Oskar Becker (5 September 1889 – 13 November 1964) was a

German German(s) may refer to: * Germany, the country of the Germans and German things **Germania (Roman era) * Germans, citizens of Germany, people of German ancestry, or native speakers of the German language ** For citizenship in Germany, see also Ge ...

philosopher Philosophy ('love of wisdom' in Ancient Greek) is a systematic study of general and fundamental questions concerning topics like existence, reason, knowledge, Value (ethics and social sciences), value, mind, and language. It is a rational an ...

logician Logic is the study of correct reasoning. It includes both formal and informal logic. Formal logic is the study of deductively valid inferences or logical truths. It examines how conclusions follow from premises based on the structure of arg ...

mathematician A mathematician is someone who uses an extensive knowledge of mathematics in their work, typically to solve mathematical problems. Mathematicians are concerned with numbers, data, quantity, mathematical structure, structure, space, Mathematica ...

, and

historian A historian is a person who studies and writes about the past and is regarded as an authority on it. Historians are concerned with the continuous, methodical narrative and research of past events as relating to the human species; as well as the ...

mathematics Mathematics is a field of study that discovers and organizes methods, Mathematical theory, theories and theorems that are developed and Mathematical proof, proved for the needs of empirical sciences and mathematics itself. There are many ar ...

Early life

Becker was born in

Leipzig Leipzig (, ; ; Upper Saxon: ; ) is the most populous city in the States of Germany, German state of Saxony. The city has a population of 628,718 inhabitants as of 2023. It is the List of cities in Germany by population, eighth-largest city in Ge ...

, where he studied mathematics. His dissertation under

Otto Hölder Ludwig Otto Hölder (December 22, 1859 – August 29, 1937) was a German mathematician born in Stuttgart. Early life and education Hölder was the youngest of three sons of professor Otto Hölder (1811–1890), and a grandson of professor Christ ...

and

Karl Rohn Karl Friedrich Wilhelm Rohn (25 January 1855 in Schwanheim – 4 August 1920 in Leipzig) was a German mathematician, who studied geometry. Life and work Rohn studied in Darmstadt, Leipzig and Munich, initially engineering but then mathematics ...

(1914) was ''On the Decomposition of Polygons in non-intersecting triangles on the Basis of the Axioms of Connection and Order.'' He served in

World War I World War I or the First World War (28 July 1914 – 11 November 1918), also known as the Great War, was a World war, global conflict between two coalitions: the Allies of World War I, Allies (or Entente) and the Central Powers. Fighting to ...

and returned to study philosophy with

Edmund Husserl Edmund Gustav Albrecht Husserl (; 8 April 1859 – 27 April 1938) was an Austrian-German philosopher and mathematician who established the school of Phenomenology (philosophy), phenomenology. In his early work, he elaborated critiques of histori ...

, writing his ''

Habilitationsschrift Habilitation is the highest university degree, or the procedure by which it is achieved, in Germany, France, Italy, Poland and some other European and non-English-speaking countries. The candidate fulfills a university's set criteria of excelle ...

'' on ''Investigations of the Phenomenological Foundations of Geometry and their Physical Applications'', (1923). Becker was Husserl's assistant, informally, and then official editor of the ''Yearbook for Phenomenological Research''.

Work in phenomenology and mathematical philosophy

Becker published his major work, ''Mathematical Existence'' in the ''Yearbook'' in 1927, the same year

Martin Heidegger Martin Heidegger (; 26 September 1889 – 26 May 1976) was a German philosopher known for contributions to Phenomenology (philosophy), phenomenology, hermeneutics, and existentialism. His work covers a range of topics including metaphysics, art ...

's ''

Being and Time ''Being and Time'' () is the 1927 ''magnum opus'' of German philosopher Martin Heidegger and a key document of existentialism. ''Being and Time'' had a notable impact on subsequent philosophy, literary theory and many other fields. Though controv ...

'' appeared there. Becker attended Heidegger's

seminar A seminar is a form of academic instruction, either at an academic institution or offered by a commercial or professional organization. It has the function of bringing together small groups for recurring meetings, focusing each time on some part ...

s at this period. Becker utilized not only Husserlian phenomenology but, much more controversially, Heideggerian

hermeneutics Hermeneutics () is the theory and methodology of interpretation, especially the interpretation of biblical texts, wisdom literature, and philosophical texts. As necessary, hermeneutics may include the art of understanding and communication. ...

, discussing

arithmetic Arithmetic is an elementary branch of mathematics that deals with numerical operations like addition, subtraction, multiplication, and division. In a wider sense, it also includes exponentiation, extraction of roots, and taking logarithms. ...

counting Counting is the process of determining the number of elements of a finite set of objects; that is, determining the size of a set. The traditional way of counting consists of continually increasing a (mental or spoken) counter by a unit for ever ...

as "being toward death". His work was criticized both by

neo-Kantian In late modern philosophy, neo-Kantianism () was a revival of the 18th-century philosophy of Immanuel Kant. The neo-Kantians sought to develop and clarify Kant's theories, particularly his concept of the thing-in-itself and his moral philosophy ...

s and by more mainstream, rationalist logicians, to whom Becker feistily replied. This work has not had great influence on later debates in the

foundations of mathematics Foundations of mathematics are the mathematical logic, logical and mathematics, mathematical framework that allows the development of mathematics without generating consistency, self-contradictory theories, and to have reliable concepts of theo ...

, despite its many interesting analyses of the topic of its title. Becker debated with

David Hilbert David Hilbert (; ; 23 January 1862 – 14 February 1943) was a German mathematician and philosopher of mathematics and one of the most influential mathematicians of his time. Hilbert discovered and developed a broad range of fundamental idea ...

and

Paul Bernays Paul Isaac Bernays ( ; ; 17 October 1888 – 18 September 1977) was a Swiss mathematician who made significant contributions to mathematical logic, axiomatic set theory, and the philosophy of mathematics. He was an assistant and close collaborator ...

over the role of the potential infinite in Hilbert's formalist

metamathematics Metamathematics is the study of mathematics itself using mathematical methods. This study produces metatheory, metatheories, which are Mathematical theory, mathematical theories about other mathematical theories. Emphasis on metamathematics (and ...

. Becker argued that Hilbert could not stick with

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

, but had to assume the potential infinite. Clearly enough, Hilbert and Bernays do implicitly accept the potential infinite, but they claim that each induction in their proofs is finite. Becker was correct that

complete induction Mathematical induction is a method for proving that a statement P(n) is true for every natural number n, that is, that the infinitely many cases P(0), P(1), P(2), P(3), \dots all hold. This is done by first proving a simple case, then ...

was needed for assertions of consistency in the form of

universally quantified In mathematical logic, a universal quantification is a type of quantifier, a logical constant which is interpreted as "given any", "for all", "for every", or "given an arbitrary element". It expresses that a predicate can be satisfied by ev ...

sentences, as opposed to claiming that a predicate holds for each individual natural number.

''Paraontologie''

In discussing Heidegger, Becker introduced the German neologism ''Paraontologie''. Although fundamentally different this usage has provided some minor influences in the term "paraontology" in English made more recently by

Nahum Chandler Nahum ( or ; ''Naḥūm'') was a minor prophet whose prophecy is recorded in the ''Tanakh'', also called the Hebrew Bible and the Old Testament. His book comes in chronological order between Micah and Habakkuk in the Bible. He wrote about the e ...

Fred Moten Fred Moten (born 1962) is an American Culture theory, cultural theorist, poet, and scholar whose work explores critical theory, black studies, and performance studies. Moten is Professor of Performance Studies at New York University and Distingui ...

, and others, in discussing blackness.

Intuitionistic and modal logic

Becker made a start toward the formalization of

L. E. J. Brouwer Luitzen Egbertus Jan "Bertus" Brouwer (27 February 1881 – 2 December 1966) was a Dutch mathematician and philosopher who worked in topology, set theory, measure theory and complex analysis. Regarded as one of the greatest mathematicians of the ...

intuitionistic logic Intuitionistic logic, sometimes more generally called constructive logic, refers to systems of symbolic logic that differ from the systems used for classical logic by more closely mirroring the notion of constructive proof. In particular, systems ...

. He developed a semantics of intuitionistic logic based on Husserl's phenomenology, and this semantics was used by

Arend Heyting __NOTOC__ Arend Heyting (; 9 May 1898 – 9 July 1980) was a Dutch mathematician and logician. Biography Heyting was a student of Luitzen Egbertus Jan Brouwer at the University of Amsterdam, and did much to put intuitionistic logic on a foo ...

in his own formalization. Becker struggled, somewhat unsuccessfully, with the formulation of the rejection of

excluded middle In logic, the law of excluded middle or the principle of excluded middle states that for every proposition, either this proposition or its negation is true. It is one of the three laws of thought, along with the law of noncontradiction and th ...

appropriate for intuitionistic logic. Becker failed in the end to correctly distinguish classical and

intuitionistic negation In the philosophy of mathematics, intuitionism, or neointuitionism (opposed to preintuitionism), is an approach where mathematics is considered to be purely the result of the constructive mental activity of humans rather than the discovery of fu ...

, but he made a start. In an appendix to his book on mathematical existence, Becker set the problem of finding a formal calculus for intuitionistic logic. In a series of works in the early 1950s he surveyed modal, intuitionistic, probabilistic, and other philosophical logics. Becker made contributions to

modal logic Modal logic is a kind of logic used to represent statements about Modality (natural language), necessity and possibility. In philosophy and related fields it is used as a tool for understanding concepts such as knowledge, obligation, and causality ...

(the logic of necessity and

possibility Possibility is the condition or fact of being possible. Latin origins of the word hint at ability. Possibility may refer to: * Probability, the measure of the likelihood that an event will occur * Epistemic possibility, a topic in philosophy ...

) and '' Becker’s postulate'', the claim that modal status is necessary (for instance that the possibility of ''P'' implies the necessity of the possibility of ''P'', and also the iteration of necessity) is named for him. Becker's Postulate later played a role in the formalization given, by

Charles Hartshorne Charles Hartshorne (; June 5, 1897 – October 9, 2000) was an American philosopher who concentrated primarily on the philosophy of religion and metaphysics, but also contributed to ornithology. He developed the neoclassical idea of God and ...

, the American process theologian, of the Ontological Proof of God's existence, stimulated by conversations with the

logical positivist Logical positivism, also known as logical empiricism or neo-positivism, was a philosophical movement, in the empiricist tradition, that sought to formulate a scientific philosophy in which philosophical discourse would be, in the perception of ...

and opponent of the alleged proof,

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. ...

History of mathematics

Becker also made important contributions to the history and interpretation of

ancient Greek mathematics Ancient Greek mathematics refers to the history of mathematical ideas and texts in Ancient Greece during classical and late antiquity, mostly from the 5th century BC to the 6th century AD. Greek mathematicians lived in cities spread around the s ...

. Becker, as did several others, emphasized the "crisis" in Greek mathematics occasioned by the discovery of incommensurability of the side of the

pentagon In geometry, a pentagon () is any five-sided polygon or 5-gon. The sum of the internal angles in a simple polygon, simple pentagon is 540°. A pentagon may be simple or list of self-intersecting polygons, self-intersecting. A self-intersecting ...

(or in the later, simpler proofs, the triangle) by

Hippasus of Metapontum Hippasus of Metapontum (; , ''Híppasos''; c. 530 – c. 450 BC) was a Greeks, Greek philosopher and early follower of Pythagoras. Little is known about his life or his beliefs, but he is sometimes credited with the discovery of the existence of ...

, and the threat of (literally) "irrational" numbers. To German theorists of the "crisis", the Pythagorean diagonal of the square was similar in its impact to Cantor's diagonalization method of generating higher order infinities, and Gödel's diagonalization method in Gödel's proof of incompleteness of formalized arithmetic. Becker, like several earlier historians, suggests that the avoidance of arithmetic statement of geometrical magnitude in

Euclid Euclid (; ; BC) was an ancient Greek mathematician active as a geometer and logician. Considered the "father of geometry", he is chiefly known for the '' Elements'' treatise, which established the foundations of geometry that largely domina ...

is avoided for

ratio In mathematics, a ratio () shows how many times one number contains another. For example, if there are eight oranges and six lemons in a bowl of fruit, then the ratio of oranges to lemons is eight to six (that is, 8:6, which is equivalent to the ...

s and proportions, as a consequence of recoil from the shock of incommensurability. Becker also showed that all the theorems of Euclidean proportion theory could be proved using an earlier alternative to the Eudoxus technique which Becker found stated in '' Aristotle's Topics'', and which Becker attributes to Theaetetus. Becker also showed how a constructive logic that denied unrestricted excluded middle could be used to reconstruct most of Euclid's proofs. More recent revisionist commentators such as Wilbur Knorr and David Fowler have accused historians of early Greek mathematics writing in the early twentieth century, such as Becker, of reading the crisis of their own times illegitimately into the early Greek period. (This “crisis” may include both the crisis of twentieth century set theory and foundations of mathematics, and the general crisis of World War I, the overthrow of the Kaiser, communist uprisings, and the Weimar Republic.)

Later thought

At the end of his life Becker re-emphasized the distinction between intuition of the formal and Platonic realm as opposed to the concrete existential realm, moved to the terminology, at least, of

divination Divination () is the attempt to gain insight into a question or situation by way of an occultic ritual or practice. Using various methods throughout history, diviners ascertain their interpretations of how a should proceed by reading signs, ...

. In his ''Dasein und Dawesen'' Becker advocated what he called a "mantic" divination. Hermeneutics of the Heideggerian sort is applicable to individual lived existence, but "mantic" decipherment is necessary not only in mathematics, but in

aesthetics Aesthetics (also spelled esthetics) is the branch of philosophy concerned with the nature of beauty and taste (sociology), taste, which in a broad sense incorporates the philosophy of art.Slater, B. H.Aesthetics ''Internet Encyclopedia of Ph ...

, and the investigation of the

unconscious Unconscious may refer to: Physiology * Unconsciousness, the lack of consciousness or responsiveness to people and other environmental stimuli Psychology * Unconscious mind, the mind operating well outside the attention of the conscious mind a ...

. These realms deal with the eternal and structural, such as the symmetries of nature, and are properly investigated by a mantic phenomenology, not an hermeneutic one. (Becker's emphasis on the timelessness and formal nature of the unconscious has some parallels with the account of

Jacques Lacan Jacques Marie Émile Lacan (, ; ; 13 April 1901 – 9 September 1981) was a French psychoanalyst and psychiatrist. Described as "the most controversial psycho-analyst since Sigmund Freud, Freud", Lacan gave The Seminars of Jacques Lacan, year ...

Contacts and correspondence

Becker carried on an extensive correspondence with some of the greatest mathematicians and philosophers of the day. These included Ackermann, Adolf Fraenkel (later Abraham),

John von Neumann John von Neumann ( ; ; December 28, 1903 – February 8, 1957) was a Hungarian and American mathematician, physicist, computer scientist and engineer. Von Neumann had perhaps the widest coverage of any mathematician of his time, in ...

Hermann Weyl Hermann Klaus Hugo Weyl (; ; 9 November 1885 – 8 December 1955) was a German mathematician, theoretical physicist, logician and philosopher. Although much of his working life was spent in Zürich, Switzerland, and then Princeton, New Jersey, ...

, and

Ernst Zermelo Ernst Friedrich Ferdinand Zermelo (; ; 27 July 187121 May 1953) was a German logician and mathematician, whose work has major implications for the foundations of mathematics. He is known for his role in developing Zermelo–Fraenkel set theory, Z ...

among mathematicians, as well as

Hans Reichenbach Hans Reichenbach (; ; September 26, 1891 – April 9, 1953) was a leading philosopher of science, educator, and proponent of logical empiricism. He was influential in the areas of science, education, and of logical empiricism. He founded the ''G ...

and

Felix Kaufmann Felix Kaufmann (4 July 1895, Vienna – 23 December 1949, New York) was an Austrian-American philosopher of law. Biography Kaufmann studied jurisprudence and philosophy in Vienna. He became part of the legal-philosophical school of Hans Kelse ...

among philosophers. The letters that Becker received from these major figures of twentieth century mathematics and leading logical positivist philosophers, as well as Becker’s own copies of his letters to them, were destroyed during World War II. Becker's correspondence with Weyl has been reconstructed (see bibliography), as Weyl's copies of Becker’s letters to him are preserved, and Becker often extensively quotes or paraphrases Weyl’s own letters. Perhaps the same can be done with some other parts of this valuable but lost correspondence. Weyl entered into correspondence with Becker with high hopes and expectations, given their mutual admiration for Husserl’s phenomenology and Husserl’s great admiration for the work of Becker. However, Weyl, whose sympathies were with constructivism and intuitionism, lost patience when he argued with Becker about a purported intuition of the infinite defended by Becker. Weyl concluded, sourly, that Becker would discredit phenomenological approaches to mathematics if he persisted in this position.

Nazism and neglect

It is possible that regard for Becker's earlier work suffered from his later

Nazi Nazism (), formally named National Socialism (NS; , ), is the far-right politics, far-right Totalitarianism, totalitarian socio-political ideology and practices associated with Adolf Hitler and the Nazi Party (NSDAP) in Germany. During H ...

allegiances, leading to lack of reference or published commentary by émigré logicians and mathematicians who had fled Hitlerism. His lecture on "The Vacuity of Art and the Daring of the Artist," presents a "Nordic Metaphysics" in fairly standard Nazi style. According to Oskar Becker, the "''rhythm of Nietzsche's Dionysian-Dithyrambs was identical to the

Will to power The will to power () is a concept in the philosophy of Friedrich Nietzsche. The will to power describes what Nietzsche may have believed to be the main driving force in humans. However, the concept was never systematically defined in Nietzsche's ...

and physically in the sense of youth identical to the marching rhythm of the SA''". Oskar Becker was classified from an SS-point of view in the following way in the "''SD-Dossiers über Philosophie-Professoren"'' (i.e. SD-files concerning philosophy professors) that were set up by the SS Security Service (SD): "not a party member but loyal to National Socialism, tries to consolidate the National Socialistic ideology".Georg Leaman, Gerd Simon: Deutsche Philosophen aus der Sicht des Sicherheitsdienstes des Reichsführers SS. Jahrbuch für Soziologie-Geschichte 1992. Original SD-file text: "kein Pg aber loyal zum NS, bemüht, die n-s. Weltanschauung zu vertiefen". Two able philosophers who were students of Becker,

Jürgen Habermas Jürgen Habermas ( , ; ; born 18 June 1929) is a German philosopher and social theorist in the tradition of critical theory and pragmatism. His work addresses communicative rationality and the public sphere. Associated with the Frankfurt S ...

and

Hans Sluga Hans D. Sluga (; born 24 April 1937) is a German philosopher who spent most of his career as professor of philosophy at the University of California, Berkeley. Sluga teaches and writes on topics in the history of analytic philosophy, the history ...

, later grappled with the issue of the influence of Nazism on German academia. The application of Heidegger's ideas to theoretical science (let alone mathematics) has only recently become widespread, particularly in the

English-speaking world The English-speaking world comprises the 88 countries and territories in which English language, English is an official, administrative, or cultural language. In the early 2000s, between one and two billion people spoke English, making it the ...

. Furthermore, Becker's polemical replies probably alienated his critics still further. He died, aged 75, in

Bonn Bonn () is a federal city in the German state of North Rhine-Westphalia, located on the banks of the Rhine. With a population exceeding 300,000, it lies about south-southeast of Cologne, in the southernmost part of the Rhine-Ruhr region. This ...

Bibliography

Becker's works

*Über die Zerlegung eines Polygons in exclusive Dreiecke auf Grund der ebenen Axiome der Verknuepfung und Anordnung (Leipzig, 1914) *"Contributions Toward a Phenomenological Foundation of Geometry and Its Physical Applications," from ''Beiträge zur phänomenologischen Begründung der Geometrie und ihre physikalischen Anwendungen'' (''Jahrbuch für Philosophie und phänomenologische Forschung'' IV 1923, 493–560). Selections trans. by Theodore Kisiel, in ''Phenomenology and the Natural Sciences'', ed. Joseph Kockelmans and Theordore J. Kisiel, Evanston IL: Northwestern University Press, 1970, 119–143. *''Mathematische Existenz. Untersuchungen zur Logik und Ontologie mathematischer Phänomene'' (''Jahrbuch für Philosophie und phänomenologische Forschung'', Vol. VIII, 1927, 440–809. *"The Philosophy of Edmund Husserl," transl. R. O. Elverton, in ''The Phenomenology of Husserl'', ed. R. O. Elverton, Quadrangle Books, Chicago: 1970, 40–72, originally "Die Philosophie Edmund Husserls. Anlässlich seines 70. Geburtstags dargestellt" in ''Kantstudien'' vol. 35, 1930, 119–150. *“Eudoxus-Studien: I: Eine voreudoxische Proportionenlehre und ihre Spuren bei Aristoteles und Euklid,” ''Quellen und Studien zur Geschichte der Mathematik, Astronomie und Physik'' B. II (1933), 311–330. [reprinted in Jean Christianidis, ed. ''Classics in the history of Greek Mathematics'', Boston Studies in the Philosophie of Science, vol. 240, Dordrecht/Boston: 2004, 191–209, with intro. by Ken Saito, 188–9.] “II: Warum haben die Griechen die Existenz der vierten Proportionale angenommen,” 369–387, “III: Spuren eines Stetigkeitsaxioms in der Art des Dedekindschen zur Zeir des Eudoxos,” vol. 3 (1936) 236–244, “IV: Das Prinzip des ausgeschlossenen Dritten in der griechischen Mathematik,” 370–388, “V: Die eudoxische Lehre von den Ideen und den Farben, 3 (1936) 389–410. *"Zur Logik der Modalitäten", in: ''Jahrbuch für Philosophie und phänomenologische Forschung'', Bd. XI (1930), pp. 497–548 *''Grundlagen der Mathematik in geschichtlicher Entwicklung'', Freiburg/München: Alber, 1954 (2. Aufl. 1964; diese Aufl. ist auch text- und seitenidentisch erschienen als Suhrkamp Taschenbuch Wissenschaft 114. Frankfurt a. M. : Suhrkamp, 1975) *Dasein und Dawesen (1964) *Letters to Hermann Weyl, in Paolo Mancosu and T. A. Ryckman, “Mathematics and Phenomenology: The Correspondence between O. Becker and H. Weyl,” ''Philosophia Mathematica'', 3d Series, vol. 10 (2002) 174–194.

Secondary sources

* Annemarie Gethmann-Siefert,

Jürgen Mittelstraß Jürgen Mittelstraß (born 11 October 1936 in Düsseldorf) is a German philosopher especially interested in the philosophy of science. Career Mittelstraß studied philosophy, history and protestant theology at the universities of Bonn, Erlangen, ...

(eds): ''Die Philosophie und die Wissenschaften. Zum Werk Oskar Beckers'' (Philosophy and the Sciences: On the Work of Oskar Becker), Munich, Fink, 200

*Wilbur R. Knorr, “Transcript of a Lecture Delivered at the Annual Convention of the History of Science Society, Atlanta, Dec. 28, 1975” in Jean Christianidis, ed. ''Classics in the history of Greek Mathematics'', Boston Studies in the Philosophie of Science, vol. 240, Dordrecht/Boston: 2004, 245–253, esp. 249–252. *Joseph Kockelmans and Theordore J. Kisiel, intro. to transl. of Becker, in ''Phenomenology and the Natural Sciences'', Evanston IL: Northwestern University Press, 1970, 117–118. *Paolo Mancosu and T. A. Ryckman, “Mathematics and Phenomenology: The Correspondence between O. Becker and H. Weyl,” ''Philosophia Mathematica'', 3d Series, vol. 10 (2002) 130–173, bibliography 195–202. * Paolo Mancosu, ed. ''From Brouwer to Hilbert, ''Oxford University Press, 1998, 165–167 (on Hilbert's formalism), 277–282 (on intuitionistic logic). *Zimny, L., “Oskar Becker Bibliographie,” ''Kantstudien'' 60 319–330.

References

{{DEFAULTSORT:Becker, Oscar 1889 births 1964 deaths 20th-century German philosophers Phenomenologists German historians of mathematics Writers from Leipzig German male writers