Adrian Ioviță

Adrian Ioviță (born 28 June 1954)^[1] is a Romanian-Canadian mathematician, specializing in arithmetic algebraic geometry and p-adic cohomology theories.

Adrian Iovita
Born	(1954-06-28) June 28, 1954 (age 70) Timișoara, Romania
Alma mater	Boston University University of Bucharest
Awards	Ribenboim Prize (2008)
Scientific career
Fields	Mathematics
Institutions	Concordia University University of Washington McGill University
Theses	p-adic Cohomology of Abelian Varieties  (1996) On local classfield theory  (1991)
Doctoral advisor	Glenn Stevens (1996) Nicolae Popescu (1991)

Education

Born in Timișoara, Romania,^[1] Iovita received in 1978 his undergraduate degree in mathematics from the University of Bucharest.^[2] He worked as a researcher at the Institute of Mathematics of the Romanian Academy, obtaining a Ph.D. degree in 1991 from the University of Bucharest with thesis On local classfield theory written under the direction of Nicolae Popescu.^[1][3] He received in 1996 a doctorate in mathematics from Boston University. His doctoral thesis there was supervised by Glenn H. Stevens; the thesis title is p-adic Cohomology of Abelian Varieties.^[3]

Career

As a postdoc from 1996 to 1998 in Montreal he was at McGill University and Concordia University. From 1998 to 2003 he was an assistant professor at the University of Washington. Since 2003 he is a full professor at Concordia University.^[2] He has held permanent positions at the University of Padua,^[4] and also in Paris, Münster, Jerusalem, and Nottingham.

Awards

In 2008 Iovita received the Ribenboim Prize. In 2018 he was an invited speaker, with Vincent Pilloni and Fabrizio Andreatta, with talk p-adic variation of automorphic sheaves (given by Pilloni) at the International Congress of Mathematicians in Rio de Janeiro.^[5]

Selected publications

• Iovita, Adrian; Spiess, Michael (2001). "Logarithmic differential forms on p-adic symmetric spaces". Duke Mathematical Journal. 110 (2): 253–278. doi:10.1215/S0012-7094-01-11023-5. MR 1865241.
• Iovita, Adrian; Spiess, Michael (2003). "Derivatives of p-adic L-functions, Heegner cycles and monodromy modules attached to modular forms". Inventiones Mathematicae. 154 (2): 333–384. arXiv:math/0108129. Bibcode:2003InMat.154..333I. doi:10.1007/s00222-003-0306-7. MR 2013784. S2CID 7327124.
• Iovita, Adrian; Werner, Annette (2003). "p-adic height pairings on abelian varieties with semistable ordinary reduction". Journal für die reine und angewandte Mathematik. 2003 (564): 181–203. arXiv:math/0209362. doi:10.1515/crll.2003.089. MR 2021039. S2CID 11400391.
• Andreatta, Fabrizio; Iovita, Adrian; Stevens, Glenn (2014). "Overconvergent modular sheaves and modular forms for ${\displaystyle {\textrm {GL}}_{2/F}}$". Israel Journal of Mathematics. 201 (1): 299–359. doi:10.1007/s11856-014-1045-8. MR 3265287. S2CID 517699.
• Andreatta, Fabrizio; Iovita, Adrian; Pilloni, Vincent (2015). "p-adic families of Siegel modular cuspforms". Annals of Mathematics. 181 (2): 623–697. arXiv:1212.3812. doi:10.4007/annals.2015.181.2.5. JSTOR 24522945. MR 3275848. S2CID 54623621.
• Andreatta, Fabrizio; Iovita, Adrian; Pilloni, Vincent (2016). "On overconvergent Hilbert modular cusp forms" (PDF). Astérisque. 382: 163–193. MR 3581177.
• Andreatta, Fabrizio; Iovita, Adrian; Pilloni, Vincent (2018). "Le halo spectral". Annales Scientifiques de l'École Normale Supérieure. 51 (3): 603–655. doi:10.24033/asens.2362. hdl:11577/3287053. MR 3831033.

References

1. "Curriculum Scientifico-Didattico di Adrian Iovita". Department of Pure and Applied Mathematics, University of Padua (in Italian). January 2003. Archived from the original (PDF) on 8 June 2020. Retrieved 8 June 2020.
2. "CV for Adrian Iovita, Professor" (PDF). Department of Mathematics and Statistics, Concordia University.
3. Adrian Iovita at the Mathematics Genealogy Project
4. Adrian Iovita (Univ. of Padua) url=https://www.math.unipd.it/dipartimento/persone/adrian.iovita/
5. Andreatta, Fabrizio; Iovita, Adrian; Pilloni, Vincent. "p-Adic Variation of Automorphic forms" (PDF). Proceedings of the International Congress of Mathematicians – 2018 Rio de Janeiro. Vol. 1. pp. 291–318.