On the rank one abelian Gross-Stark conjecture

Abstract

Let F be a totally real number field, p a rational prime, and a finite order totally odd abelian character of Gal(F/F) such that (p)=1 for some p|p. Motivated by a conjecture of Stark, Gross conjectured a relation between the derivative of the p-adic L-function associated to at its exceptional zero and the p-adic logarithm of a p-unit in the component of F×. In a recent work, Dasgupta, Darmon, and Pollack have proven this conjecture assuming two conditions: that Leopoldt's conjecture holds for F and p, and that if there is only one prime of F lying above p, a certain relation holds between the L-invariants of and -1. The main result of this paper removes both of these conditions, thus giving an unconditional proof of the conjecture.