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Imre Lakatos (, ; hu, Lakatos Imre ; 9 November 1922 – 2 February 1974) was a Hungarian
philosopher A philosopher is a person who practices or investigates philosophy. The term ''philosopher'' comes from the grc, φιλόσοφος, , translit=philosophos, meaning 'lover of wisdom'. The coining of the term has been attributed to the Greek th ...
of
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 ...
and
science Science is a systematic endeavor that builds and organizes knowledge in the form of testable explanations and predictions about the universe. Science may be as old as the human species, and some of the earliest archeological evidence for ...
, known for his thesis of the fallibility of mathematics and its "methodology of proofs and refutations" in its pre-axiomatic stages of development, and also for introducing the concept of the "
research programme A research program (British English: research programme) is a professional network of scientists conducting basic research. The term was used by philosopher of science Imre Lakatos to blend and revise the normative model of science offered by Karl ...
" in his methodology of scientific research programmes.


Life

Lakatos was born Imre (Avrum) Lipsitz to a Jewish family in
Debrecen Debrecen ( , is Hungary's second-largest city, after Budapest, the regional centre of the Northern Great Plain region and the seat of Hajdú-Bihar County. A city with county rights, it was the largest Hungarian city in the 18th century and i ...
,
Hungary Hungary ( hu, Magyarország ) is a landlocked country in Central Europe. Spanning of the Carpathian Basin, it is bordered by Slovakia to the north, Ukraine to the northeast, Romania to the east and southeast, Serbia to the south, Croatia a ...
, in 1922. He received a degree in mathematics,
physics Physics is the natural science that studies matter, its fundamental constituents, its motion and behavior through space and time, and the related entities of energy and force. "Physical science is that department of knowledge which r ...
, and
philosophy Philosophy (from , ) is the systematized study of general and fundamental questions, such as those about existence, reason, knowledge, values, mind, and language. Such questions are often posed as problems to be studied or resolved. Some ...
from the
University of Debrecen ThUniversity of Debrecen( hu, Debreceni Egyetem) is a university located in Debrecen, Hungary. It is the List of oldest universities in continuous operation, oldest continuously operating institution of higher education in Hungary ever since its ...
in 1944. In March 1944 the Germans invaded Hungary, and Lakatos along with Éva Révész, his then-girlfriend and subsequent wife, formed soon after that event a
Marxist Marxism is a Left-wing politics, left-wing to Far-left politics, far-left method of socioeconomic analysis that uses a Materialism, materialist interpretation of historical development, better known as historical materialism, to understand S ...
resistance group. In May of that year, the group was joined by Éva Izsák, a 19-year-old Jewish antifascist activist. Lakatos, considering that there was a risk that she would be captured and forced to betray them, decided that her duty to the group was to commit suicide. Subsequently, a member of the group took her to Debrecen and gave her
cyanide Cyanide is a naturally occurring, rapidly acting, toxic chemical that can exist in many different forms. In chemistry, a cyanide () is a chemical compound that contains a functional group. This group, known as the cyano group, consists of ...
. During the occupation, Lakatos avoided
Nazi Nazism ( ; german: Nazismus), the common name in English for National Socialism (german: Nationalsozialismus, ), is the far-right totalitarian political ideology and practices associated with Adolf Hitler and the Nazi Party (NSDAP) in ...
persecution of Jews by changing his surname to Molnár. His mother and grandmother were murdered in
Auschwitz Auschwitz concentration camp ( (); also or ) was a complex of over 40 concentration and extermination camps operated by Nazi Germany in occupied Poland (in a portion annexed into Germany in 1939) during World War II and the Holocaust. It con ...
. He changed his surname once again to ''Lakatos'' (Locksmith) in honor of Géza Lakatos. After the war, from 1947, he worked as a senior official in the Hungarian ministry of education. He also continued his education with a PhD at Debrecen University awarded in 1948 and also attended György Lukács's weekly Wednesday afternoon private seminars. He also studied at the Moscow State University under the supervision of
Sofya Yanovskaya Sofya Aleksandrovna Yanovskaya (also Janovskaja; russian: Софи́я Алекса́ндровна Яно́вская; 31 January 1896 – 24 October 1966) was a Soviet mathematician and historian, specializing in the history of mathematics, math ...
in 1949. When he returned, however, he found himself on the losing side of internal arguments within the Hungarian communist party and was imprisoned on charges of revisionism from 1950 to 1953. More of Lakatos' activities in Hungary after World War II have recently become known. In fact, Lakatos was a hardline
Stalinist Stalinism is the means of governing and Marxist-Leninist policies implemented in the Soviet Union from 1927 to 1953 by Joseph Stalin. It included the creation of a one-party totalitarian police state, rapid industrialization, the theory o ...
and, despite his young age, had an important role between 1945 and 1950 (his own arrest and jailing) in building up the Communist rule, especially in cultural life and the academia, in Hungary. After his release, Lakatos returned to academic life, doing mathematical research and translating George Pólya's '' How to Solve It'' into Hungarian. Still nominally a communist, his political views had shifted markedly, and he was involved with at least one dissident student group in the lead-up to the
1956 Hungarian Revolution The Hungarian Revolution of 1956 (23 October – 10 November 1956; hu, 1956-os forradalom), also known as the Hungarian Uprising, was a countrywide revolution against the government of the Hungarian People's Republic (1949–1989) and the Hunga ...
. After the
Soviet Union The Soviet Union,. officially the Union of Soviet Socialist Republics. (USSR),. was a transcontinental country that spanned much of Eurasia from 1922 to 1991. A flagship communist state, it was nominally a federal union of fifteen national ...
invaded Hungary in November 1956, Lakatos fled to
Vienna en, Viennese , iso_code = AT-9 , registration_plate = W , postal_code_type = Postal code , postal_code = , timezone = CET , utc_offset = +1 , timezone_DST ...
and later reached England. He received a PhD in philosophy in 1961 from the
University of Cambridge , mottoeng = Literal: From here, light and sacred draughts. Non literal: From this place, we gain enlightenment and precious knowledge. , established = , other_name = The Chancellor, Masters and Schola ...
; his doctoral thesis was entitled ''Essays in the Logic of Mathematical Discovery'', and his doctoral advisor was
R. B. Braithwaite Richard Bevan Braithwaite (15 January 1900 – 21 April 1990) was an English philosopher who specialized in the philosophy of science, ethics, and the philosophy of religion. Life Braithwaite was born in Banbury, Oxfordshire, son of th ...
. The book '' Proofs and Refutations: The Logic of Mathematical Discovery'', published after his death, is based on this work. In 1960, he was appointed to a position in the
London School of Economics , mottoeng = To understand the causes of things , established = , type = Public research university , endowment = £240.8 million (2021) , budget = £391.1 millio ...
(LSE), where he wrote on the
philosophy of mathematics The philosophy of mathematics is the branch of philosophy that studies the assumptions, foundations, and implications of mathematics. It aims to understand the nature and methods of mathematics, and find out the place of mathematics in people's ...
and the
philosophy of science Philosophy of science is a branch of philosophy concerned with the foundations, methods, and implications of science. The central questions of this study concern what qualifies as science, the reliability of scientific theories, and the ultim ...
. The LSE philosophy of science department at that time included
Karl Popper Sir Karl Raimund Popper (28 July 1902 – 17 September 1994) was an Austrian-British philosopher, academic and social commentator. One of the 20th century's most influential philosophers of science, Popper is known for his rejection of the cl ...
,
Joseph Agassi Joseph Agassi (; he, יוסף אגסי; born May 7, 1927 in Jerusalem) is an Israeli academic with contributions in logic, scientific method, and philosophy. He studied under Karl Popper and taught at the London School of Economics. Agassi ta ...
and J. O. Wisdom. It was Agassi who first introduced Lakatos to Popper under the rubric of his applying a
fallibilist Originally, fallibilism (from Medieval Latin: ''fallibilis'', "liable to err") is the philosophical principle that propositions can be accepted even though they cannot be conclusively proven or justified,Haack, Susan (1979)"Fallibilism and Nece ...
methodology of
conjecture In mathematics, a conjecture is a conclusion or a proposition that is proffered on a tentative basis without proof. Some conjectures, such as the Riemann hypothesis (still a conjecture) or Fermat's Last Theorem (a conjecture until proven in 19 ...
s and
refutation In argumentation, an objection is a reason arguing against a premise, argument, or conclusion. Definitions of objection vary in whether an objection is always an argument (or counterargument) or may include other moves such as questioning. An ...
s to mathematics in his Cambridge PhD thesis. With co-editor
Alan Musgrave Alan Musgrave (; born 1940) is an English-born New Zealand philosopher. Biography Musgrave was educated at the London School of Economics with a BA Honours Philosophy and Economics 1961. Karl Popper supervised Musgrave's PhD which was complete ...
, he edited the often cited ''Criticism and the Growth of Knowledge'', the ''Proceedings'' of the International Colloquium in the Philosophy of Science, London, 1965. Published in 1970, the 1965 Colloquium included well-known speakers delivering papers in response to Thomas Kuhn's '' The Structure of Scientific Revolutions''. Lakatos was twice denied British citizenship. He remained at LSE until his sudden death in 1974 of a heart attack at the age of 51. The
Lakatos Award The Lakatos Award is given annually for an outstanding contribution to the philosophy of science, widely interpreted. The contribution must be in the form of a monograph, co-authored or single-authored, and published in English during the previo ...
was set up by the school in his memory. In January 1971, he became editor of the '' British Journal for the Philosophy of Science'', which J. O. Wisdom had built up before departing in 1965, and he continued as editor until his death in 1974, after which it was then edited jointly for many years by his LSE colleagues John W. N. Watkins and John Worrall, Lakatos's ex-research assistant. His last LSE lectures in scientific method in Lent Term 1973 along with parts of his correspondence with his friend and critic Paul Feyerabend have been published in '' For and Against Method'' (). Lakatos and his colleague
Spiro Latsis Spiros J. Latsis ( el, Σπύρος Λάτσης; born 1946) is a Greek billionaire, and business magnate. He is the son of the late tycoon Yiannis Latsis, who died in 2003. In 2018, Spiros Latsis ranked #729 on the ''Forbes'' World's Billionaire ...
organized an international conference devoted entirely to historical case studies in Lakatos's methodology of research programmes in physical sciences and economics, to be held in Greece in 1974, and which still went ahead following Lakatos's death in February 1974. These case studies in such as Einstein's relativity programme, Fresnel's wave theory of light and
neoclassical economics Neoclassical economics is an approach to economics in which the production, consumption and valuation (pricing) of goods and services are observed as driven by the supply and demand model. According to this line of thought, the value of a good ...
, were published by Cambridge University Press in two separate volumes in 1976, one devoted to physical sciences and Lakatos's general programme for rewriting the history of science, with a concluding critique by his great friend Paul Feyerabend, and the other devoted to economics.


Philosophical work


Philosophy of mathematics

Lakatos' philosophy of mathematics was inspired by both
Hegel Georg Wilhelm Friedrich Hegel (; ; 27 August 1770 – 14 November 1831) was a German philosopher. He is one of the most important figures in German idealism and one of the founding figures of modern Western philosophy. His influence extends a ...
's and Marx's
dialectic Dialectic ( grc-gre, διαλεκτική, ''dialektikḗ''; related to dialogue; german: Dialektik), also known as the dialectical method, is a discourse between two or more people holding different points of view about a subject but wishing ...
, by
Karl Popper Sir Karl Raimund Popper (28 July 1902 – 17 September 1994) was an Austrian-British philosopher, academic and social commentator. One of the 20th century's most influential philosophers of science, Popper is known for his rejection of the cl ...
's theory of knowledge, and by the work of mathematician George Pólya. The 1976 book ''Proofs and Refutations'' is based on the first three chapters of his 1961 four-chapter doctoral thesis ''Essays in the Logic of Mathematical Discovery''. But its first chapter is Lakatos' own revision of its chapter 1 that was first published as ''Proofs and Refutations'' in four parts in 1963–64 in the ''British Journal for the Philosophy of Science''. It is largely taken up by a fictional
dialogue Dialogue (sometimes spelled dialog in American English) is a written or spoken conversational exchange between two or more people, and a literary and theatrical form that depicts such an exchange. As a philosophical or didactic device, it is c ...
set in a mathematics class. The students are attempting to prove the formula for the
Euler characteristic In mathematics, and more specifically in algebraic topology and polyhedral combinatorics, the Euler characteristic (or Euler number, or Euler–Poincaré characteristic) is a topological invariant, a number that describes a topological space ...
in
algebraic topology Algebraic topology is a branch of mathematics that uses tools from abstract algebra to study topological spaces. The basic goal is to find algebraic invariant (mathematics), invariants that classification theorem, classify topological spaces up t ...
, which is a
theorem In mathematics, a theorem is a statement that has been proved, or can be proved. The ''proof'' of a theorem is a logical argument that uses the inference rules of a deductive system to establish that the theorem is a logical consequence of th ...
about the properties of polyhedra, namely that for all polyhedra the number of their vertices ''V'' minus the number of their edges ''E'' plus the number of their faces ''F'' is 2 (). The dialogue is meant to represent the actual series of attempted proofs that mathematicians historically offered for the
conjecture In mathematics, a conjecture is a conclusion or a proposition that is proffered on a tentative basis without proof. Some conjectures, such as the Riemann hypothesis (still a conjecture) or Fermat's Last Theorem (a conjecture until proven in 19 ...
, only to be repeatedly refuted by counterexamples. Often the students paraphrase famous mathematicians such as Cauchy, as noted in Lakatos's extensive footnotes. Lakatos termed the polyhedral counterexamples to Euler's formula ''monsters'' and distinguished three ways of handling these objects: Firstly, ''monster-barring'', by which means the theorem in question could not be applied to such objects. Secondly, ''monster-adjustment'', whereby by making a re-appraisal of the ''monster'' it could be ''made'' to obey the proposed theorem. Thirdly, ''exception handling'', a further distinct process. These distinct strategies have been taken up in qualitative physics, where the terminology of ''monsters'' has been applied to apparent counterexamples, and the techniques of ''monster-barring'' and ''monster-adjustment'' recognized as approaches to the refinement of the analysis of a physical issue. What Lakatos tried to establish was that no theorem of informal mathematics is final or perfect. This means that we should not think that a theorem is ultimately true, only that no counterexample has yet been found. Once a counterexample is found, we adjust the theorem, possibly extending the domain of its validity. This is a continuous way our knowledge accumulates, through the logic and process of proofs and refutations. (If axioms are given for a branch of mathematics, however, Lakatos claimed that proofs from those
axiom An axiom, postulate, or assumption is a statement that is taken to be true, to serve as a premise or starting point for further reasoning and arguments. The word comes from the Ancient Greek word (), meaning 'that which is thought worthy or f ...
s were tautological, i.e.
logically true Logical truth is one of the most fundamental concepts in logic. Broadly speaking, a logical truth is a statement which is true regardless of the truth or falsity of its constituent propositions. In other words, a logical truth is a statement whic ...
.) Lakatos proposed an account of mathematical knowledge based on the idea of
heuristic A heuristic (; ), or heuristic technique, is any approach to problem solving or self-discovery that employs a practical method that is not guaranteed to be optimal, perfect, or rational, but is nevertheless sufficient for reaching an immediate, ...
s. In ''Proofs and Refutations'' the concept of "heuristic" was not well developed, although Lakatos gave several basic rules for finding proofs and counterexamples to conjectures. He thought that mathematical "
thought experiment A thought experiment is a hypothetical situation in which a hypothesis, theory, or principle is laid out for the purpose of thinking through its consequences. History The ancient Greek ''deiknymi'' (), or thought experiment, "was the most anci ...
s" are a valid way to discover mathematical conjectures and proofs, and sometimes called his philosophy "quasi-
empiricism In philosophy, empiricism is an epistemological theory that holds that knowledge or justification comes only or primarily from sensory experience. It is one of several views within epistemology, along with rationalism and skepticism. Empir ...
". However, he also conceived of the mathematical community as carrying on a kind of dialectic to decide which
mathematical proof A mathematical proof is an inferential argument for a mathematical statement, showing that the stated assumptions logically guarantee the conclusion. The argument may use other previously established statements, such as theorems; but every proo ...
s are valid and which are not. Therefore, he fundamentally disagreed with the " formalist" conception of proof prevailed in
Frege Friedrich Ludwig Gottlob Frege (; ; 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 philo ...
's and
Russell Russell may refer to: People * Russell (given name) * Russell (surname) * Lady Russell (disambiguation) * Lord Russell (disambiguation) Places Australia *Russell, Australian Capital Territory *Russell Island, Queensland (disambiguation) **Ru ...
's logicism, which defines proof simply in terms of ''formal'' validity. On its first publication as an article in the ''British Journal for the Philosophy of Science'' in 1963–64, ''Proofs and Refutations'' became highly influential on new work in the philosophy of mathematics, although few agreed with Lakatos' strong disapproval of formal proof. Before his death he had been planning to return to the philosophy of mathematics and apply his theory of research programmes to it. Lakatos, Worrall and Zahar use
Poincaré Poincaré is a French surname. Notable people with the surname include: * Henri Poincaré (1854–1912), French physicist, mathematician and philosopher of science * Henriette Poincaré (1858-1943), wife of Prime Minister Raymond Poincaré * Luci ...
(1893) to answer one of the major problems perceived by critics, namely that the pattern of mathematical research depicted in ''Proofs and Refutations'' does not faithfully represent most of the actual activity of contemporary mathematicians.


Cauchy and uniform convergence

In a 1966 text ''Cauchy and the continuum'', Lakatos re-examines the history of the calculus, with special regard to
Augustin-Louis Cauchy Baron Augustin-Louis Cauchy (, ; ; 21 August 178923 May 1857) was a French mathematician, engineer, and physicist who made pioneering contributions to several branches of mathematics, including mathematical analysis and continuum mechanics. He ...
and the concept of uniform convergence, in the light of non-standard analysis. Lakatos is concerned that historians of mathematics should not judge the evolution of mathematics in terms of currently fashionable theories. As an illustration, he examines Cauchy's proof that the sum of a series of continuous functions is itself continuous. Lakatos is critical of those who would see Cauchy's proof, with its failure to make explicit a suitable convergence hypothesis, merely as an inadequate approach to Weierstrassian analysis. Lakatos sees in such an approach a failure to realize that Cauchy's concept of the continuum differed from currently dominant views.


Research programmes

Lakatos's second major contribution to the philosophy of science was his model of the "research programme", which he formulated in an attempt to resolve the perceived conflict between Popper's
falsificationism Falsificationism may refer to: * Critical rationalism, an epistemological philosophy founded by Karl Popper * Three models of scientific progress in "Falsification and the Methodology of Scientific Research Programmes" by Imre Lakatos ** Dogmatic ...
and the revolutionary structure of science described by
Kuhn Kuhn is a surname of German origin. It may refer to the following: * Abraham Kuhn (banker) (1819–1892), German-American founder of Kuhn, Loeb & Co. * Abraham Kuhn (otolarynologist) (1838–1900), Alsatian otolaryngologist * Adam Kuhn (1741–181 ...
. Popper's standard of falsificationism was widely taken to imply that a theory should be abandoned as soon as any evidence appears to challenge it, while Kuhn's descriptions of scientific activity were taken to imply that science is most fruitful during periods in which popular, or "normal", theories are supported despite known anomalies. Lakatos' model of the research programme aims to combine Popper's adherence to empirical validity with Kuhn's appreciation for conventional consistency. A Lakatosian research programme is based on a ''hard core'' of theoretical assumptions that cannot be abandoned or altered without abandoning the programme altogether. More modest and specific theories that are formulated in order to explain evidence that threatens the "hard core" are termed ''auxiliary hypotheses''. Auxiliary hypotheses are considered expendable by the adherents of the research programme—they may be altered or abandoned as empirical discoveries require in order to "protect" the "hard core". Whereas Popper was generally read as hostile toward such theoretical amendments, Lakatos argued that they can be ''progressive'', i.e. productive, when they enhance the programme's explanatory and/or predictive power, and that they are at least permissible until some better system of theories is devised and the research programme is replaced entirely. The difference between a ''progressive'' and a ''degenerative'' research programme lies, for Lakatos, in whether the recent changes to its auxiliary hypotheses have achieved this greater explanatory/predictive power or whether they have been made simply out of the necessity of offering some response in the face of new and troublesome evidence. A degenerative research programme indicates that a new and more progressive system of theories should be sought to replace the currently prevailing one, but until such a system of theories can be conceived of and agreed upon, abandonment of the current one would only further weaken our explanatory power and was therefore unacceptable for Lakatos. Lakatos's primary example of a research programme that had been successful in its time and then progressively replaced is that founded by
Isaac Newton Sir Isaac Newton (25 December 1642 – 20 March 1726/27) was an English mathematician, physicist, astronomer, alchemist, theologian, and author (described in his time as a "natural philosopher"), widely recognised as one of the grea ...
, with his three laws of motion forming the "hard core". The Lakatosian research programme deliberately provides a framework within which research can be conducted on the basis of "first principles" (the "hard core"), which are shared by those involved in the research programme and accepted for the purpose of that research without further proof or debate. In this regard, it is similar to Kuhn's notion of a paradigm. Lakatos sought to replace Kuhn's paradigm, guided by an irrational "psychology of discovery", with a research programme no less coherent or consistent, yet guided by Popper's objectively valid logic of discovery. Lakatos was following
Pierre Duhem Pierre Maurice Marie Duhem (; 9 June 1861 – 14 September 1916) was a French theoretical physicist who worked on thermodynamics, hydrodynamics, and the theory of elasticity. Duhem was also a historian of science, noted for his work on the Euro ...
's idea that one can always protect a cherished theory (or part of one) from hostile evidence by redirecting the criticism toward other theories or parts thereof. (See ''
Confirmation holism In philosophy of science, confirmation holism, also called epistemological holism, is the view that no individual statement can be confirmed or disconfirmed by an empirical test, but rather that only a set of statements (a whole theory) can be so. ...
'' and
Duhem–Quine thesis The Duhem–Quine thesis, also called the Duhem–Quine problem, after Pierre Duhem and Willard Van Orman Quine, is that in science it is impossible to experimentally test a scientific hypothesis in isolation, because an empirical test of the h ...
). This aspect of falsification had been acknowledged by Popper. Popper's theory, falsificationism, proposed that scientists put forward theories and that nature "shouts NO" in the form of an inconsistent observation. According to Popper, it is irrational for scientists to maintain their theories in the face of nature's rejection, as Kuhn had described them doing. For Lakatos, however, "It is not that we propose a theory and Nature may shout NO; rather, we propose a maze of theories, and nature may shout INCONSISTENT". The continued adherence to a programme's "hard core", augmented with adaptable auxiliary hypotheses, reflects Lakatos's less strict standard of falsificationism. Lakatos saw himself as merely extending Popper's ideas, which changed over time and were interpreted by many in conflicting ways. In his 1968 article "Criticism and the Methodology of Scientific Research Programmes",Lakatos, Imre. (1968). "Criticism and the Methodology of Scientific Research Programmes". ''Proceedings of the Aristotelian Society'' 69(1):149–186 (1968). Lakatos contrasted ''Popper0'', the "naive falsificationist" who demanded unconditional rejection of any theory in the face of any anomaly (an interpretation Lakatos saw as erroneous but that he nevertheless referred to often); ''Popper1'', the more nuanced and conservatively interpreted philosopher; and ''Popper2'', the "sophisticated methodological falsificationist" that Lakatos claims is the logical extension of the correctly interpreted ideas of ''Popper1'' (and who is therefore essentially Lakatos himself). It is, therefore, very difficult to determine which ideas and arguments concerning the research programme should be credited to whom. While Lakatos dubbed his theory "sophisticated methodological falsificationism", it is not "methodological" in the strict sense of asserting universal methodological rules by which all scientific research must abide. Rather, it is methodological only in that theories are only abandoned according to a methodical progression from worse theories to better theories—a stipulation overlooked by what Lakatos terms "dogmatic falsificationism". Methodological assertions in the strict sense, pertaining to which methods are valid and which are invalid, are, themselves, contained within the research programmes that choose to adhere to them, and should be judged according to whether the research programmes that adhere to them prove progressive or degenerative. Lakatos divided these "methodological rules" within a research programme into its "negative heuristics", i.e., what research methods and approaches to avoid, and its "positive heuristics", i.e., what research methods and approaches to prefer. While the "negative heuristic" protects the hard core, the "positive heuristic" directs the modification of the hard core and auxiliary hypotheses in a general direction. Lakatos claimed that not all changes of the auxiliary hypotheses of a research programme (which he calls "problem shifts") are equally productive or acceptable. He took the view that these "problem shifts" should be evaluated not just by their ability to defend the "hard core" by explaining apparent anomalies, but also by their ability to produce new facts, in the form of predictions or additional explanations. Adjustments that accomplish nothing more than the maintenance of the "hard core" mark the research programme as degenerative. Lakatos' model provides for the possibility of a research programme that is not only continued in the presence of troublesome anomalies but that remains progressive despite them. For Lakatos, it is essentially necessary to continue on with a theory that we basically know cannot be completely true, and it is even possible to make scientific progress in doing so, as long as we remain receptive to a better research programme that may eventually be conceived of. In this sense, it is, for Lakatos, an acknowledged misnomer to refer to "falsification" or "refutation", when it is not the truth or falsity of a theory that is solely determining whether we consider it "falsified", but also the availability of a ''less false'' theory. A theory cannot be rightfully "falsified", according to Lakatos, until it is superseded by a better (i.e. more progressive) research programme. This is what he says is happening in the historical periods Kuhn describes as revolutions and what makes them rational as opposed to mere leaps of faith or periods of deranged social psychology, as Kuhn argued.


Pseudoscience

According to the
demarcation Demarcation is the act of creating a boundary around a place or thing. Demarcation may also refer to: *Demarcation line, a temporary border between the countries *Demarcation problem, the question of which practices of doing science permit the re ...
criterion of
pseudoscience Pseudoscience consists of statements, beliefs, or practices that claim to be both scientific and factual but are incompatible with the scientific method. Pseudoscience is often characterized by contradictory, exaggerated or falsifiability, unfa ...
proposed by Lakatos, a theory is pseudoscientific if it fails to make any novel predictions of previously unknown phenomena or its predictions were mostly falsified, in contrast with scientific theories, which predict novel fact(s). Progressive scientific theories are those that have their novel facts confirmed, and degenerate scientific theories, which can degenerate so much that they become pseudo-science, are those whose predictions of novel facts are refuted. As he put it: : "A given fact is explained scientifically only if a new fact is predicted with it... The idea of growth and the concept of empirical character are soldered into one." See pages 34–35 of ''The Methodology of Scientific Research Programmes'', 1978. Lakatos's own key examples of pseudoscience were
Ptolemaic Ptolemaic is the adjective formed from the name Ptolemy, and may refer to: Pertaining to the Ptolemaic dynasty * Ptolemaic dynasty, the Macedonian Greek dynasty that ruled Egypt founded in 305 BC by Ptolemy I Soter * Ptolemaic Kingdom Pertaining ...
astronomy, Immanuel Velikovsky's planetary cosmogony,
Freud Sigmund Freud ( , ; born Sigismund Schlomo Freud; 6 May 1856 – 23 September 1939) was an Austrian neurologist and the founder of psychoanalysis, a clinical method for evaluating and treating pathologies explained as originating in conflicts in ...
ian
psychoanalysis PsychoanalysisFrom Greek: + . is a set of theories and therapeutic techniques"What is psychoanalysis? Of course, one is supposed to answer that it is many things — a theory, a research method, a therapy, a body of knowledge. In what might b ...
, 20th-century ''Soviet'' Marxism, Lysenko's biology, Niels Bohr's quantum mechanics post-1924,
astrology Astrology is a range of Divination, divinatory practices, recognized as pseudoscientific since the 18th century, that claim to discern information about human affairs and terrestrial events by studying the apparent positions of Celestial o ...
,
psychiatry Psychiatry is the medical specialty devoted to the diagnosis, prevention, and treatment of mental disorders. These include various maladaptations related to mood, behaviour, cognition, and perceptions. See glossary of psychiatry. Initial psych ...
, and
neoclassical economics Neoclassical economics is an approach to economics in which the production, consumption and valuation (pricing) of goods and services are observed as driven by the supply and demand model. According to this line of thought, the value of a good ...
.


Darwin's theory

In his 1973 Scientific Method Lecture 1 at the London School of Economics, he also claimed that "nobody to date has yet found a demarcation criterion according to which Darwin can be described as scientific". Almost 20 years after Lakatos's 1973 challenge to the scientificity of Darwin, in her 1991 ''The Ant and the Peacock'', LSE lecturer and ex-colleague of Lakatos,
Helena Cronin Helena Cronin (born 1942) is a British Darwinian philosopher and rationalist. She is the co-director of the Centre for Philosophy of Natural and Social Science and the Darwin Centre at the London School of Economics. Cronin's important work is ' ...
, attempted to establish that Darwinian theory was empirically scientific in respect of at least being supported by evidence of likeness in the diversity of life forms in the world, explained by descent with modification. She wrote that
our usual idea of corroboration as requiring the successful prediction of novel facts... Darwinian theory was not strong on temporally novel predictions. ... however familiar the evidence and whatever role it played in the construction of the theory, it still confirms the theory.


Rational reconstructions of the history of science

In his 1970 article "History of Science and Its Rational Reconstructions" Lakatos proposed a dialectical historiographical meta-method for evaluating different theories of scientific method, namely by means of their comparative success in explaining the actual
history of science The history of science covers the development of science from ancient times to the present. It encompasses all three major branches of science: natural, social, and formal. Science's earliest roots can be traced to Ancient Egypt and Meso ...
and
scientific revolution The Scientific Revolution was a series of events that marked the emergence of modern science during the early modern period, when developments in mathematics, physics, astronomy, biology (including human anatomy) and chemistry transfo ...
s on the one hand, whilst on the other providing a historiographical framework for rationally reconstructing the history of science as anything more than merely inconsequential rambling. The article started with his now renowned dictum "Philosophy of science without history of science is empty; history of science without philosophy of science is blind". However, neither Lakatos himself nor his collaborators ever completed the first part of this dictum by showing that in any scientific revolution the great majority of the relevant scientific community converted just when Lakatos's criterion – one programme successfully predicting some novel facts whilst its competitor degenerated – was satisfied. Indeed, for the historical case studies in his 1968 article "Criticism and the Methodology of Scientific Research Programmes" he had openly admitted as much, commenting: "In this paper it is not my purpose to go on seriously to the second stage of comparing
rational reconstruction Rational reconstruction is a philosophical term with several distinct meanings. It is found in the work of Jürgen Habermas and Imre Lakatos. Habermas For Habermas, rational reconstruction is a philosophical and linguistic method that systemat ...
s with actual history for any lack of historicity."


Criticism


Feyerabend

Paul Feyerabend argued that Lakatos's methodology was not a methodology at all, but merely "words that ''sound'' like the elements of a methodology". He argued that Lakatos's methodology was no different in practice from epistemological anarchism, Feyerabend's own position. He wrote in ''
Science in a Free Society ''Science in a Free Society'' is the 2nd full length book by the Austrian philosopher of science, Paul Feyerabend. It was published in 1978 by Schocken Books and later reprinted by Verso Books. While Feyerabend never published a second edition, V ...
'' (after Lakatos's death) that:
Lakatos realized and admitted that the existing standards of rationality, standards of logic included, were too restrictive and would have hindered science had they been applied with determination. He therefore permitted the scientist to violate them (he admits that science is not "rational" in the sense of ''these'' standards). However, he demanded that research programmes show certain features ''in the long run'' — they must be progressive... I have argued that this demand no longer restricts scientific practice. Any development agrees with it.
Lakatos and Feyerabend planned to produce a joint work in which Lakatos would develop a rationalist description of science, and Feyerabend would attack it. The correspondence between Lakatos and Feyerabend, where the two discussed the project, has since been reproduced, with commentary, by Matteo Motterlini.Motterlini, M. (1999). ''For and Against Method''. Chicago: UCP. .


See also

*
Scientific community metaphor In computer science, the scientific community metaphor is a metaphor used to aid understanding scientific communities. The first publications on the scientific community metaphor in 1981 and 1982 involved the development of a programming langu ...
, an approach to programming influenced by Lakatos's work on research programmes *
List of Soviet and Eastern Bloc defectors A ''list'' is any set of items in a row. List or lists may also refer to: People * List (surname) Organizations * List College, an undergraduate division of the Jewish Theological Seminary of America * SC Germania List, German rugby union ...
*
Lakatos Award The Lakatos Award is given annually for an outstanding contribution to the philosophy of science, widely interpreted. The contribution must be in the form of a monograph, co-authored or single-authored, and published in English during the previo ...
set up in memory of him


Notes


References

*Oxford
Dictionary of National Biography The ''Dictionary of National Biography'' (''DNB'') is a standard work of reference on notable figures from British history, published since 1885. The updated ''Oxford Dictionary of National Biography'' (''ODNB'') was published on 23 September ...
*Cronin, Helena (1991) ''The Ant and the Peacock'' Cambridge University Press *Howson, Colin, Ed. ''Method and Appraisal in the Physical Sciences: The Critical Background to Modern Science 1800–1905'' Cambridge University Press 1976 *Kampis, Kvaz & Stoltzner (eds.
''Appraising Lakatos: Mathematics, Methodology and the Man''
Vienna Circle Institute Library, Kluwer 2002 *Lakatos, Musgrave ed. (1970). ''Criticism and the Growth of Knowledge''. Cambridge: Cambridge University Press. *Lakatos (1976). ''Proofs and Refutations''. Cambridge: Cambridge University Press. *Lakatos (1978).
The Methodology of Scientific Research Programmes: Philosophical Papers Volume 1
'. Cambridge: Cambridge University Press *Lakatos (1978). ''Mathematics, Science and Epistemology: Philosophical Papers Volume 2''. Cambridge: Cambridge University Press. *Lakatos, I.: Cauchy and the continuum: the significance of nonstandard analysis for the history and philosophy of mathematics. Math. Intelligencer 1 (1978), no. 3, 151–161 (paper originally presented in 1966). *Lakatos, I., and Feyerabend P., ''For and against Method: including Lakatos's Lectures on Scientific Method and the Lakatos-Feyerabend Correspondence'', ed. by Matteo Motterlini, Chicago University Press, (451 pp), 1999, * Latsis, Spiro J. Ed. ''Method and Appraisal in Economics'' Cambridge University Press 1976 *Popper, K R, (1972), ''Objective knowledge: an evolutionary approach'', Oxford (Clarendon Press) 1972
bibliographic summary, no text
.
*
Maxwell, Nicholas Nicholas Maxwell (born 3 July 1937) is a British philosopher. Maxwell taught philosophy of science at University College London, where he is now Emeritus Reader. In 2003 he founded Friends of Wisdom. He has published fifteen books. He has pub ...
(2017
Karl Popper, Science and Enlightenment
UCL Press, London. Free online. *Zahar, Elie (1973) "Why Einstein's programme superseded Lorentz's", ''British Journal for the Philosophy of Science'' *Zahar, Elie (1988) ''Einstein's Revolution: A Study in Heuristic'', Open Court 1988


Further reading

*Alex Bandy (2010). ''Chocolate and Chess. Unlocking Lakatos''. Budapest: Akadémiai Kiadó. *Reuben Hersh (2006). ''18 Unconventional Essays on the Nature of Mathematics''. Springer. *Brendan Larvor (1998). ''Lakatos: An Introduction''. London: Routledge. *Jancis Long (1998). "Lakatos in Hungary", ''Philosophy of the Social Sciences'' 28, pp. 244–311. *John Kadvany (2001). ''Imre Lakatos and the Guises of Reason''. Durham and London: Duke University Press. ; author's web site
johnkadvany.com
*Teun Koetsier (1991). ''Lakatos' Philosophy of Mathematics: A Historical Approach. Amsterdam etc.: North Holland. *Szabó, Árpád ''The Beginnings of Greek Mathematics'' (Tr Ungar) Reidel & Akadémiai Kiadó, Budapest 1978


External links

*
''Science and Pseudoscience''
(Transcript and audio recording) – Lakatos' 1973
Open University The Open University (OU) is a British public research university and the largest university in the United Kingdom by number of students. The majority of the OU's undergraduate students are based in the United Kingdom and principally study off- ...
BBC Radio talk on the subject
Lakatos' profile page
at the London School of Economics (with audio recordings and references to further resources) *

The Autumn 2006 MIT Press journal ''Perspectives on Science'' devoted to articles on this topic, with article abstracts.
Official Russian page


Archives


Imre Lakatos's papers
are held at the London School of Economics. His personal is also held at the School. {{DEFAULTSORT:Lakatos, Imre 1922 births 1974 deaths 20th-century Hungarian male writers 20th-century Hungarian philosophers Academics of the London School of Economics Critical rationalists Hungarian communists Hungarian defectors Hungarian Jews 20th-century Hungarian mathematicians Hungarian philosophers Hungarian refugees Jewish philosophers Jewish refugees Moscow State University alumni Philosophers of mathematics Philosophers of science Stateless people University of Debrecen alumni Hungarian expatriates in the Soviet Union Hungarian emigrants to the United Kingdom