Abstract
Let$E$be an elliptic curve over$\mathbb{Q}$, and let${\it\varrho}_{\flat }$and${\it\varrho}_{\sharp }$be odd two-dimensional Artin representations for which${\it\varrho}_{\flat }\otimes {\it\varrho}_{\sharp }$is self-dual. The progress on modularity achieved in recent decades ensures the existence of normalized eigenforms$f$,$g$, and$h$of respective weights two, one, and one, giving rise to$E$,${\it\varrho}_{\flat }$, and${\it\varrho}_{\sharp }$via the constructions of Eichler and Shimura, and of Deligne and Serre. This article examines certain$p$-adic iterated integralsattached to the triple$(f,g,h)$, which are$p$-adic avatars of the leading term of the Hasse–Weil–Artin$L$-series$L(E,{\it\varrho}_{\flat }\otimes {\it\varrho}_{\sharp },s)$when it has a double zero at the centre. A formula is proposed for these iterated integrals, involving the formal group logarithms of global points on$E$—referred to asStark points—which are defined over the number field cut out by${\it\varrho}_{\flat }\otimes {\it\varrho}_{\sharp }$. This formula can be viewed as an elliptic curve analogue of Stark’s conjecture on units attached to weight-one forms. It is proved when$g$and$h$are binary theta series attached to a common imaginary quadratic field in which$p$splits, by relating the arithmetic quantities that arise in it to elliptic units and Heegner points. Fast algorithms for computing$p$-adic iterated integrals based on Katz expansions of overconvergent modular forms are then exploited to gather numerical evidence in more exotic scenarios, encompassing Mordell–Weil groups over cyclotomic fields, ring class fields of real quadratic fields (a setting which may shed light on the theory of Stark–Heegner points attached to Shintani-type cycles on${\mathcal{H}}_{p}\times {\mathcal{H}}$), and extensions of$\mathbb{Q}$with Galois group a central extension of the dihedral group$D_{2n}$or of one of the exceptional subgroups$A_{4}$,$S_{4}$, and$A_{5}$of$\mathbf{PGL}_{2}(\mathbb{C})$.
Highlights
(I) is the odd self-dual two-dimensional Galois representation induced from a ring class character of an imaginary quadratic field, by a series of works building on the breakthroughs of Gross and Zagier, and of Kolyvagin; (II) is a Dirichlet character, by the work of Kato [Kato]; (III) is an odd irreducible two-dimensional Galois representation satisfying some mild restrictions, by [BDR2]; (IV) is an irreducible constituent of the tensor product ⊗ of two odd irreducible two-dimensional Galois representations which is self-dual and satisfies some other mild restrictions, by [DR2]
The primary goal of this paper is to propose a conjectural p-adic analytic formula relating global points in E(H )L to ‘ p-adic iterated integrals’ attached to an appropriate triple of modular forms, and to prove it in some cases
We find x2 − a3(g)x + χ (3) = (x − ζ3)(x − ζ32) and take gto be the 3-stabilization with U3-eigenvalue ζ3. (With the other choice the formula is exactly the same, except the algebraic factor is replaced by its complex conjugate.) We embed Q(ζ3) into Q19 so that ζ3 ≡ 7 mod 19, and find f · g = −25103076413984358720047537708218 mod 1925
Summary
Let K be an imaginary quadratic field of discriminant −DK , and let NK/Q denote the norm map on fractional ideals of K. Let K i=n CQre(m√o−n2a3’s) tables, be the and write f for the associated smallest imaginary quadratic field of class number 3, and note that both primes dividing 35 are inert in K This is the simplest setting where there is no Heegner point on E arising from a modular curve, and in which one must rather work with the Shimura curve attached to the indefinite quaternion algebra ramified at 5 and 7. Since it is always possible to replace the form f by one of its quadratic twists, there is no real loss in generality in assuming that g = h∗, which is what shall be done in the rest of this section In this setting, Conjecture ES suggests a new, efficiently computable (conjectural) analytic formula for the p-adic logarithm of global points defined over the A4, S4, or A5-extension cut out by the adjoint Adg (or, equivalently, by the projective representation attached to g).
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