Ariel M. Pacetti, Ph.D.
Affiliations: | Universidad de Buenos Aires, Buenos Aires, Ciudad Autónoma de Buenos Aires, Argentina |
Area:
MathematicsGoogle:
"Ariel Pacetti"Parents
Sign in to add mentor| Fernando Rodriguez-Villegas | grad student | 2003 | UT Austin | |
| (A formula for the central value of certain Hecke L -functions.) | ||||
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Publications
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| Cremona J, Pacetti A. (2019) On elliptic curves of prime power conductor over imaginary quadratic fields with class number 1 Proceedings of the London Mathematical Society. 118: 1245-1276 |
| Dembélé L, Loeffler D, Pacetti A. (2019) Non-paritious Hilbert modular forms Mathematische Zeitschrift. 292: 361-385 |
| Camporino M, Pacetti A. (2018) Congruences between modular forms modulo prime powers Revista Matematica Iberoamericana. 34: 1609-1643 |
| Kohen D, Pacetti AM. (2018) Anticyclotomic p-adic L-functions for elliptic curves at some additive reduction primes Comptes Rendus Mathematique. 356: 973-983 |
| Kohen D, Pacetti A. (2017) On Heegner points for primes of additive reduction ramifying in the base field Transactions of the American Mathematical Society. 370: 911-926 |
| Gil JIB, Pacetti A. (2016) Hecke and Sturm bounds for Hilbert modular forms over real quadratic fields Ieee Communications Magazine. 86: 1949-1978 |
| Berger T, Dembélé L, Pacetti A, et al. (2015) Theta lifts of Bianchi modular forms and applications to paramodularity Journal of the London Mathematical Society-Second Series. 92: 353-370 |
| Pacetti AM, Tornaria G. (2014) Shimura correspondence for level p2 and the central values of L-series II International Journal of Number Theory. 10: 1595-1635 |
| Dieulefait L, Guerberoff L, Pacetti AM. (2009) Proving Modularity For A Given Elliptic Curve Over An Imaginary Quadratic Field Mathematics of Computation. 79: 1145-1170 |
| Pacetti A, Tornaría G. (2008) Computing Central Values of Twisted $L$-Series: The Case of Composite Levels Experimental Mathematics. 17: 459-471 |