Pietro Corvaja
Pietro Corvaja | |
---|---|
Born | |
Nationality | Italian |
Alma mater | Pierre and Marie Curie University Scuola Normale Superiore di Pisa University of Pisa |
Scientific career | |
Fields | Mathematics |
Institutions | University of Udine |
Thesis | Approximation diophantienne sur la droite (1995) |
Doctoral advisor | Michel Waldschmidt Michel Laurent |
Pietro Corvaja (born 19 July 1967 in Padua, Italy)[1] is an Italian mathematician working in Diophantine geometry. He is a professor of geometry at the University of Udine.[2][3]
Early life and education
[edit]Corvaja was born in Padua, Italy on 19 July 1967.[1] He graduated with a scientific high school diploma from a liceo scientifico in 1985,[1] before enrolling in the University of Pisa as a student of the Scuola Normale Superiore di Pisa.[1] He graduated from the Scuola Normale with an undergraduate thesis on the theory of transcendental numbers under the direction of Roberto Dvornicich in 1989.[1][4]
After a one year scholarship at INdAM from 1989 to 1990, Corvaja completed his PhD under Michel Waldschmidt and Michel Laurent at Pierre and Marie Curie University in 1995.[5][1] From 1994 to 1995, he was also a research assistant at the Università Iuav di Venezia as a collaborator of Umberto Zannier.[1] In 2001, Corvaja obtained his habilitation qualification at Pierre and Marie Curie University.[1]
Career
[edit]In 1995, Corvaja became a researcher at the University of Udine.[1] From 1997 to 1998, he was a member of the Institute for Advanced Study under the direction of Enrico Bombieri.[6][1] In 2002, Corvaja became an associate professor of algebra at the University of Udine.[1] Since 2005, he has been a professor of geometry at the University of Udine.[1][4]
Corvaja is the coordinator of the mathematics program and the vice director of the Scuola Superiore (School of Excellence) of the University of Udine.[7][1][8]
Research
[edit]Corvaja and Zannier gave a new proof of Siegel's theorem on integral points in 2002 by using a new method based on the subspace theorem.[9]
Awards
[edit]Corvaja was inducted into the Istituto Veneto di Scienze, Lettere ed Arti on 26 May 2016.[1]
Selected publications
[edit]- with J. Noguchi: A new unicity theorem and Erdős' problem for polarized semi-abelian varieties, Math. Ann., vol. 353, no. 2 (2012), pp. 439–464.
- with U. Zannier: A subspace theorem approach to integral points on curves, Compte Rendu Acad. Sci., vol. 334, 2002, pp. 267–271 doi:10.1016/S1631-073X(02)02240-9
- with U. Zannier: Finiteness of Integral Values for the Ratio of Two Linear Recurrences, Inventiones Mathematicae, vol. 149, 2002, pp. 431–451. doi:10.1007/s002220200221
- with U. Zannier: On Integral Points on Surfaces, Annals of Mathematics, Vol. 160, 2004, pp. 705–726. arXiv preprint
- with U. Zannier: On the rational approximations to the powers of an algebraic number: solution of two problems of Mahler and Mendès France, Acta Mathematica, vol. 193, no. 2, 2004, pp. 175–191. doi:10.1007/BF02392563
- with U. Zannier: Some cases of Vojta's conjecture on integral points over function fields, Journal of Algebraic Geometry, vol. 17, 2008, pp. 295–333. arXiv preprint
References
[edit]- ^ a b c d e f g h i j k l m n "Pietro Corvaja" (in Italian). Istituto Veneto di Scienze, Lettere ed Arti. Retrieved 13 January 2020.
- ^ "Pietro Corvaja" (in Italian). University of Udine, Dipartimento di Scienze, Matematiche Informatiche e fisiche. Retrieved 13 January 2020.
- ^ "Pietro Corvaja" (in Italian). University of Udine. Retrieved 13 January 2020.
- ^ a b ORCID 0000-0001-8762-4163
- ^ Pietro Corvaja at the Mathematics Genealogy Project
- ^ "Pietro Corvaja". Institute for Advanced Study. Retrieved 13 January 2020.
- ^ "Università di Udine: porte aperte alla future matricole" [University of Udine: doors open to future freshmen] (in Italian). Controcampus. 12 March 2014. Retrieved 13 January 2020.
Il programma dell'incontro prevede i saluti della direttrice dell'istituto, Donata Levi, e del vice direttore, Pietro Corvaja, che presenterà la Scuola.
- ^ "Organi direttivi" (in Italian). School of Excellence of the University of Udine. Retrieved 13 January 2020.
- ^ Corvaja, P. and Zannier, U. "A subspace theorem approach to integral points on curves", Compte Rendu Acad. Sci., 334, 2002, pp. 267–271 doi:10.1016/S1631-073X(02)02240-9