Iwasawa Main Conjecture for ordinary semistable elliptic curves over global function fields
Abstract
Let A be an ordinary elliptic curve over a global function field K of characteristic p, assumed semistable at every place, and let L/K be a Zpd-extension ramified only at finitely many places where A has ordinary reduction. Building on the framework of [Tan26] (arXiv:2603.10576), we prove the Iwasawa Main Conjecture for A over L, subject to a technical μ-invariant hypothesis that is already detected after specialization to the unramified Zp-extension. The principal new input is a `-formula' that compares appropriate -isotypic characteristic ideals of Selmer modules with the corresponding specializations of the p-adic L-function. Finally, to show that our μ-hypothesis is non-vacuous, we prove, for p>3, that the hypothesis holds on a Zariski open dense locus in the moduli of semistable elliptic curves.
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