2015
DOI: 10.2422/2036-2145.201304_001
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Control theorems for $\ell$-adic Lie extensions of global function fields

Abstract: Let F be a global function field of characteristic p>0, K/F an`-adic Lie extension unramified outside a finite set of places S and A/F an abelian variety. We study Sel A (K ) _ (the Pontrjagin dual of the Selmer group) and (under some mild hypotheses) prove that it is a finitely generated Z`[[Gal(K /F)]]module via generalizations of Mazur's Control Theorem. If Gal(K /F) has no elements of order`and contains a closed normal subgroup H such that Gal(K /F)/H ' Z`, we are able to give sufficient conditions for Sel… Show more

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Cited by 5 publications
(5 citation statements)
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“…Moreover, to shorten notations, in this section we put S for the p-Selmer group of F d , i.e., what we previously denoted by Sel(F d ) and S for its Pontrjagin dual S ∨ . The fact that S ∈ M G1 (G) has been proved in many different cases for example in [2], [5], [17] and [20].…”
Section: Akashi Series For Z Dmentioning
confidence: 98%
See 1 more Smart Citation
“…Moreover, to shorten notations, in this section we put S for the p-Selmer group of F d , i.e., what we previously denoted by Sel(F d ) and S for its Pontrjagin dual S ∨ . The fact that S ∈ M G1 (G) has been proved in many different cases for example in [2], [5], [17] and [20].…”
Section: Akashi Series For Z Dmentioning
confidence: 98%
“…Then equation (3) shows that H 1 (G, Sel(K)) ≃ Coker(ψ G K ) . We consider the classical descent diagram, which has been already used to study the structure of Selmer groups as modules over some Iwasawa algebra (see, e.g., [5] and the references there) (5) Sel(F )…”
Section: Descent Diagrams Consider the Sequencementioning
confidence: 99%
“…This approach has been applied also to Iwasawa theory for elliptic curves and abelian varieties in [6], building on structure theorems for Selmer groups (see e.g. [29], [30] and [7]) and the only avaliable Main Conjecture in this setting, i.e. the one for constant abelian varieties in [21].…”
Section: Stickelberger Series and Class Groupsmentioning
confidence: 99%
“…For infinite extensions we define the Selmer groups by taking direct limits on the finite subextensions. In particular, Sel A (K) ℓ is a Λ(G)-module whose structure has been studied in [5].…”
Section: Introductionmentioning
confidence: 99%