Cuspidal divisor class groups of non-split Cartan modular curves
Abstract
I find an explicit description of modular units in terms of Siegel functions for the modular curves X+ns(pk) associated to the normalizer of a non-split Cartan subgroup of level pk where p=2,3 is a prime. The Cuspidal Divisor Class Group C+ns(pk) on X+ns(pk) is explicitly described as a module over the group ring R = Z[(Z/pkZ)*/\ 1\]. In this paper I give a formula involving generalized Bernoulli numbers B2, for |C+ns(pk)|.
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