Conductor-discriminant formula

In mathematics, the conductor-discriminant formula or Führerdiskriminantenproduktformel, introduced by Template:Harvs for abelian extensions and by Template:Harvs for Galois extensions, is a formula calculating the relative discriminant of a finite Galois extension ${\displaystyle L/K}$ of local or global fields from the Artin conductors of the irreducible characters ${\displaystyle \mathrm{I}\mathrm{r}\mathrm{r}(G)}$ of the Galois group ${\displaystyle G=G(L/K)}$.

Let ${\displaystyle L/K}$ be a finite Galois extension of global fields with Galois group ${\displaystyle G}$. Then the discriminant equals

${\displaystyle {𝔡}_{L/K}=\prod _{\chi \in \mathrm{I}\mathrm{r}\mathrm{r}(G)}𝔣(\chi {)}^{\chi (1)},}$

where ${\displaystyle 𝔣(\chi )}$ equals the global Artin conductor of ${\displaystyle \chi }$.Template:Sfn

Let ${\displaystyle L=𝐐({\zeta }_{p^n})/𝐐}$ be a cyclotomic extension of the rationals. The Galois group ${\displaystyle G}$ equals ${\displaystyle (𝐙/p^n{)}^{\times }}$. Because ${\displaystyle (p)}$ is the only finite prime ramified, the global Artin conductor ${\displaystyle 𝔣(\chi )}$ equals the local one ${\displaystyle {𝔣}_{(p)}(\chi )}$. Because ${\displaystyle G}$ is abelian, every non-trivial irreducible character ${\displaystyle \chi }$ is of degree ${\displaystyle 1=\chi (1)}$. Then, the local Artin conductor of ${\displaystyle \chi }$ equals the conductor of the ${\displaystyle 𝔭}$-adic completion of ${\displaystyle L^{\chi }=L^{\mathrm{k}\mathrm{e}\mathrm{r}(\chi )}/𝐐}$, i.e. ${\displaystyle (p{)}^{n_p}}$, where ${\displaystyle n_p}$ is the smallest natural number such that ${\displaystyle U_{{𝐐}_p}^{(n_p)}\subseteq N_{L_{𝔭}^{\chi }/{𝐐}_p}(U_{L_{𝔭}^{\chi }})}$. If ${\displaystyle p>2}$, the Galois group ${\displaystyle G(L_{𝔭}/{𝐐}_p)=G(L/𝐐)=(𝐙/p^n{)}^{\times }}$ is cyclic of order ${\displaystyle \phi (p^n)}$, and by local class field theory and using that ${\displaystyle U_{{𝐐}_p}/U_{{𝐐}_p}^{(k)}=(𝐙/p^k{)}^{\times }}$ one sees easily that if ${\displaystyle \chi }$ factors through a primitive character of ${\displaystyle (𝐙/p^i{)}^{\times }}$, then ${\displaystyle {𝔣}_{(p)}(\chi )=p^i}$ whence as there are ${\displaystyle \phi (p^i)-\phi (p^{i-1})}$ primitive characters of ${\displaystyle (𝐙/p^i{)}^{\times }}$ we obtain from the formula ${\displaystyle {𝔡}_{L/𝐐}=(p^{\phi (p^n)(n-1/(p-1))})}$, the exponent is

${\displaystyle {\displaystyle \sum _{i=0}^n}(\phi (p^i)-\phi (p^{i-1}))i=n\phi (p^n)-1-(p-1){\displaystyle \sum _{i=0}^{n-2}}{p}^i=n\phi (p^n)-p^{n-1}.}$

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