Gauss's form class groups and Shimura's canonical models
Abstract
Let N be a positive integer and be a subgroup of SL2(Z) containing 1(N). Let K be an imaginary quadratic field and O be an order of discriminant DO in K. Under some assumptions, we show that induces a form class group of discriminant DO (or of order O) and level N if and only if there is a certain canonical model of the modular curve for defined over a suitably small number field. In this way we can find an interesting link between two different subjects, which will be useful in the study of certain quadratic Diophantine equations in terms of primes p.
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