Iwasawa theory of fine Selmer groups associated to Drinfeld modules

Abstract

Let q be a prime power and F=Fq(T) be the rational function field over Fq, the field with q elements. Let φ be a Drinfeld module over F and p be a non-zero prime ideal of A:=Fq[T]. Over the constant Zp-extension of F, we introduce the fine Selmer group associated to the p-primary torsion of φ. We show that it is a cofinitely generated module over Ap. This proves an analogue of Iwasawa's μ=0 conjecture in this setting, and provides context for the further study of the objects that have been introduced in this article.

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