论文信息 - Heegner Point Computations Via Numerical p-Adic Integration

Heegner Point Computations Via Numerical p-Adic Integration

Building on ideas of Pollack and Stevens, we present an efficient algorithm for integrating rigid analytic functions against measures obtained from automorphic forms on definite quaternion algebras. We then apply these methods, in conjunction with the Jacquet-Langlands correspondence and the Cerednik-Drinfeld theorem, to the computation of p-adic periods and Heegner points on elliptic curves defined over ℚ and ${\mathbb{Q}}(\sqrt{5})$ which are uniformized by Shimura curves.

Matthew Greenberg

[1] Noam D. Elkies,et al. Heegner point computations , 1994, ANTS.

[2] Henri Darmon,et al. Heegner points on Mumford–Tate curves , 1996 .

[3] Mak Trifković,et al. Stark-Heegner points on elliptic curves defined over imaginary quadratic fields , 2006 .

[4] I V Čerednik,et al. UNIFORMIZATION OF ALGEBRAIC CURVES BY DISCRETE ARITHMETIC SUBGROUPS OF $ PGL_2(k_w)$ WITH COMPACT QUOTIENTS , 1976 .

[5] V. Drinfel'd,et al. Coverings of p-adic symmetric regions , 1976 .

[6] Henri Darmon,et al. Efficient calculation of Stark-Heegner points via overconvergent modular symbols , 2006 .

[7] Henri Darmon,et al. Heegner points, p-adic L-functions, and the Cerednik-Drinfeld uniformization , 1998 .

[8] Matthew Greenberg. Heegner points and rigid analytic modular forms , 2006 .

[9] J. Voight. Shimura curve computations , 2006 .

[10] Henri Darmon,et al. Rational Points on Modular Elliptic Curves , 2003 .

[11] B. Mazur,et al. Arithmetic of Weil curves , 1974 .

[12] Shouwu Zhang. Heights of Heegner points on Shimura curves , 2001 .

[13] Peter Green,et al. Elliptic Curves and Class Fields of Real Quadratic Fields: Algorithms and Evidence , 2002, Exp. Math..

[14] Jeffrey Shallit,et al. Algorithmic Number Theory , 1996, Lecture Notes in Computer Science.