Selmer varieties for curves with CM Jacobians
Abstract
We study the Selmer variety associated to a canonical quotient of the p-pro-unipotent fundamental group of a smooth projective curve of genus at least two defined over whose Jacobian decomposes into a product of abelian varieties with complex multiplication. Elementary multi-variable Iwasawa theory is used to prove dimension bounds, which, in turn, lead to a new proof of Diophantine finiteness over for such curves.
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