Lars Kühne
Published 2017-09-04Version 1
Using class field theory, we prove a restriction on the intersection of the maximal abelian extensions associated with different number fields. This restriction is then used to improve a result of Rosen and Silverman about the linear independence of Heegner points. In addition, it yields effective restrictions for the special points lying on an algebraic subvariety in a product of modular curves. The latter application is related to the Andr\'e-Oort conjecture.
The Andre-Oort conjecture for the moduli space of Abelian Surfaces
Class field theory for curves over $p$-adic fields
Knots, primes and class field theory
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