Yifan Yang
Published 2015-03-27Version 1
Let $X_0^6(1)/W_6$ be the Atkin-Lehner quotient of the Shimura curve $X_0^6(1)$ associated to a maximal order in an indefinite quaternion algebra of discriminant $6$ over $\mathbb Q$. By realizing modular forms on $X_0^6(1)/W_6$ in two ways, one in terms of hypergeometric functions and the other in terms of Borcherds forms, and using Schofer's formula for values of Borcherds forms at CM-points, we obtain special values of certain hypergeometric functions in terms of periods of elliptic curves over $\overline\mathbb Q$ with complex multiplication.
Comments: The accompanying file is the Magma code used to compute the values of Borcherds forms at CM-points
Algebraic transformations of hypergeometric functions and automorphic forms on Shimura curves
Torsion for CM elliptic curves defined over number fields of degree 2p
Borcherds Forms and Generalizations of Singular Moduli
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