Greenberg's μ=0 conjecture for lisse sheaves over global function fields
Abstract
Let K be a global function field of characteristic p>0 and ≠ p be a prime number. We study Selmer groups over a Z-extension K∞/K. For a lisse Z-sheaf we prove that the Pontryagin dual of the associated Selmer group is a finitely generated torsion module over the Iwasawa algebra and has μ-invariant equal to zero. This gives a positive-characteristic, prime to p, analogue of Greenberg's μ=0 conjecture. Our result applies in particular to abelian varieties, fine Selmer groups, and adjoint representations. We also prove an analogue of the weak Leopoldt conjecture in this context over K∞, and deduce that the framed deformation ring of a residual representation is a formal power series ring. The same conclusion holds for the unframed deformation ring if the residual representation has no non-scalar endomorphisms.
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