Sobre el índice de irregularidad de los números primos.
Uniformization of certain Shimura curves
We present an approach to the uniformization of certain Shimura curves by means of automorphic functions, obtained by integration of non-linear differential equations. The method takes as its starting point a differential construction of the modular j-function, first worked out by R. Dedekind in 1877, and makes use of a differential operator of the third order, introduced by H. A. Schwarz in 1873.
Mujeres y Matemáticas.
Galois representations of octahedral type and 2-coverings of elliptic curves.
On Automorphic Forms and Hodge Theory.
On Values of Zeta Functions and ?-adic Euler Characteristc.
On equations defining fake elliptic curves
Shimura curves associated to rational nonsplit quaternion algebras are coarse moduli spaces for principally polarized abelian surfaces endowed with quaternionic multiplication. These objects are also known as . We present a method for computing equations for genus 2 curves whose Jacobian is a fake elliptic curve with complex multiplication. The method is based on the explicit knowledge of the normalized period matrices and on the use of theta functions with characteristics. As in the case of CM-points...
Uniformization of triangle modular curves.
In the present article, we determine explicit uniformizations of modular curves attached to triangle Fuchsian groups with cusps. Their
Quadratic modular symbols on Shimura curves
We introduce the concept of modular symbol and study how these symbols are related to -adic -functions. These objects were introduced in [] in the case of modular curves. In this paper, we discuss a method to attach quadratic modular symbols and quadratic -adic -functions to more general Shimura curves.
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