p-adic L-functions for elliptic curves over global function fields

Abstract

We introduce a p-adic L-function LA/L associated to an ordinary elliptic curve A over a global function field K of characteristic p together with a Zpd-extension L/K, d=0 allowed, unramified outside a finite set of places where A has ordinary (good ordinary or multiplicative) reductions. This LA/L is characterized by its interpolation of the special values of twisted Hasse-Weil L-functions, we show that it satisfies the desired functional equation and specialization formula in connection with the characteristic ideal of the dual p∞-Selmer group of A/L. The Iwasawa main conjecture having LA / L as the analytic side is proven in several cases. In the d≥ 3 case, %and A/K has semi-stable reductions everywhere, the conjecture holds for A/L if and only if it holds for all intermediate p2-extensions A/L' belonging to a given non-empty Zariski open subset of the Grassmannian Gr(d-2,d)(p).

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