Conductor-discriminant formula

In mathematics, the conductor-discriminant formula or Führerdiskriminantenproduktformel, introduced by Hasse (1926, 1930) for abelian extensions and by Artin (1931) for Galois extensions, is a formula calculating the relative discriminant of a finite Galois extension of local or global fields from the Artin conductors of the irreducible characters of the Galois group .

Statement

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Let   be a finite Galois extension of global fields with Galois group  . Then the discriminant equals

 

where   equals the global Artin conductor of  .[1]

Example

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Let   be a cyclotomic extension of the rationals. The Galois group   equals  . Because   is the only finite prime ramified, the global Artin conductor   equals the local one  . Because   is abelian, every non-trivial irreducible character   is of degree  . Then, the local Artin conductor of   equals the conductor of the  -adic completion of  , i.e.  , where   is the smallest natural number such that  . If  , the Galois group   is cyclic of order  , and by local class field theory and using that   one sees easily that if   factors through a primitive character of  , then   whence as there are   primitive characters of   we obtain from the formula  , the exponent is

 

Notes

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  1. ^ Neukirch 1999, VII.11.9.

References

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