On the Bernoulli--Hurwitz periods

Abstract

Let E be an elliptic curve having CM by the ring of integers of an imaginary quadratic field K in which p splits. Following Lichtenbaum, the Bernoulli--Hurwitz numbers of E (i.e., values of Eisenstein series evaluated at E up to normalization) admit integral representations given by a p-adic measure constructed from an elliptic function. We show that the periods of this measure are in fact special values of a family of weight one Eisenstein series at the CM curve E equipped with certain level data, and explicitly relate it to Katz's one-variable p-adic Eisenstein measure, whereby we derive period formulas of the Bernoulli--Hurwitz measure attached to any ordinary elliptic curve E defined over a local field. Moreover, by exploiting the modularity of these periods, and thanks to the existence of abundant weight one Hasse-type invariants, we present a novel approach to the interpolation property of the Bernoulli--Hurwitz p-adic zeta functions of the ordinary elliptic curve E, and obtain a p-adic Kronecker's first limit formula.

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