CM-field


In mathematics, a CM-field is a particular type of number field, so named for a close connection to the theory of complex multiplication. Another name used is J-field.
The abbreviation "CM" was introduced by Shimura and Taniyama.

Formal definition

A number field K is a CM-field if it is a quadratic extension K/''F where the base field F'' is totally real but K is totally imaginary. I.e., every embedding of F into lies entirely within, but there is no embedding of K into.
In other words, there is a subfield F of K such that K is generated over F by a single square root of an element, say
β =,
in such a way that the minimal polynomial of β over the rational number field has all its roots non-real complex numbers. For this α should be chosen totally negative, so that for each embedding σ of into the real number field,
σ < 0.

Properties

One feature of a CM-field is that complex conjugation on induces an automorphism on the field which is independent of its embedding into. In the notation given, it must change the sign of β.
A number field K is a CM-field if and only if it has a "units defect", i.e. if it contains a proper subfield F whose unit group has the same -rank as that of K. In fact, F is the totally real subfield of K mentioned above. This follows from Dirichlet's unit theorem.

Examples

  • The simplest, and motivating, example of a CM-field is an imaginary quadratic field, for which the totally real subfield is just the field of rationals.
  • One of the most important examples of a CM-field is the cyclotomic field, which is generated by a primitive nth root of unity. It is a totally imaginary quadratic extension of the totally real field The latter is the fixed field of complex conjugation, and is obtained from it by adjoining a square root of
  • The union QCM of all CM fields is similar to a CM field except that it has infinite degree. It is a quadratic extension of the union of all totally real fields QR. The absolute Galois group Gal is generated by all elements of order 2 in Gal, and Gal is a subgroup of index 2. The Galois group Gal has a center generated by an element of order 2 and the quotient by its center is the group Gal.
  • If V is a complex abelian variety of dimension n, then any abelian algebra F of endomorphisms of V has rank at most 2n over Z. If it has rank 2n and V is simple then F is an order in a CM-field. Conversely any CM field arises like this from some simple complex abelian variety, unique up to isogeny.
  • One example of a totally imaginary field which is not CM is the number field defined by the polynomial.