Brumer–Stark conjecture
= Brumer–Stark conjecture
{wiki=Brumer–Stark_conjecture}
The Brumer-Stark conjecture is a significant hypothesis in number theory that relates to the structure of abelian extensions of number fields and their class groups. It plays a crucial role in the study of L-functions and their special values, specifically in the context of p-adic L-functions and the behavior of class numbers. The conjecture can be understood in relation to certain aspects of class field theory.