Galois module

From Academic Kids

In mathematics, and in particular in algebraic number theory, a Galois module is a module for a Galois group — equivalently for a Galois group G and a group ring R[G] of G with respect to some ring R, it is some R[G]-module M. In that general sense Galois representation is a synonym. There are a number of important, much more special cases. Certainly G can either be a profinite Galois group, or a finite one for a finite extension L/K of fields.

In the case of G profinite, there is a large supply of G-modules available in the theory of étale cohomology, which is an algebraic theory (and therefore exhibits 'covariance' with respect to Galois symmetry). A basic discovery of the 1960s is that such modules are as non-trivial as they can be, in general; so that the theory is rather rich.

In classical algebraic number theory, the ring OL of integers of L can be considered as an OK[G]-module; and one can ask what its structure is. This is an arithmetic question, in that by the normal basis theorem one knows that L is a free K[G]-module of rank 1. If the same is true for the integers, that is equivalent to the existence of a normal integral basis, so of α in OK such that its conjugate elements under G give a free basis for OL over OK. This is an interesting question even (perhaps especially) when K is the rational number field Q.

For example, if L = Q(√-3), is there a normal integral basis? The answer is yes, as one sees by identifying it with Q(ζ) where

ζ = exp(2πi/3).

In fact all the subfields of the cyclotomic fields for p-th roots of unity for p a prime number have normal integral bases (over Z), as can be deduced from the theory of Gaussian periods. On the other hand the Gaussian field does not. This is an example of a necessary condition found by Emmy Noether (perhaps known earlier?). What matters here is tame ramification. In terms of the discriminant D of L, and taking still K = Q, no prime p must divide D to the power p. Then Noether's theorem states that tame ramification is necessary and sufficient for OL to be a projective module over Z[G]. It is certainly therefore necessary for it to be a free module. It leaves the question of the gap between free and projective, for which a large theory has now been built up.

Further examples of Galois module theories are those of the Galois action on the unit group of OL, and on the ideal class group (leading to Iwasawa theory).

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