Renato Caccioppoli (; 20 January 1904 – 8 May 1959) was an Italian

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

, known for his contributions to

mathematical analysis Analysis is the branch of mathematics dealing with continuous functions, limits, and related theories, such as differentiation, integration, measure, infinite sequences, series, and analytic functions. These theories are usually studied ...

, including the theory of functions of several complex variables,

functional analysis Functional analysis is a branch of mathematical analysis, the core of which is formed by the study of vector spaces endowed with some kind of limit-related structure (e.g. inner product, norm, topology, etc.) and the linear functions defi ...

measure theory In mathematics, the concept of a measure is a generalization and formalization of geometrical measures (length, area, volume) and other common notions, such as mass and probability of events. These seemingly distinct concepts have many simila ...

Life and career

Born in

Naples Naples (; it, Napoli ; nap, Napule ), from grc, Νεάπολις, Neápolis, lit=new city. is the regional capital of Campania and the third-largest city of Italy, after Rome and Milan, with a population of 909,048 within the city's adm ...

, he was the son of Giuseppe Caccioppoli (1852–1947), a

surgeon In modern medicine, a surgeon is a medical professional who performs surgery. Although there are different traditions in different times and places, a modern surgeon usually is also a licensed physician or received the same medical training as ...

, and his second wife Sofia Bakunin (1870–1956), daughter of the Russian revolutionary

Mikhail Bakunin Mikhail Alexandrovich Bakunin (; 1814–1876) was a Russian revolutionary anarchist, socialist and founder of collectivist anarchism. He is considered among the most influential figures of anarchism and a major founder of the revolutionary s ...

. After earning his high-school diploma in 1921, he enrolled in the department of engineering to swap to mathematics in November 1923. Immediately after earning his

laurea In Italy, the ''laurea'' is the main post-secondary academic degree. The name originally referred literally to the laurel wreath, since ancient times a sign of honor and now worn by Italian students right after their official graduation ceremony ...

in 1925, he became the assistant of Mauro Picone, who in that year was called to the

University of Naples The University of Naples Federico II ( it, Università degli Studi di Napoli Federico II) is a public university in Naples, Italy. Founded in 1224, it is the oldest public non-sectarian university in the world, and is now organized into 26 depar ...

, where he remained until 1932. Picone immediately discovered Caccioppoli's brilliance and pointed him towards research in

. During the following five years, Caccioppoli published about 30 works on topics developed in the complete autonomy provided by a ministerial award for mathematics in 1931, a competition he won at the age of 27 and the chair of algebraic analysis at the

University of Padova The University of Padua ( it, Università degli Studi di Padova, UNIPD) is an Italian university located in the city of Padua, region of Veneto, northern Italy. The University of Padua was founded in 1222 by a group of students and teachers fro ...

. In 1934 he returned to Naples to accept the chair in

group theory In abstract algebra, group theory studies the algebraic structures known as groups. The concept of a group is central to abstract algebra: other well-known algebraic structures, such as rings, fields, and vector spaces, can all be seen ...

; later he took the chair of superior analysis, and from 1943 onwards, the chair in mathematical analysis. In 1931 he became a correspondent member of the Academy of Physical and Mathematical Sciences of Naples, becoming an ordinary member in 1938. In 1944 he became an ordinary member of the

Accademia Pontaniana The Accademia Pontaniana was the first academy in the modern sense, as a learned society for scholars and humanists and guided by a formal statute. Patronized by Alfonso V of Aragon, it was founded by the poet Antonio Beccadelli in Naples during ...

, and in 1947 a correspondent member of the

Accademia Nazionale dei Lincei The Accademia dei Lincei (; literally the "Academy of the Lynx-Eyed", but anglicised as the Lincean Academy) is one of the oldest and most prestigious European scientific institutions, located at the Palazzo Corsini on the Via della Lungara in Rom ...

, and a national member in 1958. He was also a correspondent member of the Paduan Academy of Sciences, Letters, and Arts. In the years from 1947 to 1957 he directed, together with

Carlo Miranda Carlo Miranda (15 August 1912 – 28 May 1982) was an Italian mathematician, working on mathematical analysis, theory of elliptic partial differential equations and complex analysis: he is known for giving the first proof of the Poincaré–Mi ...

, the journal ''Giornale di Matematiche'', founded by

Giuseppe Battaglini __NOTOC__ Giuseppe Battaglini (11 January 1826 – 29 April 1894) was an Italian mathematician.D'Ovidio (1895). He studied mathematics at the Scuola d'Applicazione di Ponti e Strade (School of Bridges and Roads) of Naples. In 1860 he was appoint ...

. In 1948 he became a member of the editing committee of ''Annali di Matematica'', and starting in 1952 he was also a member of the editing committee of ''Ricerche di Matematica''. In 1953 the Academia dei Lincei bestowed on him the national prize of physical, mathematical, and natural sciences. He was an excellent

pianist A pianist ( , ) is an individual musician who plays the piano. Since most forms of Western music can make use of the piano, pianists have a wide repertoire and a wide variety of styles to choose from, among them traditional classical music, ja ...

, noted as well for his nonconformist temperament. He tried out the vagrant life, and was arrested for begging. In May 1938 he gave a speech against

Adolf Hitler Adolf Hitler (; 20 April 188930 April 1945) was an Austrian-born German politician who was dictator of Germany from 1933 until his death in 1945. He rose to power as the leader of the Nazi Party, becoming the chancellor in 1933 and the ...

and

Benito Mussolini Benito Amilcare Andrea Mussolini (; 29 July 188328 April 1945) was an Italian politician and journalist who founded and led the National Fascist Party. He was Prime Minister of Italy from the March on Rome in 1922 until his deposition in ...

, when the latter was visiting Naples. Together with his companion Sara Mancuso, he had the French national

anthem An anthem is a musical composition of celebration, usually used as a symbol for a distinct group, particularly the national anthems of countries. Originally, and in music theory and religious contexts, it also refers more particularly to short s ...

played by an orchestra, after which he began to speak against

fascism Fascism is a far-right, authoritarian, ultra-nationalist political ideology and movement,: "extreme militaristic nationalism, contempt for electoral democracy and political and cultural liberalism, a belief in natural social hierarchy and t ...

and

Nazism 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) i ...

in the presence of OVRA agents. He was again arrested, but his aunt, Maria Bakunin, who at the time was a professor of chemistry at the

, succeeded in having him released by convincing the authorities that her nephew was ''

non compos mentis ''Non compos mentis'' is a Latin legal phrase that translates to "of unsound mind": ''nōn'' ("not") prefaces ''compos mentis'', meaning "having control of one's mind." This phrase was first used in thirteenth-century English law to describe peop ...

''. Thus Caccioppoli was interned, but he continued his studies in mathematics, and playing the piano. In his last years, the disappointments of

politics Politics (from , ) is the set of activities that are associated with making decisions in groups, or other forms of power relations among individuals, such as the distribution of resources or status. The branch of social science that studies ...

and his wife's desertion, together perhaps with the weakening of his mathematical vein, pushed him into

alcoholism Alcoholism is, broadly, any drinking of alcohol that results in significant mental or physical health problems. Because there is disagreement on the definition of the word ''alcoholism'', it is not a recognized diagnostic entity. Predomi ...

. His growing instability had sharpened his "strangenesses", to the point that the news of his suicide on May 8, 1959 by a headshot did not surprise those who knew him. He died at his home in

Palazzo Cellamare The Palazzo Cellamare or Cellammare is a monumental palace located in via Chiaia 139 in the Quartiere San Ferdinando of Naples, Italy. The entrance is near the church of Santa Caterina a Chiaia. History The palace was erected in the 16th century ...

Work

His most important works, out of a total of around eighty publications, relate to

and the

calculus of variations The calculus of variations (or Variational Calculus) is a field of mathematical analysis that uses variations, which are small changes in functions and functionals, to find maxima and minima of functionals: mappings from a set of functions t ...

. Beginning in 1930 he dedicated himself to the study of

differential equation In mathematics, a differential equation is an equation that relates one or more unknown functions and their derivatives. In applications, the functions generally represent physical quantities, the derivatives represent their rates of change, ...

s, the first to use a topological-functional approach. Proceeding in this way, in 1931 he extended the

Brouwer fixed point theorem Brouwer's fixed-point theorem is a fixed-point theorem in topology, named after L. E. J. (Bertus) Brouwer. It states that for any continuous function f mapping a compact convex set to itself there is a point x_0 such that f(x_0)=x_0. The simplest ...

, applying the results obtained both from ordinary differential equations and partial differential equations. In 1932 he introduced the general concept of inversion of functional correspondence, showing that a transformation between two

Banach space In mathematics, more specifically in functional analysis, a Banach space (pronounced ) is a complete normed vector space. Thus, a Banach space is a vector space with a metric that allows the computation of vector length and distance between vector ...

s is invertible only if it is locally invertible and if the only convergent sequences are the compact ones. Between 1933 and 1938 he applied his results to

elliptic equation An elliptic equation can mean: * The equation of an ellipse * An elliptic curve, describing the relationships between invariants of an ellipse * A differential equation with an elliptic operator * An elliptic partial differential equation Second ...

s, establishing the majorizing limits for their solutions, generalizing the two-dimensional case of Felix Bernstein. At the same time he studied

analytic function In mathematics, an analytic function is a function that is locally given by a convergent power series. There exist both real analytic functions and complex analytic functions. Functions of each type are infinitely differentiable, but complex ...

s of

several complex variables The theory of functions of several complex variables is the branch of mathematics dealing with complex-valued functions. The name of the field dealing with the properties of function of several complex variables is called several complex variable ...

, that is, analytic functions whose

domain Domain may refer to: Mathematics *Domain of a function, the set of input values for which the (total) function is defined ** Domain of definition of a partial function ** Natural domain of a partial function **Domain of holomorphy of a function * ...

belongs to the vector space , proving in 1933 the fundamental theorem on normal families of such functions: if a family is normal with respect to every complex variable, it is also normal with respect to the set of the variables. He also proved a logarithmic residue formula for functions of two complex variables in 1949. In 1935 Caccioppoli proved the analyticity of class solutions of elliptic equations with analytic coefficients. The year 1952 saw the publication of his masterwork on the area of a surface and

, the article ''Measure and integration of dimensionally oriented sets'' (''Misura e integrazione degli insiemi dimensionalmente orientati'', Rendiconti dell'

, s. VIII, v.12). The article is mainly concerned with the theory of dimensionally oriented sets; that is, an interpretation of surfaces as oriented boundaries of sets in space. Also in this paper, the family of sets approximable by polygonal domains of finite perimeter, known today as

Caccioppoli set In mathematics, a Caccioppoli set is a set whose boundary is measurable and has (at least locally) a ''finite measure''. A synonym is set of (locally) finite perimeter. Basically, a set is a Caccioppoli set if its characteristic function is a f ...

s or sets of finite perimeter, was introduced and studied. His last works, produced between 1952 and 1953, deal with a class of

pseudoanalytic function In mathematics, pseudoanalytic functions are functions introduced by that generalize analytic functions and satisfy a weakened form of the Cauchy–Riemann equations. Definitions Let z=x+iy and let \sigma(x,y)=\sigma(z) be a real-valued functi ...

s, introduced by him to extend certain properties of

Legacy

In 1992 his tormented personality inspired the plot of a film directed by

Mario Martone Mario Martone (born 20 November 1959) is an Italian film director and screenwriter. He has directed more than 30 films since 1985. His film ''L'amore molesto'' was entered into the 1995 Cannes Film Festival. His 2010 film '' Noi credevamo'' co ...

, '' The Death of a Neapolitan Mathematician'' ('' Morte di un matematico napoletano''), in which he was portrayed by

Carlo Cecchi Carlo Cecchi (born 25 January 1939 in Florence, Tuscany, Italy) is an Italian actor. Born in Florence, Cecchi studied under the Living Theatre and with the Workshop of Eduardo De Filippo. In 1968, he made his debut for cinema in '' La sua gior ...

. An

asteroid An asteroid is a minor planet of the inner Solar System. Sizes and shapes of asteroids vary significantly, ranging from 1-meter rocks to a dwarf planet almost 1000 km in diameter; they are rocky, metallic or icy bodies with no atmosphere. ...

, 9934 Caccioppoli, has been named after him.

Selected publications

* (Volume 1) AND (Volume 2). His "''Selected works''", a selection from Caccioppoli's scientific works with a biography and a commentary.

References

Biographical and general references

This article is based largely on material from the equivalent article on Italian Wikipedia, accessed 4 March 2006, and also on the following biographical works: *. the chapter on Caccioppoli in a book collecting brief biographical sketches and bibliographies of the scientific works produced by the mathematicians who taught at the Parthenope University of Naples during their stay. *. The recollections on him by one of his

colleague Collegiality is the relationship between colleagues. A colleague is a fellow member of the same profession. Colleagues are those explicitly united in a common purpose and respect each other's abilities to work toward that purpose. A colleague is ...

s and close friend. *. An ample biographical paper on him written by Carlo Sbordone, pupil of Federico Cafifiero. *. A brief obituary, basically announcing the commemoration of his scientific work published in the following issue 4 of the same Bulletin. *. A survey on his research work published in the UMI Bulletin: even if no author is stated, attributes the article to

Gianfranco Cimmino Gianfranco Cimmino (12 March 1908 – 30 May 1989) was an Italian mathematician, working mathematical analysis, numerical analysis, and theory of elliptic partial differential equations: he is known for being the first mathematician generalizing ...

References describing his scientific contributions

*. en, italic=yes, "Real analysis and measure theory in Naples: R. Caccioppoli, C. Miranda and F. Cafiero" is the opening address of the 1988 academic year of the Società Nazionale di Scienze, Lettere ed Arti in Napoli: it describes the contributions of Caccioppoli, Miranda and Cafiero to real analysis and measure theory during their stay in Naples. * (reviews of the symposium paper, see below). This paper, en, italic=yes, "Measure theory in Naples: Renato Caccioppoli", is a reprint of the contribution of Paulo de Lucia from the "''International Symposium Renato Caccioppoli''" held in Napoli on 20–22 September 1989 and describes Caccioppoli's and Cafiero's contributions to the development of Measure Theory. The collection includes other papers detailing Caccioppoli's personality and his research, the introduction to his "''Opere scelte''" (Selected works), a conference held by Caccioppoli himself and related letters by

, Giovanni Prodi and

Francesco Severi Francesco Severi (13 April 1879 – 8 December 1961) was an Italian mathematician. He was the chair of the committee on Fields Medal on 1936, at the first delivery. Severi was born in Arezzo, Italy. He is famous for his contributions to algebr ...

. *. A prize winning monograph where Cafiero first states and proves his convergence theorem. *. A Definitive monograph on integration and measure theory: the treatment of the limiting behavior of the integral of various kind of

sequences In mathematics, a sequence is an enumerated collection of objects in which repetitions are allowed and order matters. Like a set, it contains members (also called ''elements'', or ''terms''). The number of elements (possibly infinite) is called t ...

of measure-related structures (measurable functions, measurable sets, measures and their combinations) is somewhat conclusive. *. The work of Cesari summarizing the theory of surface area, including his own contributions. *. *.

Publications dedicated to him or to his memory

*. This is a collection of papers detailing his personality and his research, which includes the introduction to his "''Opere scelte''" (Selected works), a list of contributions from the "''International Symposium Renato Caccioppoli''" held in Napoli on September 20–22, 1989, a conference held by Caccioppoli himself and related letters by