Editing Gottlob Frege

{{short description|German philosopher, logician, and mathematician (1848–1925)}}
{{redirect|Frege|other people with the surname|Frege (surname)}}
{{distinguish|Gottlob Frick}}
{{use dmy dates|date=December 2021}}
{{Infobox philosopher
| region = [[Western philosophy]]
| era = [[19th-century philosophy]]<br />[[20th-century philosophy]]
| image = Young frege.jpg
| caption = Frege in c. 1879
| name = Gottlob Frege
| birth_date  = 8 November 1848
| birth_place = [[Wismar]], [[Grand Duchy of Mecklenburg-Schwerin]], [[German Confederation]]
| death_date  = {{Death date and age|df=yes|1925|7|26|1848|11|8}}
| death_place = [[Bad Kleinen]], [[Free State of Mecklenburg-Schwerin]], [[Weimar Republic|German Reich]]
| education   = [[University of Göttingen]] ([[PhD]], 1873)<br />[[University of Jena]] ([[Dr. phil. hab.]], 1874)
| institutions= [[University of Jena]]
| school_tradition = [[Analytic philosophy]]<br />[[Linguistic turn]]<br />[[Logical realism]]<br />[[Modern Platonism]]<ref name=SEP-P>{{Cite book|url=https://plato.stanford.edu/archives/spr2016/entries/platonism/|title=Platonism in Metaphysics|first=Mark|last=Balaguer|editor-first=Edward N.|editor-last=Zalta|date=25 July 2016|publisher=Metaphysics Research Lab, Stanford University|via=Stanford Encyclopedia of Philosophy}}</ref><br />[[Logicism]]<br />[[Transcendental idealism]]<ref>[[Hans Sluga]], "[https://aap.tandfonline.com/doi/abs/10.1080/00201747708601832 Frege's alleged realism]," ''Inquiry'' 20 (1–4):227–242 (1977).</ref><ref name="Resnik">[[Michael Resnik]], [https://www.tandfonline.com/doi/abs/10.1080/00201747908601884?journalCode=sinq20 II. Frege as Idealist and then Realist]," ''Inquiry'' 22 (1–4):350–357 (1979).</ref> (before 1891)<br />[[Metaphysical realism]]<ref name="Resnik" /> (after 1891)<br />[[Foundationalism]]<ref>[[Tom Rockmore]], ''On Foundationalism: A Strategy for Metaphysical Realism'', Rowman & Littlefield, 2004, p. 111.</ref><br />[[Indirect realism]]<ref>Frege criticized [[direct realism]] in his "[[On Sense and Reference|Über Sinn und Bedeutung]]" (see Samuel Lebens, ''Bertrand Russell and the Nature of Propositions: A History and Defence of the Multiple Relation Theory of Judgement'', Routledge, 2017, p. 34).</ref><br />[[Redundancy theory of truth]]<ref name=IEP-T>[http://www.iep.utm.edu/truth/#SH7a Truth – Internet Encyclopedia of Philosophy]; [http://plato.stanford.edu/entries/truth-deflationary/#HisDef The Deflationary Theory of Truth (Stanford Encyclopedia of Philosophy)].</ref>
| main_interests   = [[Philosophy of mathematics]], [[mathematical logic]], [[philosophy of language]]
| notable_ideas    = {{collapsible list|[[Analytic philosophy]]|[[Ancestral relation]]|[[Anti-psychologism]]|[[Frege%27s_theorem#Overview|Basic law V]]|[[Concept and object]]|[[Context principle]]|[[Currying]]|[[Descriptivist theory of names]]|[[Frege's principle]]|[[Frege's puzzles]]|[[Frege's theorem]]|[[Definite_description#Fregean_analysis|Fregean analysis]]|[[Frege–Church ontology]]|[[Expressivism#The_Frege–Geach_problem|Frege–Geach problem]]|[[Classical logic|Frege–Russell logic]]|[[Function and Concept]]|[[Law of trichotomy]]|[[Logicism]]|[[Hume's principle]]|[[Mediated reference theory]]|[[Naive set theory]]|[[Named set theory]]|[[Predicate calculus]]|[[Propositional calculus]]|[[Principle of compositionality]]|[[Quantification theory]]|[[Redundancy theory of truth]]|[[Nonexistent_objects#Round_square_copula|Round square copula]]|[[Second-order logic]]|[[Sense and reference]]|[[Set-theoretic definition of natural numbers]]|[[Sortal]]|[[Thought (essay)|Third realm]]
|title={{nbsp}}
}}
|notable_works = ''[[Begriffsschrift]]'' (1879)<br />''[[The Foundations of Arithmetic]]'' (1884)<br />''Basic Laws of Arithmetic'' (1893–1903)
|thesis1_title = On a Geometrical Representation of Imaginary Forms in a Plane
|thesis1_url   = http://reader.digitale-sammlungen.de/de/fs1/object/goToPage/bsb11160343.html?pageNo=2
|thesis1_year  = 1873
|thesis2_title = Methods of Calculation based on an Extension of the Concept of Magnitude
|thesis2_url   = https://www.worldcat.org/title/rechnungsmethoden-die-sich-auf-eine-erweiterung-des-groenbegriffes-grunden/oclc/314507606
|thesis2_year  = 1874
|doctoral_advisor  = [[Ernst Christian Julius Schering]] (PhD advisor)
|academic_advisors = [[Alfred Clebsch|Rudolf Friedrich Alfred Clebsch]]
|notable_students = [[Rudolf Carnap]]
}}
'''Friedrich Ludwig Gottlob Frege''' ({{IPAc-en|ˈ|f|r|eɪ|g|ə}};<ref>[http://dictionary.reference.com/browse/frege "Frege"]. ''[[Random House Webster's Unabridged Dictionary]]''.</ref> {{IPA|de|ˈɡɔtloːp ˈfreːɡə|lang}}; 8 November 1848 – 26 July 1925) was a German philosopher, logician, and mathematician. He was a mathematics professor at the [[University of Jena]], and is understood by many to be the father of [[analytic philosophy]], concentrating on the [[philosophy of language]], [[philosophy of logic|logic]], and [[Philosophy of mathematics|mathematics]]. Though he was largely ignored during his lifetime, [[Giuseppe Peano]] (1858–1932), [[Bertrand Russell]] (1872–1970), and, to some extent, [[Ludwig Wittgenstein]] (1889–1951) introduced his work to later generations of philosophers. Frege is widely considered to be the greatest logician since [[Aristotle]], and one of the most profound philosophers of mathematics ever.<ref>{{cite encyclopedia
  |first=Kai F.
  |last=Wehmeier
  |author-link=Kai Wehmeier
  | editor-last = Borchert
  | editor-first = Donald M.
  | encyclopedia = [[Encyclopedia of Philosophy]]
  | title = Frege, Gottlob
  | edition = 2
  | date = 2006
  | publisher = [[Macmillan Reference USA]]
  | volume = 3
  | isbn = 0-02-866072-2
}}</ref>

His contributions include the [[History of logic#Rise of modern logic|development of modern logic]] in the ''[[Begriffsschrift]]'' and work in the [[foundations of mathematics]]. His book the ''[[Foundations of Arithmetic]]'' is the seminal text of the [[logicist]] project, and is cited by [[Michael Dummett]] as where to pinpoint the [[linguistic turn]]. His philosophical papers "[[On Sense and Reference]]" and "[[The Thought]]" are also widely cited. The former argues for two different types of [[Meaning (philosophy of language)|meaning]] and [[Descriptivist theory of names|descriptivism]]. In ''Foundations'' and "The Thought", Frege argues for [[Platonism]] against [[psychologism]] or [[Formalism (philosophy of mathematics)|formalism]], concerning [[number]]s and [[proposition]]s respectively. 

== Life ==

=== Childhood (1848–69) ===
Frege was born in 1848 in [[Wismar]], [[Grand Duchy of Mecklenburg-Schwerin|Mecklenburg-Schwerin]] (today part of [[Mecklenburg-Vorpommern]] in northern Germany). His father, Carl (Karl) Alexander Frege (1809–1866), 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); her mother was Auguste Amalia Maria Ballhorn, a descendant of [[Philipp Melanchthon]]<ref>Lothar Kreiser, ''Gottlob Frege: Leben – Werk – Zeit'', Felix Meiner Verlag, 2013, p. 11.</ref> and her father was Johann Heinrich Siegfried Bialloblotzky, a descendant of a [[Polish people|Polish]] noble family who left Poland in the 17th century.<ref>Arndt Richter, [http://www.genetalogie.de/gg/alfrege.pdf "Ahnenliste des Mathematikers Gottlob Frege, 1848–1925"]</ref> Frege was a Lutheran.<ref>{{Cite book |last=Jacquette |first=Dale |url=https://books.google.com/books?id=hwiKDwAAQBAJ&dq=gottlob+frege+lutheran&pg=PA73 |title=Frege: A Philosophical Biography |date=4 April 2019 |publisher=Cambridge University Press |isbn=9780521863278}}</ref>

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) (Help book for teaching German to children from 9 to 13 years old), the first section of which dealt with the structure and [[logic]] of [[language]].

Frege studied at {{Interlanguage link multi|Große Stadtschule Wismar|de}} and graduated in 1869.<ref name=":0">Jacquette, Dale ''Frege: A Philosophical Biography'', Cambridge University Press, 2019, p. xiii.</ref> Teacher of mathematics and natural science Gustav Adolf Leo Sachse (1843–1909), who was also a poet, played an important role in determining Frege's future scientific career, encouraging him to continue his studies at his own [[alma mater]] the [[University of Jena]].<ref>{{Cite book |last=Jacquette |first=Dale |author-link=Dale Jacquette |url=https://www.cambridge.org/core/product/identifier/9781139033725/type/book |title=Frege: A Philosophical Biography |date=2019-04-04 |publisher=Cambridge University Press |isbn=978-1-139-03372-5 |edition=1 |pages=37, 42 |chapter=2 - Education through University Days (1854–1874) |doi=10.1017/9781139033725.005 |quote=}}</ref>

=== Studies at University (1869–74) ===
Frege matriculated at the University of Jena in the spring of 1869 as a citizen of the [[North German Confederation]]. 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.{{cn|date=June 2024}}

His other notable university teachers were Christian Philipp Karl Snell (1806–86; subjects: use of infinitesimal analysis in geometry, [[analytic geometry]] of [[plane (geometry)|planes]], analytical mechanics, optics, physical foundations of mechanics); [[Hermann Schaeffer|Hermann Karl Julius Traugott Schaeffer]] (1824–1900; analytic geometry, applied physics, algebraic analysis, on the telegraph and other [[electronics|electronic machines]]); and the philosopher [[Kuno Fischer]] (1824–1907; [[Kantianism|Kantian]] and [[critical philosophy]]).{{cn|date=June 2024}}

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|Rudolf Friedrich Alfred Clebsch]] (1833–72; analytic geometry), [[Ernst Christian Julius Schering]] (1824–97; function theory), [[Wilhelm Eduard Weber]] (1804–91; physical studies, applied physics), Eduard Riecke (1845–1915; theory of electricity), and [[Hermann Lotze]] (1817–81; 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.{{cn|date=June 2024}}

In 1873, Frege attained his doctorate under Schering.

Frege married Margarete Katharina Sophia Anna Lieseberg (15 February 1856 – 25 June 1904) on 14 March 1887.<ref name=":0" /> The couple had at least two children, who unfortunately died when young. Years later, they adopted a son, Alfred. Little else is known about Frege's family life, however.<ref>{{cite web | url=https://iep.utm.edu/frege/ | title=Frege, Gottlob &#124; Internet Encyclopedia of Philosophy }}</ref>

== Work as a logician ==
{{Main|Begriffsschrift}}
Though his education and early mathematical work focused primarily on geometry, Frege's work soon turned to logic. His {{Citation | title = Begriffsschrift, eine der arithmetischen nachgebildete Formelsprache des reinen Denkens | place = Halle a/S | publisher = Verlag von Louis Nebert | year = 1879 |trans-title=Concept-Script: A Formal Language for Pure Thought Modeled on that of Arithmetic| title-link = Begriffsschrift }} marked a turning point in the history of logic. The ''Begriffsschrift'' broke new ground, including a rigorous treatment of the ideas of [[function (mathematics)|functions]] and [[Variable (mathematics)|variables]]. Frege's goal was to show that mathematics grows out of [[logic]], and in so doing, he devised techniques that separated him from the Aristotelian syllogistic but took him rather close to Stoic propositional logic.<ref>[[Susanne Bobzien]] published in 2021 a work provocatively titled [https://humanities-digital-library.org/index.php/hdl/catalog/download/keeling-lectures/193/381-1?inline=1#page=171 ''"Frege plagiarized the Stoics"'']: Bobzien S., – In: ''Themes in Plato, Aristotle, and Hellenistic Philosophy'', Keeling  Lectures 2011–2018, p.149-206; Zalta, Ed, [https://plato.stanford.edu/entries/frege/#FrePhiLanCon ''Frege'', Stanford Encyclopedia of Philosophy]</ref>

[[File:Begriffsschrift Titel.png|thumb|Title page to ''Begriffsschrift'' (1879)]] In effect, Frege invented [[axiomatization|axiomatic]] [[predicate logic]], in large part thanks to his invention of [[Quantification (logic)|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 constant]]s ''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 sentence like "every boy loves some girl" and "some girl is loved by every boy" could 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".

A frequently noted example is that Aristotle's logic is unable to represent mathematical statements like [[Euclid's theorem]], a fundamental statement of number theory that there are an infinite number of [[prime number]]s. Frege's "conceptual notation", however, can represent such inferences.<ref>Horsten, Leon and Pettigrew, Richard, "Introduction" in ''The Continuum Companion to Philosophical Logic'' (Continuum International Publishing Group, 2011), p. 7.</ref> The analysis of logical concepts and the machinery of formalization that is essential to ''[[Principia Mathematica]]'' (3 vols., 1910–13, by [[Bertrand Russell]], 1872–1970, and [[Alfred North Whitehead]], 1861–1947), to Russell's [[theory of descriptions]], to [[Kurt Gödel]]'s (1906–78) [[Gödel's incompleteness theorem|incompleteness theorems]], and to [[Alfred Tarski]]'s (1901–83) 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 ''[[The Foundations of Arithmetic]]'' (''Die Grundlagen der Arithmetik'', 1884). Later, in his ''Basic Laws of Arithmetic'' (''Grundgesetze der Arithmetik'', vol. 1, 1893; vol. 2, 1903; vol. 2 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 {{nowrap|[[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 (predicate logic)|extension]] of the [[Predicate (logic)|predicate]] ''Fx'', that is, the set of all Fs, and similarly for ''Gx''. Then Basic Law V says that the predicates ''Fx'' and ''Gx'' have the same extension [[if and only if]] ∀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, [[Michael Dummett|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, unless: ∃''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 ''F''s is the same as the number of ''G''s if and only if the ''F''s can be put into a one-to-one correspondence with the ''G''s. 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".<ref>[http://plato.stanford.edu/entries/frege-logic/ Frege's Logic, Theorem, and Foundations for Arithmetic, ''Stanford Encyclopedia of Philosophy''] at plato.stanford.edu</ref>
* Frege's logic, now known as [[second-order logic]], can be weakened to so-called [[Impredicativity|predicative]] second-order logic. Predicative second-order logic plus Basic Law V is provably consistent by [[finitism|finitistic]] or [[Mathematical constructivism|constructive]] methods, but it can interpret only very weak fragments of arithmetic.<ref>{{cite book|author=Burgess, John|title=Fixing Frege|year=2005|publisher=Princeton University Press |isbn=978-0-691-12231-1}}</ref>

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]] (1815–64) and his intellectual descendants, especially [[Ernst Schröder (mathematician)|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<ref name="Klement_20230617">{{cite web |title=Peano, Frege, and Russell's Logical Influences|first=Kevin C. |last=Klement|date=June 17, 2023|url=https://philarchive.org/archive/KLEPFA-3 |access-date=April 26, 2025}}</ref>{{rp|2}} and [[Ludwig Wittgenstein]] (1889–1951).<ref name="Burge_2013">{{cite book |editor-first=Michael |editor-last=Beaney |title=The Oxford Handbook of The History of Analytic Philosophy|location=Oxford, England |publisher=Oxford University Press |date=2013|author=[[Tyler Burge]] |chapter=Chapter 10: Gottlob Frege: Some forms of influence |pages=355–382 |access-date=April 26, 2025|chapter-url=https://philosophy.ucla.edu/wp-content/uploads/2018/08/Burge-2013-Frege-Some-Forms-of-Influence.pdf}}</ref>{{rp|357}}

== Philosopher ==
[[File:Gottlob Frege (Emil Tesch).png|thumb|Frege, {{c.|1905}}]]
Frege is one of the founders of [[analytic philosophy]], whose work on logic and language gave rise to the [[linguistic turn]] in philosophy. His contributions to the [[philosophy of language]] include:
* [[Function (mathematics)|Function]] and argument analysis of the [[proposition]];
* Distinction between [[concept and object]] (''Begriff und Gegenstand'');
* Principle of [[compositionality]];
* [[Context principle]]; and
* 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 [[psychologism|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.

== Sense and reference ==
{{Main|Sense and reference}}
Frege's 1892 paper, "[[On Sense and Reference]]" ("Über Sinn und Bedeutung"), introduced his influential distinction between ''sense'' ("Sinn") and ''reference'' ("Bedeutung", which has also been translated as "meaning", or "denotation"). While conventional accounts of meaning took expressions to have just one feature (reference), Frege introduced the view that expressions have two different aspects of significance: their sense and their reference.

''Reference'' (or "Bedeutung") applied to [[proper names]], where a given expression (say the expression "Tom") simply refers to the entity bearing the name (the person named Tom). Frege also held that propositions had a referential relationship with their truth-value (in other words, a statement "refers" to the truth-value it takes). 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, and there can be multiple modes of representation for the same referent.

The distinction can be illustrated thus: In their ordinary uses, the name "Charles Philip Arthur George Mountbatten-Windsor", which for logical purposes is an unanalysable whole, and the functional expression "the King of the United Kingdom", which contains the significant parts "the King of ξ" and "United Kingdom", have the same ''referent'', namely, the person best known as [[Charles III|King Charles III]]. But the ''sense'' of the word "[[United Kingdom]]" is a part of the sense of the latter expression, but no part of the sense of the "full name" of King 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]]".

== 1924 diary ==
Frege's original papers having been destroyed in the [[World War II|Second World War]], in 1954 [[Michael Dummett|Dummett]] studied what transcriptions had survived of his ''[[Nachlass]],'' including fragments of a 1924 diary.<ref name=":1">{{Cite web |last=Monk |first=Ray |author-link=Ray Monk |date=October 2017 |title=Gottlob Frege: The machine in the ghost |url=https://www.prospectmagazine.co.uk/ideas/philosophy/44997/gottlob-frege-the-machine-in-the-ghost |access-date=2025-05-01 |website=[[Prospect Magazine]] |language=en}}</ref><ref>{{Cite journal |last=Klement |first=Kevin C. |date=Fall 2014 |title=The Russell–Dummett Correspondence on Frege and his Nachlaß |url=https://people.umass.edu/~klement/brmd.pdf |journal=The Bertrand Russell Society Bulletin |issue=150 |pages=25–29}}</ref> Dummett, an anti-racism activist as well as a Frege scholar, later recounted how he had been deeply shocked to discover from this that the man he had "revered" as "an absolutely rational man" was, at the end of his life, a 'virulent [[Anti-Semitic|anti-Semite]]' of "extreme right-wing opinions".<ref>{{Cite book |last=Dummett |first=Michael A. E. |url=https://archive.org/details/fregephilosophyo0000dumm/mode/1up |title=Frege; philosophy of language |date=1973 |publisher=New York, Harper & Row |others= |isbn=978-0-06-011132-8 |edition= |pages=xii |chapter=Preface |orig-year= |url-access=registration}}</ref><ref>Hersh, Reuben, ''[https://books.google.com/books?id=VQN6DwAAQBAJ&q=Frege What Is Mathematics, Really?]'' (Oxford University Press, 1997), p. 241.</ref>

The diary fragments were finally published in 1994.<ref>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. </ref> with an English translation following in 1996.<ref>{{Cite journal |last=Mendelsohn |first=Richard L. |date=December 1996 |title=Diary: Written by professor Dr Gottlob Frege in the time from 10 March to 9 April 1924: Edited and with commentary by Gottfried Gabriel and Wolfgang Kienzler |url=https://www.tandfonline.com/doi/abs/10.1080/00201749608602425 |journal=Inquiry |language=en |volume=39 |issue=3-4 |pages=303–342 |doi=10.1080/00201749608602425 |issn=0020-174X}}</ref> Written in the last year of his life, at the age of 76, it contains opposition to the parliamentary system, universal suffrage, democrats, socialism and liberals, and hostility toward Catholics and the French as well as the Jews.<ref>{{Cite book |last=Dummett |first=Michael A. E. |url=https://archive.org/details/fregephilosophyo0000dumm/page/n15/mode/1up |title=Frege; philosophy of language |date=1973 |publisher=New York, Harper & Row |isbn=978-0-06-011132-8 |page=xii |url-access=registration |via=[[Internet Archive]]}}</ref> Frege thought Jews ought at least be deprived of certain political rights.<ref>{{Cite web |title=Frege, Gottlob {{!}} Internet Encyclopedia of Philosophy |url=https://iep.utm.edu/frege/ |access-date=2025-05-02 |language=en-US}}</ref> And, although he had held friendly relations with Jews in real life (among his students was [[Gershom Scholem]] who greatly valued his teaching), Frege wrote that it would be best if Jews would "get lost, or better would like to disappear from Germany."<ref name="Sherratt2013" /> 

Frege confided "that he had once thought of himself as a liberal and was an admirer of [[Otto von Bismarck|Bismarck]]", but then sympathized with General [[Erich Ludendorff|Ludendorff]]. In an entry dated 5 May 1924 Frege expressed some agreement with an article published in [[Houston Stewart Chamberlain|Houston Stewart Chamberlain's]] ''Deutschlands Erneuerung'' which praised [[Adolf Hitler]].<ref name="Sherratt2013">{{cite book | author = Yvonne Sherratt | date = 21 May 2013 | title = Hitler's Philosophers | publisher = Yale University Press | pages = 60 | isbn = 978-0-300-15193-0 | oclc = 1017997313 | url = https://books.google.com/books?id=zvsbrUEr1pwC&pg=PA60}}</ref> Some interpretations have been written about that time.<ref>[[Hans Sluga]]: ''Heidegger's Crisis: Philosophy and Politics in Nazi Germany'', pp. 99ff. Sluga's source was an article by Eckart Menzler-Trott: "Ich wünsch die Wahrheit und nichts als die Wahrheit: Das politische Testament des deutschen Mathematikers und Logikers Gottlob Frege". In: ''[[FORVM|Forvm]]'', vol. 36, no. 432, 20 December 1989, pp. 68–79. http://forvm.contextxxi.org/-no-432-.html</ref> 

== Personality ==
Frege was described by his students as a highly introverted person, seldom entering into dialogues with others and mostly facing the blackboard while lecturing. He was, however, known to occasionally show wit and even bitter sarcasm during his classes.<ref>''Frege's Lectures on Logic'', ed. by Erich H. Reck and [[Steve Awodey]], Open Court Publishing, 2004, pp. 18–26.</ref>

== Important dates ==
* Born 8 November 1848 in [[Wismar]], [[Grand Duchy of Mecklenburg-Schwerin|Mecklenburg-Schwerin]].
* 1869&nbsp;— attends the [[University of Jena]].
* 1871&nbsp;— attends the [[University of Göttingen]].
* 1873&nbsp;— PhD, doctor in [[mathematics]] ([[geometry]]), attained at Göttingen.{{efn|Thesis title: ''Ueber<!--[sic; see 'Talk:Gottlob Frege#Ueber']--> eine geometrische Darstellung der imaginären Gebilde in der Ebene''.}}
* 1874&nbsp;— [[Habilitation]] at Jena{{efn|Thesis title: ''Rechnungsmethoden, die sich auf eine Erweiterung des Größenbegriffes gründen''.}}; [[Privatdozent|private teacher]].
* 1879&nbsp;— [[Ausserordentlicher Professor]] at Jena.
* 1896&nbsp;— [[Ordentlicher Professor|Ordentlicher Honorarprofessor]] at Jena.
* 1918&nbsp;— retires.<ref>{{Citation|title=Chronology of Major Events in Frege's Life|date=2019|url=https://www.cambridge.org/core/books/frege/chronology-of-major-events-in-freges-life/05A6B0C417981344CADAD7363F2B910F|work=Frege: A Philosophical Biography|pages=xiii–xiv|editor-last=Jacquette|editor-first=Dale|place=Cambridge|publisher=Cambridge University Press| doi=10.1017/9781139033725.001 |isbn=978-1-139-03372-5| s2cid=242262152 |access-date=}}</ref>
* Died 26 July 1925 in [[Bad Kleinen]] (now part of [[Mecklenburg-Vorpommern]]).

== Important works ==

=== Logic, foundation of arithmetic ===
''[[Begriffsschrift|Begriffsschrift: eine der arithmetischen nachgebildete Formelsprache des reinen Denkens]]'' (1879), Halle an der Saale: Verlag von Louis Nebert ([http://gallica.bnf.fr/ark:/12148/bpt6k65658c online version]).
* In English: ''Begriffsschrift, a Formula Language, Modeled Upon That of Arithmetic, for Pure Thought'', in: [[Jean van Heijenoort|J. van Heijenoort]] (ed.), ''From Frege to Gödel: A Source Book in Mathematical Logic, 1879–1931'', Harvard, MA: Harvard University Press, 1967, pp.&nbsp;5–82.
* In English (selected sections revised in modern formal notation): R. L. Mendelsohn, ''The Philosophy of Gottlob Frege'', Cambridge: Cambridge University Press, 2005: "Appendix A. Begriffsschrift in Modern Notation: (1) to (51)" and "Appendix B. Begriffsschrift in Modern Notation: (52) to (68)."{{efn|Only the proofs of Part II of the ''Begriffsschrift'' are rewritten in modern notation in this work. Partial rewriting of the proofs of Part III is included in [[George Boolos|Boolos, George]], "Reading the ''Begriffsschrift''," ''[[Mind (journal)|Mind]]'' '''94'''(375): 331–344 (1985).}}
''[[The Foundations of Arithmetic|Die Grundlagen der Arithmetik: Eine logisch-mathematische Untersuchung über den Begriff der Zahl]]'' (1884), Breslau: Verlag von Wilhelm Koebner ([https://archive.org/download/diegrundlagende00freggoog/diegrundlagende00freggoog.pdf online version]).
* In English: ''[[The Foundations of Arithmetic]]: A Logico-Mathematical Enquiry into the Concept of Number'', translated by [[J. L. Austin]], Oxford: Basil Blackwell, 1950.
''Grundgesetze der Arithmetik'', Band I (1893); Band II (1903), Jena: Verlag Hermann Pohle ([https://archive.org/details/bub_gb_LZ5tAAAAMAAJ online version)].
* In English (translation of selected sections), "Translation of Part of Frege's ''Grundgesetze der Arithmetik''," translated and edited [[Peter Geach]] and [[Max Black]] in ''Translations from the Philosophical Writings of Gottlob Frege'', New York, NY: Philosophical Library, 1952, pp.&nbsp;137–158.
* In German (revised in modern formal notation): ''Grundgesetze der Arithmetik'', Korpora (portal of the [[University of Duisburg-Essen]]), 2006: [https://korpora.zim.uni-duisburg-essen.de/Frege/PDF/gga1_o_corr.pdf Band I] {{Webarchive|url=https://web.archive.org/web/20161021050624/https://korpora.zim.uni-duisburg-essen.de/Frege/PDF/gga1_o_corr.pdf |date=21 October 2016 }} and [https://korpora.zim.uni-duisburg-essen.de/Frege/PDF/gga2_o_corr.pdf Band II] {{Webarchive|url=https://web.archive.org/web/20170829012831/https://korpora.zim.uni-duisburg-essen.de/Frege/PDF/gga2_o_corr.pdf |date=29 August 2017 }}.
* In German (revised in modern formal notation): ''Grundgesetze der Arithmetik – Begriffsschriftlich abgeleitet. Band I und II: In moderne Formelnotation transkribiert und mit einem ausführlichen Sachregister versehen'', edited by T. Müller, B. Schröder, and R. Stuhlmann-Laeisz, Paderborn: mentis, 2009.
* In English: ''Basic Laws of Arithmetic'', translated and edited with an introduction by Philip A. Ebert and Marcus Rossberg. Oxford: Oxford University Press, 2013. {{ISBN|978-0-19-928174-9}}.

=== Philosophical studies ===
"[[Function and Concept]]" (1891)
* Original: "Funktion und Begriff", an [[Lecture|address]] to the Jenaische Gesellschaft für Medizin und Naturwissenschaft, Jena, 9 January 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: "Ueber<!--[sic; see 'Talk:Gottlob Frege#Ueber']--> 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.&nbsp;656–666.<ref>{{Cite book | url=https://archive.org/details/festschriftludw00meyegoog | title=Festschrift Ludwig Boltzmann gewidmet zum sechzigsten geburtstage 20. Februar 1904. Mit einem portrait, 101 abbildungen im text und 2 tafeln| publisher=Leipzig, J.A. Barth| year=1904}}</ref>
* 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, the papers were published together in ''Logische Untersuchungen'', ed. G. Patzig, Vandenhoeck & Ruprecht, 1966, and English translations appeared together in ''Logical Investigations'', ed. Peter Geach, Blackwell, 1975.
* 1918–19. "Der Gedanke: Eine logische Untersuchung" ("The Thought: A Logical Inquiry"), in ''Beiträge zur Philosophie des Deutschen Idealismus I'':{{efn|The journal ''Beiträge zur Philosophie des Deutschen Idealismus'' was the organ of {{Interlanguage link multi|Deutsche Philosophische Gesellschaft|de}}.}} 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 ===
* 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.). Darmstadt: Wissenschaftliche Buchgesellschaft, 1967 and Hildesheim, G. Olms, 1967. "Small Writings," a collection of most of his writings (e.g., the previous), [[posthumous work|posthumously]] published.

== See also ==
* [[Frege system]]
* [[List of pioneers in computer science]]
* [[Neo-Fregeanism]]

==Notes==
{{Notelist}}

== References ==
{{Reflist}}

== Sources ==
=== Primary ===
* [http://plato.stanford.edu/entries/frege/catalog.html Online bibliography of Frege's works and their English translations] (compiled by [[Edward N. Zalta]], ''[[Stanford Encyclopedia of Philosophy]]'').
* 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. "Ueber<!--[sic; see 'Talk:Gottlob Frege#Ueber']--> 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. [http://korpora.zim.uni-duisburg-essen.de/Frege Band I+II online] {{Webarchive|url=https://web.archive.org/web/20220617065806/http://korpora.zim.uni-duisburg-essen.de/Frege |date=17 June 2022 }}. Partial translation of volume 1: Montgomery Furth, 1964. ''The Basic Laws of Arithmetic''. Univ. of California Press. Translation of selected sections from volume 2 in Geach and Black (1980). Complete translation of both volumes: Philip A. Ebert and Marcus Rossberg, 2013, ''Basic Laws of Arithmetic''. Oxford University 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, 1975.
* 1924. Gottfried Gabriel, Wolfgang Kienzler (editors): ''Gottlob Freges politisches Tagebuch''. In: ''Deutsche Zeitschrift für Philosophie'', vol. 42, 1994, pp.&nbsp;1057–98. Introduction by the editors on pp.&nbsp;1057–66. This article has been translated into English, in: ''Inquiry'', vol. 39, 1996, pp.&nbsp;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 ===
'''Philosophy'''
* [[Alain Badiou|Badiou, Alain]]. "On a Contemporary Usage of Frege", trans. [[Justin Clemens]] and [[Sam Gillespie]]. ''UMBR(a)'', no. 1, 2000, pp.&nbsp;99–115.
* Baker, Gordon, and P.M.S. Hacker, 1984. ''Frege: Logical Excavations''. Oxford University Press.&nbsp;— 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.
* [[Michael Dummett|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.&nbsp;— On the Frege-Husserl-Cantor triangle.
* [[Anthony Kenny|Kenny, Anthony]], 1995. ''Frege&nbsp;– An introduction to the founder of modern analytic philosophy''. Penguin Books.&nbsp;— Excellent non-technical introduction and overview of Frege's philosophy.
* Klemke, E.D., ed., 1968. ''Essays on Frege''. University of Illinois Press.&nbsp;— 31 essays by philosophers, grouped under three headings: 1. [[Ontology]]; 2. [[Semantics]]; and 3. [[Logic]] and [[Philosophy of Mathematics]].
* Rosado Haddock, Guillermo E., 2006. ''[https://books.google.com/books?id=wsi1CwAAQBAJ 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.&nbsp;— On Frege's theory of definitions.
* [[Hans Sluga|Sluga, Hans]], 1980. ''Gottlob Frege''. Routledge.
* Nicla Vassallo, 2014, ''[https://books.google.com/books?id=V2iPBQAAQBAJ&dq=%22Frege+on+Thinking+and+Its+Epistemic+Significance%22&pg=PR5 Frege on Thinking and Its Epistemic Significance]'' with Pieranna Garavaso, Lexington Books–Rowman & Littlefield, Lanham, MD, Usa.
* [[Joan Weiner|Weiner, Joan]], 1990. ''[https://books.google.com/books?id=rMJcDwAAQBAJ&q=%22Frege+Explained%22+Wiener Frege in Perspective]'', Cornell University Press.

'''Logic and mathematics'''
* Anderson, D. J., and [[Edward Zalta]], 2004, "[https://mally.stanford.edu/Papers/frege-boolos.pdf Frege, Boolos, and Logical Objects]," ''Journal of Philosophical Logic 33'': 1–26.
* [[Patricia Blanchette|Blanchette, Patricia]], 2012, ''[https://books.google.com/books?id=wfdoAgAAQBAJ&dq=%22Frege%27s+Conception+of+Logic%22&pg=PP1 Frege's Conception of Logic]''. Oxford: Oxford University Press, 2012
* Burgess, John, 2005. ''Fixing Frege''. Princeton Univ. Press.&nbsp;— A critical survey of the ongoing rehabilitation of Frege's logicism.
* [[George Boolos|Boolos, George]], 1998. ''Logic, Logic, and Logic''. MIT Press.&nbsp;— 12 papers on [[Frege's theorem]] and the [[logicism|logicist]] approach to the foundation of [[arithmetic]].
* [[Michael Dummett|Dummett, Michael]], 1991. ''[[Frege: Philosophy of Mathematics]]''. Harvard University Press.
* Demopoulos, William, ed., 1995. ''[https://books.google.com/books?id=h9Y2lNAXddoC&q=%22Frege%27s+Philosophy+of+Mathematics%22 Frege's Philosophy of Mathematics]''. Harvard Univ. Press.&nbsp;— Papers exploring [[Frege's theorem]] and Frege's mathematical and intellectual background.
* Ferreira, F. and [[Kai Wehmeier|Wehmeier, K.]], 2002, "On the consistency of the Delta-1-1-CA fragment of Frege's ''Grundgesetze''," ''Journal of Philosophic Logic 31'': 301–11.
* [[Ivor Grattan-Guinness|Grattan-Guinness, Ivor]], 2000. ''The Search for Mathematical Roots 1870–1940''. Princeton University Press.&nbsp;— Fair to the mathematician, less so to the philosopher.
* [[Donald A. Gillies|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.
* [[Andrew David Irvine|Irvine, Andrew David]], 2010, "Frege on Number Properties," ''Studia Logica,'' 96(2): 239–60.
* [[Charles Parsons (philosopher)|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.
* Heck, Richard Kimberly: ''[https://books.google.com/books?id=55G9P870S1YC Frege's Theorem]''. Oxford: Oxford University Press, 2011
* Heck, Richard Kimberly: ''[https://books.google.com/books?id=Irn2fJp_KZ4C&dq=%22Reading+Frege%27s+Grundgesetze%22&pg=PP1 Reading Frege's Grundgesetze]''. Oxford: Oxford University Press, 2013
* [[Crispin Wright|Wright, Crispin]], 1983. ''Frege's Conception of Numbers as Objects''. Aberdeen University Press.&nbsp;— A systematic exposition and a scope-restricted defense of Frege's ''Grundlagen'' conception of numbers.

'''Historical context'''
* {{Citation|last=Everdell| first=William R. |author-link=William Everdell |year=1997 |title=The First Moderns: Profiles in the Origins of Twentieth Century Thought |location= Chicago |publisher=University of Chicago Press|url=https://books.google.com/books?id=kNMlDAAAQBAJ| isbn=9780226224848 }}

== External links ==
{{Sister project links|wikt=no|commons=Category:Gottlob Frege|b=no|n=no|q=Gottlob Frege|s=Author:Gottlob Frege|v=no|species=no}}
{{Portal|Philosophy}}
* {{Internet Archive author |sname=Gottlob Frege}}
* [http://www.genealogy.math.ndsu.nodak.edu/id.php?id=46166 Frege at Genealogy Project]
* [http://www.ocf.berkeley.edu/~brianwc/frege/ A comprehensive guide to Fregean material available on the web] by Brian Carver.
* [[Stanford Encyclopedia of Philosophy]]:
** "[http://plato.stanford.edu/entries/frege/ Gottlob Frege]"&nbsp;— by [[Edward Zalta]].
** "[http://plato.stanford.edu/entries/frege-logic/ Frege's Logic, Theorem, and Foundations for Arithmetic]"&nbsp;— by [[Edward Zalta]].
* [[Internet Encyclopedia of Philosophy]]:
** [http://www.iep.utm.edu/f/frege.htm Gottlob Frege]&nbsp;— by Kevin C. Klement.
** [http://www.utm.edu/research/iep/f/freg-lan.htm Frege and Language] {{Webarchive|url=https://web.archive.org/web/20090131012802/http://www.utm.edu/research/iep/f/freg-lan.htm |date=31 January 2009 }}&nbsp;— by Dorothea Lotter.
* Metaphysics Research Lab: [http://mally.stanford.edu/frege.html Gottlob Frege.]
* [http://www.ontology.co/fregeg.htm Frege on Being, Existence and Truth.]
* {{MacTutor Biography|id=Frege}}
* [http://ctan.org/tex-archive/macros/latex/contrib/begriff/ Begriff], a [[LaTeX]] package for typesetting Frege's logic notation, earlier version.
* [http://www.ctan.org/pkg/grundgesetze grundgesetze], a [[LaTeX]] package for typesetting Frege's logic notation, mature version
* [http://www.frege.info/ Frege's ''Basic Laws of Arithmetic''], website, incl. corrigenda and [[LaTeX]] typesetting tool&nbsp;— by P. A. Ebert and M. Rossberg.

{{analytic philosophy}}
{{philosophy of language}}
{{Platonists}}
{{Authority control}}

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