In the philosophy of mathematics, intuitionism, or neointuitionism (opposed to preintuitionism), is an approach where

mathematics Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in modern mathematics ...

is considered to be purely the result of the constructive mental activity of humans rather than the discovery of fundamental principles claimed to exist in an objective reality. That is, logic and mathematics are not considered analytic activities wherein deep properties of objective reality are revealed and applied, but are instead considered the application of internally consistent methods used to realize more complex mental constructs, regardless of their possible independent existence in an objective reality.

Truth and proof

The fundamental distinguishing characteristic of intuitionism is its interpretation of what it means for a mathematical statement to be true. In Brouwer's original intuitionism, the truth of a mathematical statement is a subjective claim: a mathematical statement corresponds to a mental construction, and a mathematician can assert the truth of a statement only by verifying the validity of that construction by intuition. The vagueness of the intuitionistic notion of truth often leads to misinterpretations about its meaning. Kleene formally defined intuitionistic truth from a realist position, yet Brouwer would likely reject this formalization as meaningless, given his rejection of the realist/Platonist position. Intuitionistic truth therefore remains somewhat ill-defined. However, because the intuitionistic notion of truth is more restrictive than that of classical mathematics, the intuitionist must reject some assumptions of classical logic to ensure that everything they prove is in fact intuitionistically true. This gives rise to intuitionistic logic. To an intuitionist, the claim that an object with certain properties exists is a claim that an object with those properties can be constructed. Any mathematical object is considered to be a product of a construction of a

mind The mind is the set of faculties responsible for all mental phenomena. Often the term is also identified with the phenomena themselves. These faculties include thought, imagination, memory, will, and sensation. They are responsible for various m ...

, and therefore, the existence of an object is equivalent to the possibility of its construction. This contrasts with the classical approach, which states that the existence of an entity can be proved by refuting its non-existence. For the intuitionist, this is not valid; the refutation of the non-existence does not mean that it is possible to find a construction for the putative object, as is required in order to assert its existence. As such, intuitionism is a variety of mathematical constructivism; but it is not the only kind. The interpretation of

negation In logic, negation, also called the logical complement, is an operation that takes a proposition P to another proposition "not P", written \neg P, \mathord P or \overline. It is interpreted intuitively as being true when P is false, and false ...

is different in intuitionist logic than in classical logic. In classical logic, the negation of a statement asserts that the statement is ''false''; to an intuitionist, it means the statement is ''refutable''. There is thus an asymmetry between a positive and negative statement in intuitionism. If a statement ''P'' is provable, then ''P'' certainly cannot be refutable. But even if it can be shown that ''P'' cannot be refuted, this does not constitute a proof of ''P''. Thus ''P'' is a stronger statement than ''not-not-P''. Similarly, to assert that ''A'' or ''B'' holds, to an intuitionist, is to claim that either ''A'' or ''B'' can be ''proved''. In particular, the law of excluded middle, "''A'' or not ''A''", is not accepted as a valid principle. For example, if ''A'' is some mathematical statement that an intuitionist has not yet proved or disproved, then that intuitionist will not assert the truth of "''A'' or not ''A''". However, the intuitionist will accept that "''A'' and not ''A''" cannot be true. Thus the connectives "and" and "or" of intuitionistic logic do not satisfy de Morgan's laws as they do in classical logic. Intuitionistic logic substitutes constructability for abstract truth and is associated with a transition from the proof of

model theory In mathematical logic, model theory is the study of the relationship between formal theories (a collection of sentences in a formal language expressing statements about a mathematical structure), and their models (those structures in which the s ...

to abstract truth in modern mathematics. The logical calculus preserves justification, rather than truth, across transformations yielding derived propositions. It has been taken as giving philosophical support to several schools of philosophy, most notably the Anti-realism of Michael Dummett. Thus, contrary to the first impression its name might convey, and as realized in specific approaches and disciplines (e.g. Fuzzy Sets and Systems), intuitionist mathematics is more rigorous than conventionally founded mathematics, where, ironically, the foundational elements which Intuitionism attempts to construct/refute/refound are taken as intuitively given.

Infinity

Among the different formulations of intuitionism, there are several different positions on the meaning and reality of infinity. The term potential infinity refers to a mathematical procedure in which there is an unending series of steps. After each step has been completed, there is always another step to be performed. For example, consider the process of counting: The term actual infinity refers to a completed mathematical object which contains an infinite number of elements. An example is the set of natural numbers, In Cantor's formulation of set theory, there are many different infinite sets, some of which are larger than others. For example, the set of all real numbers is larger than , because any procedure that you attempt to use to put the natural numbers into one-to-one correspondence with the real numbers will always fail: there will always be an infinite number of real numbers "left over". Any infinite set that can be placed in one-to-one correspondence with the natural numbers is said to be "countable" or "denumerable". Infinite sets larger than this are said to be "uncountable". Cantor's set theory led to the axiomatic system of Zermelo–Fraenkel set theory (ZFC), now the most common foundation of modern mathematics. Intuitionism was created, in part, as a reaction to Cantor's set theory. Modern constructive set theory includes the axiom of infinity from ZFC (or a revised version of this axiom) and the set of natural numbers. Most modern constructive mathematicians accept the reality of countably infinite sets (however, see Alexander Esenin-Volpin for a counter-example). Brouwer rejected the concept of actual infinity, but admitted the idea of potential infinity. :"According to Weyl 1946, 'Brouwer made it clear, as I think beyond any doubt, that there is no evidence supporting the belief in the existential character of the totality of all natural numbers ... the sequence of numbers which grows beyond any stage already reached by passing to the next number, is a manifold of possibilities open towards infinity; it remains forever in the status of creation, but is not a closed realm of things existing in themselves. That we blindly converted one into the other is the true source of our difficulties, including the antinomies – a source of more fundamental nature than Russell's vicious circle principle indicated. Brouwer opened our eyes and made us see how far classical mathematics, nourished by a belief in the 'absolute' that transcends all human possibilities of realization, goes beyond such statements as can claim real meaning and truth founded on evidence." (Kleene (1952): ''Introduction to Metamathematics'', p. 48-49)

History

Intuitionism's history can be traced to two controversies in nineteenth century mathematics. The first of these was the invention of transfinite arithmetic by Georg Cantor and its subsequent rejection by a number of prominent mathematicians including most famously his teacher Leopold Kronecker—a confirmed

finitist Finitism is a philosophy of mathematics that accepts the existence only of finite mathematical objects. It is best understood in comparison to the mainstream philosophy of mathematics where infinite mathematical objects (e.g., infinite sets) are ac ...

. The second of these was Gottlob Frege's effort to reduce all of mathematics to a logical formulation via set theory and its derailing by a youthful Bertrand Russell, the discoverer of Russell's paradox. Frege had planned a three volume definitive work, but just as the second volume was going to press, Russell sent Frege a letter outlining his paradox, which demonstrated that one of Frege's rules of self-reference was self-contradictory. In an appendix to the second volume, Frege acknowledged that one of the axioms of his system did in fact lead to Russell's paradox. Frege, the story goes, plunged into depression and did not publish the third volume of his work as he had planned. For more see Davis (2000) Chapters 3 and 4: Frege: ''From Breakthrough to Despair'' and Cantor: ''Detour through Infinity.'' See van Heijenoort for the original works and van Heijenoort's commentary. These controversies are strongly linked as the logical methods used by Cantor in proving his results in transfinite arithmetic are essentially the same as those used by Russell in constructing his paradox. Hence how one chooses to resolve Russell's paradox has direct implications on the status accorded to Cantor's transfinite arithmetic. In the early twentieth century L. E. J. Brouwer represented the ''intuitionist'' position and

David Hilbert David Hilbert (; ; 23 January 1862 – 14 February 1943) was a German mathematician, one of the most influential mathematicians of the 19th and early 20th centuries. Hilbert discovered and developed a broad range of fundamental ideas in many a ...

the formalist position—see van Heijenoort.

Kurt Gödel Kurt Friedrich Gödel ( , ; April 28, 1906 – January 14, 1978) was a logician, mathematician, and philosopher. Considered along with Aristotle and Gottlob Frege to be one of the most significant logicians in history, Gödel had an imme ...

offered opinions referred to as ''Platonist'' (see various sources re Gödel). Alan Turing considers: "non-constructive

systems of logic A formal system is an abstract structure used for inferring theorems from axioms according to a set of rules. These rules, which are used for carrying out the inference of theorems from axioms, are the logical calculus of the formal system. A form ...

with which not all the steps in a proof are mechanical, some being intuitive". (Turing 1939, reprinted in Davis 2004, p. 210) Later, Stephen Cole Kleene brought forth a more rational consideration of intuitionism in his Introduction to Meta-mathematics (1952). Nicolas Gisin is adopting intuitionist mathematics to reinterpret quantum indeterminacy,

information theory Information theory is the scientific study of the quantification (science), quantification, computer data storage, storage, and telecommunication, communication of information. The field was originally established by the works of Harry Nyquist a ...

and the physics of time.

Contributors

Henri Poincaré Jules Henri Poincaré ( S: stress final syllable ; 29 April 1854 – 17 July 1912) was a French mathematician, theoretical physicist, engineer, and philosopher of science. He is often described as a polymath, and in mathematics as "The ...

( preintuitionism/ conventionalism) * L. E. J. Brouwer * Michael Dummett * Arend Heyting * Stephen Kleene

Branches of intuitionistic mathematics

* Intuitionistic logic *

Intuitionistic arithmetic In mathematical logic, Heyting arithmetic is an axiomatization of arithmetic in accordance with the philosophy of intuitionism.Troelstra 1973:18 It is named after Arend Heyting, who first proposed it. Axiomatization As with first-order Peano ar ...

* Intuitionistic type theory *

Intuitionistic set theory Constructive set theory is an approach to mathematical constructivism following the program of axiomatic set theory. The same first-order language with "=" and "\in" of classical set theory is usually used, so this is not to be confused with a con ...

* Intuitionistic analysis

References

,
Mathematics: A Concise history and Philosophy
', Springer-Verlag, New York, 1994. :In ''Chapter 39 Foundations'', with respect to the 20th century Anglin gives very precise, short descriptions of Platonism (with respect to Godel), Formalism (with respect to Hilbert), and Intuitionism (with respect to Brouwer). *

Martin Davis Martin Davis may refer to: * Martin Davis (Australian footballer) (born 1936), Australian rules footballer * Martin Davis (Jamaican footballer) (born 1996), Jamaican footballer * Martin Davis (mathematician) Martin David Davis (March 8, 1928 � ...

(ed.) (1965), ''The Undecidable'', Raven Press, Hewlett, NY. Compilation of original papers by Gödel, Church, Kleene, Turing, Rosser, and Post. Republished as * *

John W. Dawson John W. Dawson (October 21, 1820 – September 10, 1877) was Governor of Utah Territory in 1861. Born on October 21, 1820, in the pioneer settlement of Cambridge in Dearborn County, Indiana, he was a lawyer, a farmer and a newspaper editor ...

Jr., ''Logical Dilemmas: The Life and Work of

'', A. K. Peters, Wellesley, MA, 1997. :Less readable than Goldstein but, in ''Chapter III Excursis'', Dawson gives an excellent "A Capsule History of the Development of Logic to 1928". * Rebecca Goldstein, ''Incompleteness: The Proof and Paradox of Kurt Godel'', Atlas Books, W.W. Norton, New York, 2005. :In ''Chapter II Hilbert and the Formalists'' Goldstein gives further historical context. As a Platonist Gödel was reticent in the presence of the

logical positivism Logical positivism, later called logical empiricism, and both of which together are also known as neopositivism, is a movement in Western philosophy whose central thesis was the verification principle (also known as the verifiability criterion o ...

of the Vienna Circle. Goldstein discusses Wittgenstein's impact and the impact of the formalists. Goldstein notes that the intuitionists were even more opposed to Platonism than Formalism. * van Heijenoort, J., ''From Frege to Gödel, A Source Book in Mathematical Logic, 1879–1931'', Harvard University Press, Cambridge, MA, 1967. Reprinted with corrections, 1977. The following papers appear in van Heijenoort: :* L.E.J. Brouwer, 1923, ''On the significance of the principle of excluded middle in mathematics, especially in function theory'' eprinted with commentary, p. 334, van Heijenoort:* Andrei Nikolaevich Kolmogorov, 1925, ''On the principle of excluded middle'', eprinted with commentary, p. 414, van Heijenoort:* L.E.J. Brouwer, 1927, ''On the domains of definitions of functions'', eprinted with commentary, p. 446, van Heijenoort::Although not directly germane, in his (1923) Brouwer uses certain words defined in this paper. :* L.E.J. Brouwer, 1927(2), ''Intuitionistic reflections on formalism'', eprinted with commentary, p. 490, van Heijenoort:* Jacques Herbrand, (1931b), "On the consistency of arithmetic", eprinted with commentary, p. 618ff, van Heijenoort:: From van Heijenoort's commentary it is unclear whether or not Herbrand was a true "intuitionist"; Gödel (1963) asserted that indeed "...Herbrand was an intuitionist". But van Heijenoort says Herbrand's conception was "on the whole much closer to that of Hilbert's word 'finitary' ('finit') that to "intuitionistic" as applied to Brouwer's doctrine". * * Arend Heyting: * :In Chapter III ''A Critique of Mathematic Reasoning, §11. The paradoxes'', Kleene discusses Intuitionism and Formalism in depth. Throughout the rest of the book he treats, and compares, both Formalist (classical) and Intuitionist logics with an emphasis on the former. * Stephen Cole Kleene and

Richard Eugene Vesley Richard is a male given name. It originates, via Old French, from Old Frankish and is a compound of the words descending from Proto-Germanic ''*rīk-'' 'ruler, leader, king' and ''*hardu-'' 'strong, brave, hardy', and it therefore means 'strong ...

, ''The Foundations of Intuitionistic Mathematics'', North-Holland Publishing Co. Amsterdam, 1965. The lead sentence tells it all "The constructive tendency in mathematics...". A text for specialists, but written in Kleene's wonderfully-clear style. *

Hilary Putnam Hilary Whitehall Putnam (; July 31, 1926 – March 13, 2016) was an American philosopher, mathematician, and computer scientist, and a major figure in analytic philosophy in the second half of the 20th century. He made significant contributions ...

and Paul Benacerraf, ''Philosophy of Mathematics: Selected Readings'', Englewood Cliffs, N.J.: Prentice-Hall, 1964. 2nd ed., Cambridge: Cambridge University Press, 1983. : Part I. ''The foundation of mathematics'', ''Symposium on the foundations of mathematics'' :*

Rudolf Carnap Rudolf Carnap (; ; 18 May 1891 – 14 September 1970) was a German-language philosopher who was active in Europe before 1935 and in the United States thereafter. He was a major member of the Vienna Circle and an advocate of logical positivism. He ...

, ''The logicist foundations of mathematics'', p. 41 :* Arend Heyting, ''The intuitionist foundations of mathematics'', p. 52 :* Johann von Neumann, ''The formalist foundations of mathematics'', p. 61 :* Arend Heyting, ''Disputation'', p. 66 :* L. E. J. Brouwer, ''Intuitionnism and formalism'', p. 77 :* L. E. J. Brouwer, ''Consciousness, philosophy, and mathematics'', p. 90 * Constance Reid, ''Hilbert'', Copernicus – Springer-Verlag, 1st edition 1970, 2nd edition 1996. : Definitive biography of Hilbert places his "Program" in historical context together with the subsequent fighting, sometimes rancorous, between the Intuitionists and the Formalists. * Paul Rosenbloom, ''The Elements of Mathematical Logic'', Dover Publications Inc, Mineola, New York, 1950. : In a style more of Principia Mathematica – many symbols, some antique, some from German script. Very good discussions of intuitionism in the following locations: pages 51–58 in Section 4 Many Valued Logics, Modal Logics, Intuitionism; pages 69–73 Chapter III The Logic of Propostional Functions Section 1 Informal Introduction; and p. 146-151 Section 7 the Axiom of Choice. *

Jacques Hartong Ancient and noble French family names, Jacques, Jacq, or James are believed to originate from the Middle Ages in the historic northwest Brittany region in France, and have since spread around the world over the centuries. To date, there are over ...

and Georges Reeb
''Intuitionnisme 84''
(first published in ''La Mathématique Non-standard'', éditions du C.N.R.S.) : A reevaluation of intuitionism, from the point of view (among others) of constructive mathematics and non-standard analysis.

Secondary references

A. A. Markov Andrey Andreyevich Markov, first name also spelled "Andrei", in older works also spelled Markoff) (14 June 1856 – 20 July 1922) was a Russian mathematician best known for his work on stochastic processes. A primary subject of his research la ...

(1954) ''Theory of algorithms''. ranslated by Jacques J. Schorr-Kon and PST staffImprint Moscow, Academy of Sciences of the USSR, 1954 .e. Jerusalem, Israel Program for Scientific Translations, 1961; available from the Office of Technical Services, U.S. Dept. of Commerce, WashingtonDescription 444 p. 28 cm. Added t.p. in Russian Translation of Works of the Mathematical Institute, Academy of Sciences of the USSR, v. 42. Original title: Teoriya algorifmov. A248.M2943 Dartmouth College library. U.S. Dept. of Commerce, Office of Technical Services, number OTS 60–51085.:A secondary reference for specialists: Markov opined that "The entire significance for mathematics of rendering more precise the concept of algorithm emerges, however, in connection with the problem of ''a constructive foundation for mathematics''.... . 3, italics added.Markov believed that further applications of his work "merit a special book, which the author hopes to write in the future" (p. 3). Sadly, said work apparently never appeared. * {{Authority control Epistemology Constructivism (mathematics) Philosophy of mathematics de:Intuitionismus