The μ-invariant of fine Selmer groups associated to general Drinfeld modules

Abstract

Let F be a global function field over the finite field Fq where q is a prime power and A be the ring of elements in F regular outside ∞. Let φ be an arbitrary Drinfeld module over F For a fixed non-zero prime ideal p of A, we show that on the constant Zp-extension F of F, the Pontryagin dual of the fine Selmer group associated to the p-primary torsion of φ over F is a finitely generated Iwasawa module such that its Iwasawa μ-invariant vanishes. This provides a generalization of the results given in arXiv:2311.06499.