Finite field elements of high order arising from modular curves JF Burkhart, NJ Calkin, S Gao, JC Hyde-Volpe, K James, H Maharaj, ... Designs, Codes and Cryptography 51 (3), 301-314, 2009 | 28 | 2009 |
Elliptic curves, modular forms, and sums of Hurwitz class numbers B Brown, NJ Calkin, TB Flowers, K James, E Smith, A Stout Journal of Number Theory 128 (6), 1847-1863, 2008 | 20 | 2008 |
Average Frobenius distribution for elliptic curves defined over finite Galois extensions of the rationals K James, E Smith Mathematical Proceedings of the Cambridge Philosophical Society 150 (3), 439-458, 2011 | 15 | 2011 |
A Barban-Davenport-Halberstam asymptotic for number fields E Smith Proceedings of the American Mathematical Society 138 (7), 2301-2309, 2010 | 8 | 2010 |
A generalization of the Barban–Davenport–Halberstam Theorem to number fields E Smith Journal of Number Theory 129 (11), 2735-2742, 2009 | 8 | 2009 |
A VARIANT OF THE BARBAN–DAVENPORT–HALBERSTAM THEOREM E Smith International Journal of Number Theory 7 (08), 2203-2218, 2011 | 4 | 2011 |