Michele de Franchis explained

Birth Date:April 6, 1875
Birth Place:Palermo, Italy
Death Date:February 19, 1946
Death Place:Palermo, Italy
Nationality:Italian
Fields:Mathematics
Workplaces:University of Cagliari
University of Parma
University of Catania
Alma Mater:University of Palermo

Michele de Franchis (6 April 1875, Palermo – 19 February 1946, Palermo) was an Italian mathematician, specializing in algebraic geometry. He is known for the De Franchis theorem and the Castelnuovo–de Franchis theorem.

He received his laurea in 1896 from the University of Palermo, where he was taught by Giovanni Battista Guccia and Francesco Gerbaldi. De Franchis was appointed in 1905 Professor of Algebra and Analytic Geometry at the University of Cagliari and then in 1906 moved to the University of Parma, where he was appointed professor of Projective and Descriptive Geometry and remained until 1909. From 1909 to 1914 he was a professor at the University of Catania. In 1914, upon the death of Guccia, he was appointed as Guccia's successor in the chair Analytic and Projective Geometry at the University of Palermo.[1]

In 1909 Michele de Franchis and Giuseppe Bagnera were awarded the Prix Bordin of the Académie des Sciences of Paris for their work on hyperelliptic surfaces.[2] De Franchis and Bagnera were Invited Speakers at the ICM in 1908 in Rome.[3] [4]

Among de Franchis's students are Margherita Beloch, Maria Ales, and Antonino Lo Voi.[5]

External links

Notes and References

  1. [Oscar Chisini]
  2. Prize Awards of the Paris Academy of Sciences. Nature. 6 January 1910. 82. 2097. 293.
  3. Book: Bagnera, G.. De Franchis, M.. Sopra le equazioni algebriche F(X,Y,Z) = 0 che si lasciano risolvere con X,Y,Z funzioni quadruplamente periodiche di due parametri. G. Castelnuovo. Atti del IV Congresso Internazionale dei Matematici (Roma, 6–11 Aprile 1908). 1909. 2. 242–248. https://babel.hathitrust.org/cgi/pt?id=miun.aag4063.0082.001;view=1up;seq=242.
  4. Book: Bagnera, G.. De Franchis, M.. Intorno alle superficie regolari di genere uno che ammettono una rappresentazione parametrica mediante funzioni iperellitiche di due argomenti. 249–256. 2. Atti del IV Congresso internazionale dei matematici (Roma, 6–11 Aprile 1908). https://babel.hathitrust.org/cgi/pt?id=miun.aag4063.0082.001;view=1up;seq=249.
  5. http://math.unipa.it/%7Ebrig/sds/prima%20pagina/tirocinio/De%20Franchis%20Michele.htm Michele De Franchis, math.unipa.it