Corrado Segre Explained

Corrado Segre should not be confused with Beniamino Segre.

Corrado Segre
Birth Date:1863 8, df=yes
Birth Place:Saluzzo, Italy
Death Place:Turin, Italy
Nationality:Italian
Field:Mathematics
Doctoral Students:Gino FanoBeppo LeviBeniamino SegreFrancesco Severi
Known For:Segre classification
Segre cubic
Segre embedding
Segre surface
Zeuthen–Segre invariant

Corrado Segre (20 August 1863 – 18 May 1924) was an Italian mathematician who is remembered today as a major contributor to the early development of algebraic geometry.[1]

Early life

Corrado's parents were Abramo Segre and Estella De Benedetti.

Career

Segre developed his entire career at the University of Turin, first as a student of Enrico D'Ovidio. In 1883 he published a dissertation on quadrics in projective space and was named an assistant to professors in algebra and analytic geometry. In 1885 he also assisted in descriptive geometry. He began to instruct in projective geometry, as a stand-in for Giuseppe Bruno, from 1885 to 1888. Then for 36 years, he had the chair in higher geometry following D'Ovidio. Segre and Giuseppe Peano made Turin known in geometry, and their complementary instruction has been noted as follows:[2]

The Erlangen program of Felix Klein appealed early on to Segre, and he became a promulgator. First, in 1885 he published an article on conics in the plane where he demonstrated how group theory facilitated the study. As Hawkins says (page 252) "the totality of all conics in the plane is identified with P5(C)". The group of its projectivities is then the group that permutes conics. About Segre, Hawkins writes[3]

The inspiring Geometrie der Lage (1847) of Karl Georg Christian von Staudt provided Segre with another project. He encouraged Mario Pieri to make a translation, Geometria di Posizione (1889), while Segre composed a biographical sketch of von Staudt that was included in the publication.

Segre also expanded algebraic geometry by consideration of multicomplex numbers, in particular the bicomplex numbers. Segre's 1892 contribution to Mathematische Annalen shows him extending the work of William Rowan Hamilton and William Kingdon Clifford on biquaternions. But Segre was unaware of an earlier study of tessarines that had anticipated his bicomplex numbers.

In English, the best-known work of Segre is an inspirational essay meant for Italian students, translated by J.W. Young in 1904. It provides guidance and encouragement to young people studying mathematics.

In a 1926 memorial article, H.F. Baker called Segre the "father of" the Italian school of algebraic geometry.

The 1912 article "Higher-dimensional Spaces" (Mehrdimensionale Räume[4]) for Enzyklopädie der mathematischen Wissenschaften spanned 200 pages.[5] In admiration, Baker (1926) wrote and Coolidge (1927) reiterated: For completeness of detail, breadth of view, and generous recognition of the work of a host of other writers, this must remain for many years a monument of the comprehensiveness of the man.

References

Notes and References

  1. Book: American Mathematical Society. Bulletin of the American Mathematical Society. Society. 1924. 7 October 2018. 571. Professor Corrado Segre, of the University of Turin, distinguished for his work in geometry, died May 18, 1924, at the ....
  2. Maurizio Avellone, Aldo Brigaglia & Carmela Zappulla (2002) "The Foundations of Projective Geometry in Italy from De Paolis to Pieri", Archive for History of Exact Sciences 56:363–425, esp 378
  3. Thomas Hawkins (2000) Emergence of the Theory of Lie Groups: an essay in the history of mathematics, 1869 – 1926, Springer
  4. Corrado Segre (1912) Mehrdimensionale Räume, Enzyklopädie der mathematischen Wissenschaften, weblink to University of Göttingen
  5. Hollcroft, T. R.. Review: Mehrdimensionale Räume, by C. Segre. Bull. Amer. Math. Soc.. 1936. 42. 1, Part 2. 5–6. 10.1090/s0002-9904-1936-06226-9. free.