Supercongruences and Complex Multiplication
Abstract
We study congruences involving truncated hypergeometric series of the form_rF_{r-1}(1/2,...,1/2;1,...,1;\lambda)_{(mp^s-1)/2} = \sum_{k=0}^{(mp^s-1)/2} ((1/2)_k/k!)^r \lambda^k where p is a prime and m, s, r are positive integers. These truncated hypergeometric series are related to the arithmetic of a family of algebraic varieties and exhibit Atkin and Swinnerton-Dyer type congruences. In particular, when r=3, they are related to K3 surfaces. For special values of \lambda, with s=1 and r=3, our congruences are stronger than what can be predicted by the theory of formal groups because of the presence of elliptic curves with complex multiplications. They generalize a conjecture made by Rodriguez-Villegas for the \lambda=1 case and confirm some other supercongruence conjectures at special values of \lambda.
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Cite
@article{arxiv.1210.4489,
title = {Supercongruences and Complex Multiplication},
author = {Jonas Kibelbek and Ling Long and Kevin Moss and Benjamin Sheller and Hao Yuan},
journal= {arXiv preprint arXiv:1210.4489},
year = {2012}
}
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19 pages