Abstract :
One of the fundamental theorems of global class field theory states that there is a one-to-one correspondence between finite Abelian extensions of an algebraic number fieldkand the norm groups of the idele class groupCk=Jk/k* ofk. More generally, for finite extensionsKandLofkthere is the following group theoretic interpretation ofNK/kCKsubset of or equal toNL/kCL. LetEbe a finite Galois extension ofkcontainingKandL, and letG=G(E/k),H=G(E/K), andN=G(E/L) be the corresponding Galois groups. It follows by global class field theory thatNK/kCKsubset of or equal toNL/kCLiffG′Hsubset of or equal toG′N, whereG′ is the commutator subgroup ofG. In the present work we prove thatNK/kJKsubset of or equal toNL/kJLiff every element ofHof prime power order is conjugate inGto an element ofN. We also show that the same group theoretic condition is equivalent toN(K/k)subset of or equal toN(L/k), whereN(K/k) is the group of elements ofk* that are local norms everywhere fromKtok. We then use this group theoretic criterion to investigate the equality of norm groups as subgroups ofk*.
