 1997, ed. T.Childers, Institute of Philosophy, Czech Republic.
• 'Truth and Contradiction', Philosophical Quarterly 50 (2000), 305-19.
• 'Paraconsistent Belief Revision', Theoria 68 (2001), 214-28.
• 'Could everything be True?', Australasian Journal of Philosophy 78 (2000), 189-95.
• 'The Logic of Backwards Inductions', Economics and Philosophy 16 (2000), 267-85.
• ‘Worlds Apart', Mind! 2000 (a supplement to Mind 109 (2000)), 25-31.
• ‘Vasil’év and Imaginary Logic’ , History and Philosophy of Logic 21 (2000), 135-46.
• 'Motivations for Paraconsistency: the Slippery Slope from Classical Logic to Dialetheism', in D.Batens et al. (eds.), Frontiers of Paraconsistent Logic, Research Studies Press, 2000.
• 'Inconsistent Models of Arithmetic II; the Genera Case', Journal of Symbolic Logic 65 (2000), 1519-29.
• ‘On the Principle of Uniform Solution: a Reply to Smith’, Mind 109 (2000), 123-6.
• ‘Objects of Thought’, Australasian Journal of Philosophy 78 (2000), 494-502.
• Logic: One or Many’ in J. Woods, and B. Brown (eds.), pp. 23–28 of Logical Consequence: Rival Approaches Proceedings of the 1999 Conference of the Society of Exact Philosophy, Stanmore: Hermes, 2001.
• 'Heidegger and the Grammar of Being’, ch. 10 of R.Gaskin (ed.), Grammar in Early 20th Century Philosophy, Routledge, 2001.
• ‘Why it’s Irrational to Believe in Consistency’, pp. 284–93 of Rationality and Irrationality; Proc. 23rd International Wittgenstein Symposium, eds., B.Brogard and B.Smith, 2001.
• 'Paraconsistent Logic', Handbook of Philosophical Logic, Vol. 6, pp. 287 – 393, eds. D.Gabbay and F. Guenthner, 2nd edition, Kluwer Academic Publishers, 2002.
• 'Inconsistency and the Empirical Sciences', in J. Meheus (ed.), Inconsistency in Science, Kluwer Academic Publishers, 2002.
• ‘Logicians Setting Together Contradictories. A Perspective on Relevance, Paraconsistency, and Dialetheism’, ch. 14 of D.Jacquette (ed.), A Companion to Philosophical Logic, Blackwell, 2002.
• ‘Fuzzy Relevant Logic’, Paraconsistency: the Logical Way to the Inconsistent, ed. W.Carnielli et al., Marcel Dekker, 2002.
• 'The Hooded Man', Journal of Philosophical Logic 31 (2002), 445-67.
• ‘Rational Dilemmas’, Analysis 62 (2002), 11-16.
• ‘Meinong and the Philosophy of Mathematics’, Philosophica Mathematica 11 (2003), 3-15..
• 'On Alternative Geometries, Arithmetics and Logics, a Tribute to Lukasiewicz', Studia Logica 74 (2003), 441-468.
• 'Where is Philosophy at the Start of the Twenty First century?', Proceedings of the Aristotelian Society 103 (2003), 85-96.
• ‘Geometries and Arithmetics’, pp. 65–78 of P.Weingartner (ed.), Alternative Logics; Do Sciences Need Them?, Springer Verlag, 2003.
• A Site for Sorites', pp. 9–23 of J. C. Beall (ed.), Liars and Heaps: New Essays on Paradox, Oxford University Press, 2003.
• 'Inconsistent Arithmetic: Issues Technical and Philosophical', pp. 273–99 of V. F. Hendricks and J. Malinowski (eds.), Trends in Logic: 50 Years of Studia Logica (Studia Logica Library, Vol. 21), Kluwer Academic Publishers, 2003.
• 'Nagarjuna and the Limits of Thought’ (with Jay Garfield), Philosophy East West 53 (2003), 1-21. Reprinted as ch. 5 of J. Garfield, Empty Words, Oxford University Press, 2002.
• 'Consistency, Paraconsistency and the Logical Limitative Theorems', in Grenzen und Grenzüberschreitungen (XIX Deutscher Kongress für Philosphie), ed. W. Hogrebe and J. Bromond, Akademie Verlag, 2004.
• ‘Chunk and Permeate I: the Infinitesimal Calculus’ (with Bryson Brown), Journal of Philosophical Logic 33 (2004), 379-88.
• 'Intentionality - Meinongianisn and the Medievals', (with Stephen Read), Australasian Journal of Philosophy, 82 (2004), 421-442.
• 'Spiking the Field Artillery', in J. C. Beall and B. Armour-Garb (eds.), ch. 3 of Truth and Deflationism, Oxford University Press, 2005.
• 'Problems with the Argument for Fine Tuning' (with Mark Colyvan and Jay Garfield), Synthese 145 (2005), 325-38.
• 'Words Without Knowledge', Philosophy and Phenomenological Research 71 (2005), 686-94
• ‘The Limits of Language’ in K. Brown (ed.), Encyclopedia of Language and Linguistics, (second edition) Vol.7, 156-9, Elsevier, 2005.
• ‘Analetheism: a Phyrric Victory’ (with Brad Armour-Garb), Analysis 65 (2005), 167-73.
• ‘Analysing of the Iraqi Adventure’, Ormond Papers 22 (2005), 147-50.
• 'The Paradoxes of Denotation', ch. 7 of Self-Reference, eds. T. Bolander, V. F. Hendrix, and S. A Pedersen, CLSI Lecture Notes, Stanford University, 2006.
• ‘Logic, Paraconsistent’, in D. Borchert (ed.), Encyclopedia of Philosophy (second edition), Macmillan, 2006, Vol. 7, 105-6.
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• ‘Motion’, in D. Borchert (ed.), Encyclopedia of Philosophy (second edition), Macmillan, 2006, Vol. 6, 409-11.
• ‘Restricted Quantification in Relevant Logic’, (with JC Beall, R. Brady, A. Hazen, and G. Restall) Journal of Philosophical Logic 35/6 (2006), 587-98. [4]
• `What is Philosophy?’, Philosophy 81 (2006), 189-207.
• ‘A Hundred Flowers’, Topoi 25 (2006), 91-5.
• ‘Not so Deep Inconsistency: a Reply to Eklund’ (with JC Beall), Australasian Journal of Logic 5 (2007) 74-84.
• ‘Paraconsistency and Dialetheism’, pp. 129–204 of Handbook of the History of Logic, Vol. 8, eds. D. Gabbay and J. Woods, North Holland, 2007.
• ‘Reply to Slater’, pp. 467–74 of J-Y Beziau, W. Carnielli and D. Gabbay (eds.), Handbook of Paraconsistency, College Publications, 2007.
• ‘60% Proof: Proof, Lakatos and Paraconsistency’, (with Neil Thomason), Australasian Journal of Logic 5 (2007), 89-100.
• ‘Revenge, Field, and ZF’, ch. 9 of JC Beall (ed.), Revenge of the Liar: New Essays on the Paradox, Oxford University Press, 2007.
• ‘How the Particular Quantifier became Existentially Loaded Behind our Backs’, Soochow Journal of Philosophical Studies 16 (2007), 197-213.
• 'Translation of ‘Logic of Paradox’, ‘La Logique du paraqdoxe’, Philosophie 94 (2007), 72-94.
• ‘The Way of the Dialetheist: Contradictions in Buddhism’ (with J. Garfield and Y. Deguchi), Philosophy East and West 58 (2008), 395-402.
• ‘Jaina Logic: a Contemporary Perspective’, History and Philosophy of Logic 29 (2008), 263-278.
• ‘Precis of Towards Non-Being’, Review of Metaphysics 74 (2008), 185-90.
• ‘Replies to Nolan and Kroon’, Philosophy and Phenomenological Research 74 (2008), 208-14.
• ‘Many-Valued Modal Logic: a Simple Approach’, Review of Symbolic Logic 1 (2008), 190-203.
• ‘The Closing of the Mind: How the Particular Quantifier Became Existentially Loaded Behind our Backs’, Review of Symbolic Logic 1 (2008), 42-55.
• ‘Graham Priest and Diderik Batens Interview Each Other’, The Reasoner 2 (No. 8) (2008), 2-4.
• ‘Creating Non-Existents: Some Initial Thoughts’, Studies in Logic, 1 (2008), 18-24.
• ‘Badici on Inclosures’, Australasian Journal of Philosophy 86 (2008), 583-96.
• ‘Logical Pluralism Hollandaise’, The Australasian Journal of Logic, 6 (2008), 210-14.
• 'Envelops and Indifference', (with Greg Restall), pages 283-290 in Dialogues, Logics and Other Strange Things, essays in honour of Shahid Rahman, edited by Cédric Dégremont, Laurent Keiff and Helge Rückert, College Publications, 2008. [5]
• 'Conditionals: a Debate with Jackson', ch. 13 of I. Ravenscroft (ed.), Minds, Worlds and Conditionals: Themes from the Philosophy of Frank Jackson. Oxford University Press, 2009.
• ‘Beyond the Limits of Knowledge’, ch. 7 (pp. 93–104) of J. Salerno (ed.), New Essays on the Knowability Paradox, Oxford University Press, 2009.
• ‘The Structure of Emptiness’, Philosophy East and West 59 (2009), 467-480.
• ‘Mountains are Just Mountains’ (with Jay Garfield), pp. 71–82 of J. Garfield and M. D’Amato (eds.), Pointing at the Moon: Buddhism. Logic and Analytic Philosophy, Oxford University Press, 2009.
• ‘Obituary for Leonard Goddard’, The Australasian Journal of Philosophy 87 (2009) 693-4.
• Translation of ‘Objects of Thought’ into Japanese, in Human Ontology 15 (2009), 1-12. (Trans. S. Yamahguchi.)
• ‘Neighbourhood Semantics for Intentional Operators’, Review of Symbolic Logic, 2 (2009), 360-373.
• ‘Not to Be’, ch. 23 of R. Le Poidevin, P. Simons, A. McGonical, and R. Cameron (eds.), The Routledge Companion to Metaphysics, Routledge 2009.
• 'Dualising Intuitionist Negation', 13(2): 165-84 (2009).
• 'A Case of Mistaken Identity’, ch. 11, pp. 205–222 of J. Lear and A. Oliver, The Force of Argument, Routledge, 2010.
• ‘Hopes Fade for Saving Truth’, Philosophy 85 (2010), 109-140. [6]
• ‘Two Truths: Two Models’, to appear in the Cowherds (eds.), Moonshadows, Oxford University Press.
• ‘The Truth(s) about the Two Truths’, (with T.Tilemans and M. Siderits) to appear in the Cowherds (eds.), Moonshadows, Oxford University Press (2010).
• ‘Inclosures, Vagueness and Self-Reference’, Notre Dame Journal of Formal Logic, Volume 51, Number 1 (2010), 69-84.

References[link]

External links[link]

• Arche Foundations of Logical Consequence Workshop 2009, "Is the Ternary R Depraved?"
• The Monthly: Graham priest on Gottlob Frege
• The Philosopher's Zone, 10 July 2010: "It's All about Me: A Forum on the Philosophy of the Self"
• The New York Times, The Stone Blog, November 28, 2010: "Paradoxical Truth"
• Graham Priest Photograph (full NYT version) Wikimedia Sept. 2010
• Philosophy TV, January 10, 2011: Discussion of Deviant (Non-Classical) Logic, teaching logic, metafiction and logic with Maureen Eckert (UMASS Dartmouth)
• Two-Part Interview on Florida Student Philosophy Blog: Part 1 General Questions and Part 2 Technical Questions.

This biographical article needs additional citations for verification. Please help by adding reliable sources. Contentious material about living persons that is unsourced or poorly sourced must be removed immediately, especially if potentially libelous or harmful. (April 2008)

Colin McGinn (born March 10, 1950) is a British philosopher currently working at the University of Miami. McGinn has also held major teaching positions at Oxford University and Rutgers University. He is best known for his work in the philosophy of mind, though he has written on topics across the breadth of modern philosophy. Chief among his works intended for a general audience is the intellectual memoir The Making of a Philosopher: My Journey Through Twentieth-Century Philosophy (2002).

Biography[link]

Colin McGinn was born in the town of West Hartlepool, England in 1950.^[1] He enrolled in Manchester University to study psychology. However, by the time he received his degree in psychology from Manchester in 1971 (by writing a thesis focusing on the ideas of Noam Chomsky), he wanted to study philosophy as a postgraduate. By 1972, McGinn was admitted into Oxford University's Bachelor of Letters postgraduate programme, in hopes of eventually gaining entrance into Oxford's postgraduate Bachelor of Philosophy programme.

McGinn quickly made the transition from psychology to philosophy during his first term at Oxford. After working zealously to make the transition, he was soon admitted into the B.Phil. programme under the recommendation of his advisor, Michael R. Ayers. Shortly after entering the philosophy programme, he won the John Locke Prize in 1972. By 1974, McGinn received the B.Phil degree from Oxford, writing a thesis under the supervision of P. F. Strawson, which focused on the semantics of Donald Davidson.

In 1974, McGinn took his first philosophy position at University College London. In January 1980, he spent two semesters at University of California, Los Angeles (UCLA) as a visiting professor. Then, shortly after declining a job at University of Southern California, he succeeded Gareth Evans as Wilde Reader at Oxford University. In 1988, shortly after a visiting term at City University of New York (CUNY), McGinn received a job offer from Rutgers University. He accepted the offer from Rutgers, joining ranks with, among others, Jerry Fodor in the philosophy department. McGinn stayed at Rutgers until 2006, when he accepted a job offer from University of Miami as full time professor.

Work[link]

Although McGinn has written dozens of articles in philosophical logic, metaphysics, and the philosophy of language, he is best known for his work in the philosophy of mind. In his 1989 article "Can We Solve the Mind-Body Problem?", McGinn speculates that the human mind is innately incapable of comprehending itself entirely, and that this incapacity spawns the puzzles of consciousness that have preoccupied Western philosophy since Descartes. Thus, McGinn's answer to the hard problem of consciousness is that humans cannot find the answer. This position has been nicknamed the "New Mysterianism". The Mysterious Flame: Conscious Minds in a Material World (2000) is a non-technical exposition of McGinn's theory.

Outside of philosophy, McGinn has written a novel entitled The Space Trap (1992). He was also featured prominently as an interviewee in Jonathan Miller's Brief History of Disbelief, a documentary mini-series about atheism's history. He discussed the philosophy of belief as well as his own beliefs as an antitheist.

He is cited by Michio Kaku in "Visions: How Science Will Revolutionize The 21st Century" and in "Physics of the Impossible" regarding the subjective experience that arises from matter or the impossibility of building machines that can think: "is like slugs trying to do Freudian psychoanalysis, they just don't have the conceptual equipment."

Books[link]

A partial list of books by Colin McGinn:

• Mindfucking (2008). Acumen, ISBN 1-84465-114-2.
• Shakespeare's Philosophy: Discovering the Meaning Behind the Plays (2006). HarperCollins, ISBN 0-06-085615-7.
• The Power of Movies: How Screen and Mind Interact (2005). Pantheon, ISBN 0-375-42317-6.
• Mindsight: Image, Dream, Meaning (2004). Harvard University Press, ISBN 0-674-01560-6.
• Consciousness and Its Objects (2004). Oxford University Press, ISBN 0-19-926760-X.
• The Making of a Philosopher: My Journey Through Twentieth-Century Philosophy (2002). HarperCollins, ISBN 0-06-019792-7 (first edition). (Reprint edition, 2003, Harper Perennial, ISBN 0-06-095760-3.)
• Logical Properties: Identity, Existence, Predication, Necessity, Truth (2001). Oxford University Press, ISBN 0-19-924181-3.
• The Mysterious Flame: Conscious Minds in a Material World (1999). Basic Books, ISBN 0-465-01422-4.
• Knowledge and Reality: Selected Papers (1998). Oxford University Press.
• Ethics, Evil and Fiction (1997). Oxford University Press.
• Minds and Bodies: Philosophers and Their Ideas (1997). Oxford University Press.
• Problems in Philosophy: the Limits of Inquiry (1993). Blackwell.
• The Space Trap (1992). Duckworth.
• Moral Literacy: Or How To Do The Right Thing (1992). Duckworth. Hackett, 1993.
• The Problem of Consciousness (1991). Basil Blackwell.
• Mental Content (1989). Basil Blackwell.
• Wittgenstein on Meaning (1984). Basil Blackwell.
• The Subjective View: Secondary Qualities and Indexical Thoughts (1983). Oxford University Press.
• The Character of Mind (1982). Oxford University Press. (Second edition, 1997.)

Selected articles[link]

A partial list of articles by Colin McGinn (emphasis on scholarly philosophical articles):

• "Another Look at Colour" (1996). Journal of Philosophy.
• "Consciousness and Space" (1995). Journal of Consciousness Studies.
• "The Problem of Philosophy" (1994). Philosophical Studies.
• "Must I Be Morally Perfect?" (1992). Analysis.
• "Conceptual Causation: Some Elementary Reflections" (1991). Mind.
• "Can We Solve the Mind-Body Problem?" Mind, 1989.
• "What is the Problem of Other Minds?" (1984). Proceedings of the Aristotelian Society.
• "Two Notions of Realism?" (1983). Philosophical Topics.
• "Realist Semantics and Content Ascription" (1982). Synthese.
• "Rigid Designation and Semantic Value" (1982). Philosophical Quarterly.
• "Philosophical Materialism" (1980). Synthese
• "An A Priori Argument for Realism" (1979). The Journal of Philosophy.
• "Single-case Probability and Logical Form" (1979). Mind.
• "Charity, Interpretation and Belief" (1977). The Journal of Philosophy.
• "Semantics for Nonindicative Sentences" (1977). Philosophical Studies.
• "A Priori and A Posteriori Knowledge" (1976). Proceedings of the Aristotelian Society.
• "A Note on the Frege Argument" (1976). Mind.
• "On the Necessity of Origin" (1976). The Journal of Philosophy.
• "A Note on the Essence of Natural Kinds" (1975). Analysis.
• "Mach and Husserl" (1972). Journal for the British Society of Phenomenology.

External links[link]

Wikisource has original works written by or about: Colin McGinn

• Colin McGinn's Blog
• CV — curriculum vitae.
• To Be Or Not To Be: Colin McGinn Dissects The Philosophy of Shakespeare's Plays
• [2] — scroll down for transcript of an interview with McGinn on the 2006 PBS program "Bill Moyer on Faith & Reason".
• Conscious Entities — information on McGinn's views on consciousness.
• Colin McGinn in ZhurnalyWiki — a review of McGinn's autobiography.
• "Apes, Humans, Aliens, Vampires and Robots". In Paola Cavalieri & Peter Singer (eds.), The Great Ape Project, New York: St. Martin's Griffin, 1993, pp. 146–151.

References[link]

This article includes a list of references, related reading or external links, but its sources remain unclear because it lacks inline citations. Please improve this article by introducing more precise citations. (April 2008)

• McGinn, Colin. (2002). The Making of a Philosopher: My Journey Through Twentieth-Century Philosophy. HarperCollins, ISBN 0-06-019792-7 (first edition). (Reprint edition, 2003, Harper Perennial, ISBN 0-06-095760-3.)

Timothy Williamson (born Uppsala, 6 August 1955) is a British philosopher whose main research interests are in philosophical logic, philosophy of language, epistemology and metaphysics.

He is currently the Wykeham Professor of Logic at the University of Oxford, and Fellow of New College, Oxford. He was previously Professor of Logic and Metaphysics at the University of Edinburgh (1995–2000); Fellow and Lecturer in Philosophy at University College, Oxford (1988–1994); and Lecturer in Philosophy at Trinity College, Dublin (1980–1988). He was president of the Aristotelian Society from 2004 to 2005.

He is a Fellow of the British Academy (FBA),^[1] the Norwegian Academy of Science and Letters,^[2] Fellow of the Royal Society of Edinburgh (FRSE) and a Foreign Honorary Fellow of the American Academy of Arts & Sciences.

Education[link]

Timothy Williamson's education began at Leighton Park School and continued at Henley Grammar School. He then went to Oxford University. He graduated in 1976 with a B.A. (first class honours) in Mathematics and Philosophy, and in 1981 with a doctorate in philosophy (D.Phil.) for a thesis examining "The Concept of Approximation to the Truth".

Contribution to philosophy[link]

Williamson has contributed to analytic philosophy of language, logic, metaphysics and epistemology.

On vagueness, he holds a position known as epistemicism, which states that every seemingly vague predicate (like "bald", or "thin") actually has a sharp cutoff, which is impossible for us to know. That is, there is some number of hairs such that anyone with that number is bald, and anyone with even one more hair is not. In actuality, this condition will be spelled out only partly in terms of numbers of hairs, but whatever measures are relevant will have some precise cutoff. This solution to the difficult sorites paradox was considered an astonishing and unacceptable consequence, but has become a relatively mainstream view since his defense of it.^[3] Williamson is fond of using the statement, "no one knows whether I am thin" to illustrate his view.^[4]

In epistemology, he suggests that the concept of knowledge is unanalyzable. This goes against the common trend in philosophical literature up to that point, which was to argue that knowledge could be analysed into constituent concepts. (Typically this would be justified true belief plus an extra factor.) He agrees that knowledge entails justification, truth and belief, but that it is conceptually primitive. He accounts for the importance of belief by discussing its connections with knowledge, but avoids the disjunctivist position of saying that belief can be analyzed as the disjunction of knowledge with some distinct, non-factive mental state.

Publications[link]

• Identity and Discrimination, Oxford: Blackwell, 1990.
• Vagueness, London: Routledge, 1994.
• Knowledge and Its Limits, Oxford: Oxford University Press, 2000.
• The Philosophy of Philosophy, Oxford: Blackwell, 2007.

Williamson has also published more than 120 articles in peer-reviewed scholarly journals.

External links[link]

• Timothy Williamson's homepage at University of Oxford's Department of Philosophy.
• The Moscow Center for Consciousness Studies video interview with Timothy Williamson October 4, 2010.
• Roundtable on aims and methods of philosophy with Timothy Williamson as the main presenter October 6, 2010

References[link]

Friedrich Ludwig Gottlob Frege

Born	8 November 1848 Wismar, Mecklenburg-Schwerin, Germany
Died	26 July 1925(1925-07-26) (aged 76) Bad Kleinen, Mecklenburg-Schwerin, Germany
Era	19th century philosophy 20th century philosophy
Region	Western Philosophy
School	Analytic philosophy
Main interests	Philosophy of mathematics, Mathematical logic, Philosophy of language
Notable ideas	Principle of compositionality, Quantification theory, Predicate calculus, Logicism, Sense and reference
Influenced by Adolf Trendelenburg, Hermann Lotze[1]
Influenced Giuseppe Peano, Bertrand Russell, Rudolf Carnap, Ludwig Wittgenstein, Michael Dummett, Edmund Husserl, Gershom Scholem, Ian Rumfitt, and most of the analytic tradition

Friedrich Ludwig Gottlob Frege (8 November 1848 – 26 July 1925, pronounced [ˈɡɔtloːp ˈfreːɡə ]) was a German mathematician, logician and philosopher. He is considered to be one of the founders of modern logic and made major contributions to the foundations of mathematics. He is generally considered to be the father of analytic philosophy, for his writings on the philosophy of language and mathematics. While he was mainly ignored by the intellectual world when he published his writings, Giuseppe Peano (1858–1932) and Bertrand Russell (1872–1970) introduced his work to later generations of logicians and philosophers.

Life[link]

Childhood (1848–1869)[link]

Frege was born in 1848 in Wismar, in the state of Mecklenburg-Schwerin (the modern German federal state Mecklenburg-Vorpommern). His father Carl (Karl) Alexander Frege (3 August 1809 – 30 November 1866) was the co-founder and headmaster of a girls' high school until his death. After Carl's death, the school was led by Frege's mother Auguste Wilhelmine Sophie Frege (née Bialloblotzky, 12 January 1815 – 14 October 1898).

In childhood, Frege encountered philosophies that would guide his future scientific career. For example, his father wrote a textbook on the German language for children aged 9–13, entitled Hülfsbuch zum Unterrichte in der deutschen Sprache für Kinder von 9 bis 13 Jahren (2nd ed., Wismar, 1850; 3rd ed., Wismar and Ludwigslust: Hinstorff, 1862), the first section of which dealt with the structure and logic of language.

Frege studied at a gymnasium in Wismar and graduated in 1869. His teacher Gustav Adolf Leo Sachse (5 November 1843 – 1 September 1909), who was also a poet, played the most important role in determining Frege’s future scientific career, encouraging him to continue his studies at the University of Jena.

Studies at University: Jena and Göttingen (1869 – 1874)[link]

Frege matriculated at the University of Jena in the spring of 1869 as a citizen of the North German Federation. In the four semesters of his studies he attended approximately twenty courses of lectures, most of them on mathematics and physics. His most important teacher was Ernst Karl Abbe (1840–1905) (physicist, mathematician, and inventor). Abbe gave lectures on theory of gravity galvanism and electrodynamics, complex analysis theory of functions of a complex variable, applications of physics, selected divisions of mechanics, and mechanics of solids. Abbe was more than a teacher to Frege: he was a trusted friend, and, as director of the optical manufacturer Carl Zeiss AG, he was in a position to advance Frege's career. After Frege's graduation, they came into closer correspondence.

His other notable university teachers were Christian Philipp Karl Snell (1806–1886) (subjects: use of infinitesimal analysis in geometry analytical geometry of planes, analytical mechanics, optics, physical foundations of mechanics); Hermann Karl Julius Traugott Schaeffer (1824–1900) (analytical geometry, applied physics, algebraic analysis, on the telegraph and other electronic machines; and the famous philosopher Kuno Fischer (1824–1907) (Kantian and critical philosophy).

Starting in 1871, Frege continued his studies in Göttingen, the leading university in mathematics in German-speaking territories, where he attended the lectures of Alfred Clebsch (1833–1872) (analytical geometry), Ernst Christian Julius Schering (1824–1897) function theory, Wilhelm Eduard Weber (1804–1891) (physical studies, applied physics, Eduard Riecke (1845–1915) (theory of electricity, and Hermann Lotze (1817–1881) (philosophy of religion). (Many of the philosophical doctrines of the mature Frege have parallels in Lotze; it has been the subject of scholarly debate whether or not there was a direct influence on Frege's views arising from his attending Lotze's lectures.)

In 1873, Frege attained his doctorate under Ernst Schering, with a dissertation under the title of "Über eine geometrische Darstellung der imaginären Gebilde in der Ebene" ("On a Geometrical Representation of Imaginary Forms in a Plane"), in which he aimed to solve such fundamental problems in geometry as the mathematical interpretation of projective geometry's infinitely distant (imaginary) points.

Frege married Margarete Katharina Sophia Anna Lieseberg (15 February 1856 - 25 June 1904) on March 14, 1887.

Work as a logician[link]

Though his education and early work were mathematical, especially geometrical, Frege's thought soon turned to logic. His Begriffsschrift, eine der arithmetischen nachgebildete Formelsprache des reinen Denkens (Halle a/S: Verlag von Louis Nebert, 1879) (Concept-Script: A Formal Language for Pure Thought Modeled on that of Arithmetic) marked a turning point in the history of logic. The Begriffsschrift broke new ground, including a rigorous treatment of the ideas of functions and variables. Frege wanted to show that mathematics grows out of logic, but in so doing, he devised techniques that took him far beyond the Aristotelian syllogistic and Stoic propositional logic that had come down to him in the logical tradition.

Title page to Begriffsschrift (1879)

In effect, Frege invented axiomatic predicate logic, in large part thanks to his invention of quantified variables, which eventually became ubiquitous in mathematics and logic, and which solved the problem of multiple generality. Previous logic had dealt with the logical constants and, or, if ... then ..., not, and some and all, but iterations of these operations, especially "some" and "all", were little understood: even the distinction between a pair of sentences like "every boy loves some girl" and "some girl is loved by every boy" was able to be represented only very artificially, whereas Frege's formalism had no difficulty expressing the different readings of "every boy loves some girl who loves some boy who loves some girl" and similar sentences, in complete parallel with his treatment of, say, "every boy is foolish".

It is frequently noted that Aristotle's logic is unable to represent even the most elementary inferences in Euclid's geometry, but Frege's "conceptual notation" can represent inferences involving indefinitely complex mathematical statements. The analysis of logical concepts and the machinery of formalization that is essential to Principia Mathematica (3 vols., 1910–1913) (by Bertrand Russell, 1872–1970, and Alfred North Whitehead, 1861–1947), to Russell's theory of descriptions, to Kurt Gödel's (1906–1978) incompleteness theorems, and to Alfred Tarski's (1901–1983) theory of truth, is ultimately due to Frege.

One of Frege's stated purposes was to isolate genuinely logical principles of inference, so that in the proper representation of mathematical proof, one would at no point appeal to "intuition". If there was an intuitive element, it was to be isolated and represented separately as an axiom: from there on, the proof was to be purely logical and without gaps. Having exhibited this possibility, Frege's larger purpose was to defend the view that arithmetic is a branch of logic, a view known as logicism: unlike geometry, arithmetic was to be shown to have no basis in "intuition", and no need for non-logical axioms. Already in the 1879 Begriffsschrift important preliminary theorems, for example a generalized form of law of trichotomy, were derived within what Frege understood to be pure logic.

This idea was formulated in non-symbolic terms in his Die Grundlagen der Arithmetik (1884) (The Foundations of Arithmetic). Later, in his Grundgesetze der Arithmetik (Basic Laws of Arithmetic) (vol. 1, 1893; vol. 2, 1903) (vol. 2 of which was published at his own expense), Frege attempted to derive, by use of his symbolism, all of the laws of arithmetic from axioms he asserted as logical. Most of these axioms were carried over from his Begriffsschrift, though not without some significant changes. The one truly new principle was one he called the Basic Law V: the "value-range" of the function f(x) is the same as the "value-range" of the function g(x) if and only if ∀x[f(x) = g(x)].

The crucial case of the law may be formulated in modern notation as follows. Let {x|Fx} denote the extension of the predicate Fx, i.e., the set of all Fs, and similarly for Gx. Then Basic Law V says that the predicates Fx and Gx have the same extension iff ∀x[Fx ↔ Gx]. The set of Fs is the same as the set of Gs just in case every F is a G and every G is an F. (The case is special because what is here being called the extension of a predicate, or a set, is only one type of "value-range" of a function.)

In a famous episode, Bertrand Russell wrote to Frege, just as Vol. 2 of the Grundgesetze was about to go to press in 1903, showing that Russell's paradox could be derived from Frege's Basic Law V. It is easy to define the relation of membership of a set or extension in Frege's system; Russell then drew attention to "the set of things x that are such that x is not a member of x". The system of the Grundgesetze entails that the set thus characterised both is and is not a member of itself, and is thus inconsistent. Frege wrote a hasty, last-minute Appendix to Vol. 2, deriving the contradiction and proposing to eliminate it by modifying Basic Law V. Frege opened the Appendix with the exceptionally honest comment: "Hardly anything more unfortunate can befall a scientific writer than to have one of the foundations of his edifice shaken after the work is finished. This was the position I was placed in by a letter of Mr. Bertrand Russell, just when the printing of this volume was nearing its completion." (This letter and Frege's reply are translated in Jean van Heijenoort 1967.)

Frege's proposed remedy was subsequently shown to imply that there is but one object in the universe of discourse, and hence is worthless (indeed, this would make for a contradiction in Frege's system if he had axiomatized the idea, fundamental to his discussion, that the True and the False are distinct objects; see, for example, Dummett 1973), but recent work has shown that much of the program of the Grundgesetze might be salvaged in other ways:

• Basic Law V can be weakened in other ways. The best-known way is due to philosopher and mathematical logician George Boolos (1940–1996), who was an expert on the work of Frege. A "concept" F is "small" if the objects falling under F cannot be put into one-to-one correspondence with the universe of discourse, that is, if: ∃R[R is 1-to-1 & ∀x∃y(xRy & Fy)]. Now weaken V to V*: a "concept" F and a "concept" G have the same "extension" if and only if neither F nor G is small or ∀x(Fx ↔ Gx). V* is consistent if second-order arithmetic is, and suffices to prove the axioms of second-order arithmetic.
• Basic Law V can simply be replaced with Hume's Principle, which says that the number of Fs is the same as the number of Gs if and only if the Fs can be put into a one-to-one correspondence with the Gs. This principle, too, is consistent if second-order arithmetic is, and suffices to prove the axioms of second-order arithmetic. This result is termed Frege's Theorem because it was noticed that in developing arithmetic, Frege's use of Basic Law V is restricted to a proof of Hume's Principle; it is from this, in turn, that arithmetical principles are derived. On Hume's Principle and Frege's Theorem, see "Frege's Logic, Theorem, and Foundations for Arithmetic".^[2]
• Frege's logic, now known as second-order logic, can be weakened to so-called predicative second-order logic. Predicative second-order logic plus Basic Law V is provably consistent by finitistic or constructive methods, but it can interpret only very weak fragments of arithmetic.^[3]

Frege's work in logic had little international attention until 1903 when Russell wrote an appendix to The Principles of Mathematics stating his differences with Frege. The diagrammatic notation that Frege used had no antecedents (and has had no imitators since). Moreover, until Russell and Whitehead's Principia Mathematica (3 vols.) appeared in 1910–13, the dominant approach to mathematical logic was still that of George Boole (1815–1864) and his intellectual descendants, especially Ernst Schröder (1841–1902). Frege's logical ideas nevertheless spread through the writings of his student Rudolf Carnap (1891–1970) and other admirers, particularly Bertrand Russell and Ludwig Wittgenstein (1889–1951).

Philosopher[link]

Frege is one of the founders of analytic philosophy, mainly because of his contributions to the philosophy of language, including the

• Function-argument analysis of the proposition;
• Distinction between concept and object (Begriff und Gegenstand);
• Principle of compositionality;
• Context principle;
• Distinction between the sense and reference (Sinn und Bedeutung) of names and other expressions, sometimes said to involve a mediated reference theory.

As a philosopher of mathematics, Frege attacked the psychologistic appeal to mental explanations of the content of judgment of the meaning of sentences. His original purpose was very far from answering general questions about meaning; instead, he devised his logic to explore the foundations of arithmetic, undertaking to answer questions such as "What is a number?" or "What objects do number-words ("one", "two", etc.) refer to?" But in pursuing these matters, he eventually found himself analysing and explaining what meaning is, and thus came to several conclusions that proved highly consequential for the subsequent course of analytic philosophy and the philosophy of language.

It should be kept in mind that Frege was employed as a mathematician, not a philosopher, and he published his philosophical papers in scholarly journals that often were hard to access outside of the German-speaking world. He never published a philosophical monograph other than The Foundations of Arithmetic, much of which was mathematical in content, and the first collections of his writings appeared only after World War II. A volume of English translations of Frege's philosophical essays first appeared in 1952, edited by students of Wittgenstein, Peter Geach (born 1916) and Max Black (1909–1988), with the bibliographic assistance of Wittgenstein (see Geach, ed. 1975, Introduction). Despite the generous praise of Russell and Wittgenstein, Frege was little known as a philosopher during his lifetime. His ideas spread chiefly through those he influenced, such as Russell, Wittgenstein, and Carnap, and through work on logic and semantics by Polish logicians.

Sense and reference[link]

The distinction between Sinn ("sense") and Bedeutung (usually translated "reference", but also as "meaning" or "denotation") was an innovation of Frege in his 1892 paper "Über Sinn und Bedeutung" ("On Sense and Reference"). According to Frege, sense and reference are two different aspects of the significance of an expression. Frege applied Bedeutung in the first instance to proper names, where it means the bearer of the name, the object in question, but then also to other expressions, including complete sentences, which bedeuten the two "truth values", the true and the false; by contrast, the sense or Sinn associated with a complete sentence is the thought it expresses. The sense of an expression is said to be the "mode of presentation" of the item referred to.

The distinction can be illustrated thus: In their ordinary uses, the name "Charles Philip Arthur George Mountbatten-Windsor", which for logical purposes is an unanalyzable whole, and the functional expression "the Prince of Wales", which contains the significant parts "the prince of ξ" and "Wales", have the same reference, namely, the person best known as Prince Charles. But the sense of the word "Wales" is a part of the sense of the latter expression, but no part of the sense of the "full name" of Prince Charles.

These distinctions were disputed by Bertrand Russell, especially in his paper "On Denoting"; the controversy has continued into the present, fueled especially by Saul Kripke's famous lectures "Naming and Necessity".

Imagine the road signs outside a city. They all point to (bedeuten) the same object (the city), although the "mode of presentation" or sense (Sinn) of each sign (its direction or distance) is different. Similarly "the Prince of Wales" and "Charles Philip Arthur George Mountbatten-Windsor" both denote (bedeuten) the same object, though each uses a different "mode of presentation" (sense or Sinn).

1924 diary[link]

Frege's published philosophical writings were of a very technical nature and divorced from practical issues, so much so that Frege scholar Dummett expresses his "shock to discover, while reading Frege's diary, that his hero was an outspoken anti-Semite (1973)."^[4] He was always a conservative, but after World War I he became more of a radical. His late political "diary shows Frege to have been a man of extreme right-wing political opinions, bitterly opposed to the parliamentary system, democrats, liberals, Catholics, the French and, above all, Jews, who he thought ought to be deprived of political rights and, preferably, expelled from Germany".^[5] Frege confided "that he had once thought of himself as a liberal and was an admirer of Bismarck, but his heroes now were General Ludendorff and Adolf Hitler. This was after the two had tried to topple the elected democratic government in a coup in November 1923. In his diary Frege also used all his analytic skills to devise plans for expelling the Jews from Germany and for suppressing the Social Democrats."^[6] Frege disliked universal suffrage and was against any form of socialism, which he simply called Marxism. His antisemitism still allowed for exceptions, and he had friendly relations with Jews in real life: among his students was Gershom Scholem who much valued his teacher;^[7][8] and he encouraged Ludwig Wittgenstein to leave for England. The 1924 diary has been published.^[9]

Personality[link]

Frege was described by his students as a highly introverted person, seldom entering into dialogue, mostly facing the blackboard while lecturing though being witty and sometimes bitterly sarcastic.^[10]

Important dates[link]

• Born 8 November 1848 in Wismar, Mecklenburg-Schwerin.
• 1869 — attends the University of Jena.
• 1871 — attends the University of Göttingen.
• 1873 — PhD, doctor in mathematics (geometry), attained at Göttingen.
• 1874 — Habilitation at Jena; private teacher.
• 1879 — Professor Extraordinarius at Jena.
• 1896 — Ordentlicher Honorarprofessor at Jena.
• 1917 or 1918 — retires.
• Died 26 July 1925 in Bad Kleinen (now part of Mecklenburg-Vorpommern).

Important works[link]

Logic, foundation of arithmetic[link]

Begriffsschrift, eine der arithmetischen nachgebildete Formelsprache des reinen Denkens (1879). Halle a. S.

• English: Concept Notation, the Formal Language of the Pure Thought like that of Arithmetics.

Die Grundlagen der Arithmetik: eine logisch-mathematische Untersuchung über den Begriff der Zahl (1884). Breslau.

• English: The Foundations of Arithmetic: the logical-mathematical Investigation of the Concept of Number.

Grundgesetze der Arithmetik, Band I (1893); Band II (1903). Jena: Verlag Hermann Pohle.

• English: Basic Laws of Arithmetic, translated and edited with an introduction by Montgomery Furth (1964). This work is a translation of only part of Grundgesetze der Arithmetik. ISBN 978-0-520-04761-7

Philosophical studies[link]

Function and Concept (1891)

• Original: Funktion und Begriff : Vortrag, gehalten in der Sitzung; vom 9. Januar 1891 der Jenaischen Gesellschaft für Medizin und Naturwissenschaft, Jena, 1891;
• In English: Function and Concept.

"On Sense and Reference" (1892)

• Original: "Über Sinn und Bedeutung", in Zeitschrift für Philosophie und philosophische Kritik C (1892): 25–50;
• In English: "On Sense and Reference", alternatively translated (in later edition) as "On Sense and Meaning".

"Concept and Object" (1892)

• Original: "Über Begriff und Gegenstand", in Vierteljahresschrift für wissenschaftliche Philosophie XVI (1892): 192–205;
• In English: "Concept and Object".

"What is a Function?" (1904)

• Original: "Was ist eine Funktion?", in Festschrift Ludwig Boltzmann gewidmet zum sechzigsten Geburtstage, 20. February 1904, S. Meyer (ed.), Leipzig, 1904, pp. 656–666 (Internet Archive: [2], [3], [4]);

• In English: "What is a Function?"

Logical Investigations (1918–1923). Frege intended that the following three papers be published together in a book titled Logische Untersuchungen (Logical Investigations). Though the German book never appeared, English translations did appear together in Logical Investigations, ed. Peter Geach, Blackwell's, 1975.

• 1918–19. "Der Gedanke: Eine logische Untersuchung" ("Thought: A Logical Investigation"), in Beiträge zur Philosophie des Deutschen Idealismus I: 58–77.
• 1918–19. "Die Verneinung" ("Negation") in Beiträge zur Philosophie des deutschen Idealismus I: 143–157.
• 1923. "Gedankengefüge" ("Compound Thought"), in Beiträge zur Philosophie des Deutschen Idealismus III: 36–51.

Articles on geometry[link]

• 1903: "Über die Grundlagen der Geometrie". II. Jahresbericht der deutschen Mathematiker-Vereinigung XII (1903), 368–375;
  • In English: "On the Foundations of Geometry".
• 1967: Kleine Schriften. (I. Angelelli, ed.) Wissenschaftliche Buchgesellschaft. Darmstadt, 1967 és G. Olms, Hildescheim, 1967. "Small Writings," a collection of most of his writings (e.g., the previous), posthumously published.

References[link]

Primary[link]

• Online bibliography of Frege's works and their English translations.
• 1879. Begriffsschrift, eine der arithmetischen nachgebildete Formelsprache des reinen Denkens. Halle a. S.: Louis Nebert. Translation: Concept Script, a formal language of pure thought modelled upon that of arithmetic, by S. Bauer-Mengelberg in Jean Van Heijenoort, ed., 1967. From Frege to Gödel: A Source Book in Mathematical Logic, 1879–1931. Harvard University Press.
• 1884. Die Grundlagen der Arithmetik: eine logisch-mathematische Untersuchung über den Begriff der Zahl. Breslau: W. Koebner. Translation: J. L. Austin, 1974. The Foundations of Arithmetic: A logico-mathematical enquiry into the concept of number, 2nd ed. Blackwell.
• 1891. "Funktion und Begriff." Translation: "Function and Concept" in Geach and Black (1980).
• 1892a. "Über Sinn und Bedeutung" in Zeitschrift für Philosophie und philosophische Kritik 100: 25-50. Translation: "On Sense and Reference" in Geach and Black (1980).
• 1892b. "Über Begriff und Gegenstand" in Vierteljahresschrift für wissenschaftliche Philosophie 16: 192-205. Translation: "Concept and Object" in Geach and Black (1980).
• 1893. Grundgesetze der Arithmetik, Band I. Jena: Verlag Hermann Pohle. Band II, 1903. Partial translation: Furth, M, 1964. The Basic Laws of Arithmetic. Univ. of California Press.
• 1904. "Was ist eine Funktion?" in Meyer, S., ed., 1904. Festschrift Ludwig Boltzmann gewidmet zum sechzigsten Geburtstage, 20. Februar 1904. Leipzig: Barth: 656-666. Translation: "What is a Function?" in Geach and Black (1980).
• 1918-1923. Peter Geach (editor): Logical Investigations, Blackwell's, 1975.
• 1924. Gottfried Gabriel, Wolfgang Kienzler (editors): Gottlob Freges politisches Tagebuch. In: Deutsche Zeitschrift für Philosophie, vol. 42, 1994, pp. 1057-98. Introduction by the editors on pp. 1057-66. This article has been translated into english, in: Inquiry, vol. 39, 1996, pp. 303–342.
• Peter Geach and Max Black, eds., and trans., 1980. Translations from the Philosophical Writings of Gottlob Frege, 3rd ed. Blackwell (1st ed. 1952).

Secondary[link]

Philosophy:

• Badiou, Alain. "On a Contemporary Usage of Frege", trans. Justin Clemens and Sam Gillespie. UMBR(a), no. 1, 2000, pp. 99–115.
• Baker, Gordon, and P.M.S. Hacker, 1984. Frege: Logical Excavations. Oxford University Press. — Vigorous, if controversial, criticism of both Frege's philosophy and influential contemporary interpretations such as Dummett's.
• Currie, Gregory, 1982. Frege: An Introduction to His Philosophy. Harvester Press.
• Diamond, Cora, 1991. The Realistic Spirit. MIT Press. — Primarily about Wittgenstein, but contains several articles on Frege.
• Dummett, Michael, 1973. Frege: Philosophy of Language. Harvard University Press.
• ------, 1981. The Interpretation of Frege's Philosophy. Harvard University Press.
• Hill, Claire Ortiz, 1991. Word and Object in Husserl, Frege and Russell: The Roots of Twentieth-Century Philosophy. Athens OH: Ohio University Press.
• ------, and Rosado Haddock, G. E., 2000. Husserl or Frege: Meaning, Objectivity, and Mathematics. Open Court. — On the Frege-Husserl-Cantor triangle.
• Kenny, Anthony, 1995. Frege — An introduction to the founder of modern analytic philosophy. Penguin Books. — Excellent non-technical introduction and overview of Frege's philosophy.
• Klemke, E.D., ed., 1968. Essays on Frege. University of Illinois Press. — 31 essays by philosophers, grouped under three headings: 1. Ontology; 2. Semantics; and 3. Logic and Philosophy of Mathematics.
• Rosado Haddock, Guillermo E., 2006. A Critical Introduction to the Philosophy of Gottlob Frege. Ashgate Publishing.
• Sisti, Nicola, 2005. Il Programma Logicista di Frege e il Tema delle Definizioni. Franco Angeli. — On Frege's theory of definitions.
• Sluga, Hans, 1980. Gottlob Frege. Routledge.
• Weiner, Joan, 1990. Frege in Perspective. Cornell University Press.

Logic and mathematics:

• Anderson, D. J., and Edward Zalta, 2004, "Frege, Boolos, and Logical Objects," Journal of Philosophical Logic 33: 1-26.
• Burgess, John, 2005. Fixing Frege. Princeton Univ. Press. — A critical survey of the ongoing rehabilitation of Frege's logicism.
• Boolos, George, 1998. Logic, Logic, and Logic. MIT Press. — 12 papers on Frege's theorem and the logicist approach to the foundation of arithmetic.
• Dummett, Michael, 1991. Frege: Philosophy of Mathematics. Harvard University Press.
• Demopoulos, William, ed., 1995. Frege's Philosophy of Mathematics. Harvard Univ. Press. — Papers exploring Frege's theorem and Frege's mathematical and intellectual background.
• Ferreira, F. and Wehmeier, K., 2002, "On the consistency of the Delta-1-1-CA fragment of Frege's Grundgesetze," Journal of Philosophic Logic 31: 301-11.
• Grattan-Guinness, Ivor, 2000. The Search for Mathematical Roots 1870–1940. Princeton University Press. — Fair to the mathematician, less so to the philosopher.
• Gillies, Donald A., 1982. Frege, Dedekind, and Peano on the foundations of arithmetic. Methodology and Science Foundation, 2. Van Gorcum & Co., Assen, 1982.
• Gillies, Donald: The Fregean revolution in logic. Revolutions in mathematics, 265–305, Oxford Sci. Publ., Oxford Univ. Press, New York, 1992.
• Charles Parsons, 1965, "Frege's Theory of Number." Reprinted with Postscript in Demopoulos (1965): 182-210. The starting point of the ongoing sympathetic reexamination of Frege's logicism.
• Gillies, Donald: The Fregean revolution in logic. Revolutions in mathematics, 265–305, Oxford Sci. Publ., Oxford Univ. Press, New York, 1992.
• Macbeth, Danielle, 2005, Frege's Logic. Harvard University Press.
• Wright, Crispin, 1983. Frege's Conception of Numbers as Objects. Aberdeen University Press. — A systematic exposition and a scope-restricted defense of Frege's Grundlagen conception of numbers.

External links[link]

Wikimedia Commons has media related to: Gottlob Frege

• Frege at Genealogy Project

Wikisource has original works written by or about: Gottlob Frege

	Philosophy portal
	Logic portal

• A comprehensive guide to Fregean material available on the web by Brian Carver.
• Stanford Encyclopedia of Philosophy:
  • "Gottlob Frege" — by Edward Zalta.
  • "Frege's Logic, Theorem, and Foundations for Arithmetic" — by Edward Zalta
• Internet Encyclopedia of Philosophy:
  • Gottlob Frege — by Kevin C. Klement.
  • Frege and Language — by Dorothea Lotter.
• Metaphysics Research Lab: Gottlob Frege.
• Frege on Being, Existence and Truth.
• O'Connor, John J.; Robertson, Edmund F., "Gottlob Frege", MacTutor History of Mathematics archive, University of St Andrews, http://www-history.mcs.st-andrews.ac.uk/Biographies/Frege.html .
• Begriff, a LaTeX package for typesetting Frege's logic notation.