Iwasawa theory of elliptic curves with complex multiplication: p-adic L functions E De Shalit (No Title), 1987 | 311 | 1987 |
An introduction to the Langlands program D Bump Springer Science & Business Media, 2003 | 180* | 2003 |
p-Adic regulators on curves and special values ofp-adicL-functions R Coleman, E De Shalit Inventiones mathematicae 93, 239-266, 1988 | 95 | 1988 |
Relative Lubin-Tate groups E de Shalit Proceedings of the American Mathematical Society 95 (1), 1-4, 1985 | 54 | 1985 |
Residues on buildings and de Rham cohomology of p-adic symmetric domains E De Shalit | 38 | 2001 |
Eichler cohomology and periods of modular forms on p-adic Schottky groups. E Shalit Journal für die reine und angewandte Mathematik (Crelles Journal) 1989 (400 …, 1989 | 32 | 1989 |
Metabelian local class field theory. E Shalit, H Koch Walter de Gruyter, Berlin/New York 1996 (478), 85-106, 1996 | 30 | 1996 |
The explicit reciprocity law in local class field theory E de Shalit | 30 | 1986 |
The p-adic monodromy-weight conjecture for p-adically uniformized varieties E De Shalit Compositio Mathematica 141 (1), 101-120, 2005 | 28 | 2005 |
On special values of theta functions of genus two ED Shalit, EZ Goren Annales de l'institut Fourier 47 (3), 775-799, 1997 | 27 | 1997 |
Hecke rings and universal deformation rings E De Shalit Modular forms and Fermat’s last theorem, 421-445, 1997 | 25 | 1997 |
Dual groups and Langlands functoriality D Bump, JW Cogdell, E de Shalit, D Gaitsgory, E Kowalski, SS Kudla, ... An Introduction to the Langlands program, 251-268, 2004 | 24 | 2004 |
Informal introduction to geometric Langlands D Bump, JW Cogdell, E de Shalit, D Gaitsgory, E Kowalski, SS Kudla, ... An introduction to the Langlands program, 269-281, 2004 | 23 | 2004 |
Kronecker's polynomial, supersingular elliptic curves, and p-adic periods of modular curves E De Shalit Contemporary Mathematics 165, 135-135, 1994 | 23 | 1994 |
Analytic Theory of L-Functions for GL n D Bump, JW Cogdell, E de Shalit, D Gaitsgory, E Kowalski, SS Kudla, ... An Introduction to the Langlands Program, 197-228, 2004 | 21 | 2004 |
A theta operator on Picard modular forms modulo an inert prime E De Shalit, EZ Goren Research in the Mathematical Sciences 3, 1-65, 2016 | 19 | 2016 |
Theta operators on unitary Shimura varieties E De Shalit, EZ Goren Algebra & Number Theory 13 (8), 1829-1877, 2019 | 18 | 2019 |
Reflections on collaboration between mathematics and mathematics education PW Thompson Mathematics & mathematics education: Searching for common ground, 313-333, 2014 | 18 | 2014 |
On thep-adic periods ofX 0(p) E de Shalit Mathematische Annalen 303, 457-472, 1995 | 18 | 1995 |
From modular forms to automorphic representations D Bump, JW Cogdell, E de Shalit, D Gaitsgory, E Kowalski, SS Kudla, ... An introduction to the Langlands Program, 133-151, 2004 | 17 | 2004 |