On the Gross-Stark Conjecture
Abstract
In 1980, Gross conjectured a formula for the expected leading term at s=0 of the Deligne--Ribet p-adic L-function associated to a totally even character of a totally real field F. The conjecture states that after scaling by L( ω-1, 0), this value is equal to a p-adic regulator of units in the abelian extension of F cut out by ω-1. In this paper, we prove Gross's conjecture.
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