Biography:Francesco Severi

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Short description: Italian mathematician (1879–1961)
Francesco Severi
Francesco Severi.JPG
Born13 April 1879 (1879-04-13)
Arezzo, Italy
Died8 December 1961(1961-12-08) (aged 82)
Rome, Italy
Alma materUniversità di Torino, 1900
Known forAlgebraic geometry, several complex variables
AwardsGold medal of the Accademia Nazionale delle Scienze detta dei XL (1906)
Prix Bordin (1907) (jointly with Federigo Enriques)
Guccia Medal (1908)
"Premio reale" of the Accademia Nazionale dei Lincei (1913)
Scientific career
FieldsMathematics
InstitutionsUniversità di Torino, Università di Bologna, Università di Padova, Università di Roma, Istituto Nazionale di Alta Matematica (now Istituto Nazionale di Alta Matematica Francesco Severi)
Doctoral advisorCorrado Segre
Other academic advisorsEnrico d'Ovidio, Federigo Enriques, Eugenio Bertini
Doctoral studentsAldo Andreotti, Enzo Martinelli, Guido Zappa
Other notable studentsLuigi Fantappiè, Gaetano Fichera
Francesco Severi (photo by Konrad Jacobs)

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 algebraic geometry and the theory of functions of several complex variables. He became the effective leader of the Italian school of algebraic geometry. Together with Federigo Enriques, he won the Bordin prize from the French Academy of Sciences.

He contributed in a major way to birational geometry, the theory of algebraic surfaces, in particular of the curves lying on them, the theory of moduli spaces and the theory of functions of several complex variables. He wrote prolifically, and some of his work (following the intuition-led approach of Federigo Enriques) has subsequently been shown to be not rigorous according to the then new standards set in particular by Oscar Zariski and Andre Weil. Although many of his arguments have since been made rigorous, a significant fraction were not only lacking in rigor but also wrong (in contrast to the work of Enriques, which though not rigorous was almost entirely correct). At the personal level, according to (Roth 1963) he was easily offended, and he was involved in a number of controversies. Most notably, he was a staunch supporter of the Italian fascist regime of Benito Mussolini and was included on a committee of academics that was to conduct an anti-semitic purge of all scholarly societies and academic institutions.[1]

Biography

His childhood was marked by the death of his father, which occurred when he was 9 years old. This had serious economic repercussions on their family. Although he had to earn a living while conducting private lessons, Francesco Severi managed to continue his studies and enroll in the engineering course at the University of Turin. Due to the influence of courses by Corrado Segre, Severi quickly found a passion for pure mathematics.

In 1900, he completed his training with a thesis in the geometry of numbers, which would later become his favorite subject.

After his thesis, he became assistant to Enrico D'Ovidio at the University of Turin and from 1902 to 1905, he was a lecturer in projective and descriptive geometry. But soon, he obtained his transfer to the University of Bologna as assistant to Federigo Enriques. Then at the University of Pisa as assistant to Eugenio Bertini.

In 1904, in consideration of the results he obtained in the geometry of numbers (founding the theory of birational invariants of algebraic surfaces), he obtained the chair of projective and descriptive geometry at the University of Parma. However, he spent a year at the University of Padua. where, he teaches different subjects, and takes the direction of the engineering unit.

In 1906, he obtained a theorem of existence of algebraic curves drawn on certain types of surfaces, thus beginning the search for the classification of rational surfaces.[2]

Mobilized during World War I, Severi enlisted in the artillery.

In 1921, he obtained the chair of algebraic geometry at La Sapienza University in Rome.

In 1923, he was elected rector of this university. But in 1925, following the assassination of the socialist politician Matteotti, he gave up his duties as rector. Nevertheless, Severi would remain without reaction against fascism and would accept the application of the racial laws.

In 1938, Severi was one of the founders of the Istituto Nazionale di Alta Matematica. Oscar Zariski is one of his most famous students.

In 1959, he converted to Catholicism and published his autobiography Dalla scienza alla fede (1959), he repents of his lack of political discernment

Mathematics is the art of giving the same name to various things, and mathematicians often make mistakes in politics, because it is, conversely, the art of giving different names to identical things.

During his career, Severi received numerous awards, including the Gold Medal of the National Academy of Sciences and, together with Federigo Enriques, the Bordin Prize of the Paris Academy of Sciences (this award, created in 1835 by Charles-Laurent Bordin is a biennial prize awarded to authors of works on subjects of public interest).

He was member of numerous Italian and foreign academies, including the Accademia dei Lincei in 1910 and the Accademia delle Scienze di Torino in 1918.

Selected publications

His scientific production includes more than 400 publications and numerous treatises. All the mathematical works of Francesco Severi, except all books, are collected in the six volumes of his "Opere Matematiche".

Articles on Scientia

Reviews

See also

References

  1. Goodstein, Judith; Babbitt, Donald (2012). "A Fresh Look at Francesco Severi". Notices of the American Mathematical Society 59 (8): 1064. doi:10.1090/noti881. 
  2. Severi, Francesco (1906-06-01). "Sulla totalità delle curve algebriche tracciate sopra una superficie algebrica" (in it). Mathematische Annalen 62 (2): 194–225. doi:10.1007/BF01449978. ISSN 1432-1807. https://doi.org/10.1007/BF01449978. 

Biographical and general references

Scientific references

  • Accademia delle Scienze di Torino, ed. (1982), "Atti del convegno matematico in celebrazione del centenario nascita di Guido Fubini e Francesco Severi. Torino, 8–10 Ottobre 1979", Atti dell'Accademia delle Scienze di Torino. I. Classe di Scienze Fisiche, Matematiche e Naturali (Torino: Accademia delle Scienze di Torino) 115 (Supplemento): 243 . The "Proceedings of the mathematical conference for the celebration of the centenary of the birth of Guido Fubini and Francesco Severi", including several research as well as historical papers describing the contributions of Guido Fubini and Fracesco Severi to various branches of pure and applied mathematics: the conference was held on 8–10 October 1979 at the Accademia delle Scienze di Torino.
  • Fichera, Gaetano (1982), "I contributi di Guido Fubini e di Francesco Severi alla teoria delle funzioni di più variabili complesse", Atti del convegno matematico in celebrazione del centenario nascita di Guido Fubini e Francesco Severi. Torino, 8–10 Ottobre 1979, Atti dell'Accademia delle Scienze di Torino. I. Classe di Scienze Fisiche, Matematiche e Naturali, 115, Torino: Accademia delle Scienze di Torino, pp. 23–44 . In the paper "The contributions of Guido Fubini and Francesco Severi to the theory of functions of several complex variables" (English translation of the title), Gaetano Fichera describes the main contributions of the two scientists to the Cauchy and the Dirichlet problem for holomorphic functions of several complex variables, as well as the impact of their work on subsequent researches.
  • Fichera, Gaetano (1991), "I teoremi di Severi e Severi-Kneser per le funzioni analitiche più variabili complesse e loro ulteriori sviluppi", Recenti sviluppi in analisi matematica e sue applicazioni. Atti del convegno internazionale dedicato al Prof. G. Aquaro in occasione del suo 70º compleanno, Conferenze del Seminario di Matematica dell'Università di Bari, 237-244, Bari: Laterza, pp. 13–25 . "The Severi and Severi–Kneser theorems for analytic functions of several complex variables and their further developments" (English translation of the title) is an historical survey paper on the Cauchy and the Dirichlet problem for holomorphic functions of several complex variables, updating the earlier work (Fichera 1982).
  • Fichera, Gaetano (1995), "Tre battaglie perdute da tre grandi matematici italiani" (in it), Atti del convegno di studi in memoria di Giuseppe Gemignani. Modena, 20 maggio 1994, Collana di Studi dell'Accademia, 11, Modena: Enrico Mucchi Editore on behalf of the Accademia Nazionale di Scienze, Lettere e Arti di Modena, pp. 9–28 . This paper, included in the Proceedings of the Study Meeting in Memory of Giuseppe Gemignani, is an account of the failures of Vito Volterra, Leonida Tonelli and Francesco Severi, when dealing with particular research problems during their career. An English translation of the title reads as:-"Three battles lost by three great Italian mathematicians".
  • Galletto, Dionigi (1982), "Il pensiero di Einstein nell'opera di Guido Fubini e Francesco Severi", Atti del convegno matematico in celebrazione del centenario nascita di Guido Fubini e Francesco Severi. Torino, 8–10 Ottobre 1979, Atti dell'Accademia delle Scienze di Torino. I. Classe di Scienze Fisiche, Matematiche e Naturali, 115, Torino: Accademia delle Scienze di Torino, pp. 205–216 . In the paper "The thought of Einstein in the work of Guido Fubini and Francesco Severi" (English translation of the title), Dionigi Galletto describes the main contributions of the two scientists to special and general relativity.
  • Range, R. Michael (2002), "Extension phenomena in multidimensional complex analysis: correction of the historical record", The Mathematical Intelligencer 24 (2): 4–12, doi:10.1007/BF03024609 . In this paper, R. Michael Range corrects some inexact historical statements in the theory of holomorphic functions of several variables, particularly concerning contributions of Gaetano Fichera and Francesco Severi.
  • Range, R. Michael (2010), "Some landmarks in the history of the tangential Cauchy Riemann equations", Rendiconti di Matematica e delle sue Applicazioni 30 (3–4): 275–283, http://www.mat.uniroma1.it/ricerca/rendiconti/2010%283-4%29/275-283.pdf . An historical paper exploring further the same topic previously dealt in the paper (Range 2002) by the same author.

External links