An analogue of Kida's formula for Mazur-Tate elements

Abstract

We prove an analogue of Kida's formula for the Iwasawa invariants of the Mazur-Tate elements attached to elliptic curves over Q. Let p be an odd prime and let L/K be a Galois extension of abelian number fields with p-power Galois group. For an elliptic curve E/Q, we study the Mazur-Tate elements over the finite layers of the cyclotomic Zp-extensions of K and L. We show that the vanishing of the μ-invariant is preserved in the extension: if the level-n Mazur-Tate element over K has μ= 0, then the corresponding element over L also has μ= 0. Moreover, the associated λ-invariants satisfy an explicit transition formula. This parallels the work of Hachimori-Matsuno on Selmer groups and of Matsuno on p-adic L-functions. As an application, we obtain an analogue of Kida's formula for the analytic Iwasawa invariants associated to Pollack's signed p-adic L-functions. Since our results apply to elliptic curves with any reduction type at p under mild hypotheses, including those with additive reduction, we also obtain a Kida-type formula for the p-adic L-functions constructed by Delbourgo for elliptic curves with unstable additive reduction. In particular, because Mazur-Tate elements approximate p-adic L-functions in the limit, our results unify all previously known cases of Kida's formula for analytic Iwasawa invariants.

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