Absolute Galois group

The absolute Galois group of a body is the Galois group , which belongs to the separable closure . It is unique except for isomorphism . In general, the expansion of the body is of infinite degree , which is why the main law of Galois theory is no longer applicable as such. The study of promises information about all finite Galois field extensions , in particular hints for solving the inverse problem of Galois theory . ${\ displaystyle G_ {K}}$ ${\ displaystyle K}$ ${\ displaystyle K_ {sep} / K}$ ${\ displaystyle K_ {sep} / K}$${\ displaystyle G_ {K}}$${\ displaystyle L / K}$

• For a perfect body , the separable closure is equal to the algebraic closure, so . ${\ displaystyle K}$${\ displaystyle K_ {sep} = {\ overline {K}}}$
  • Because is , where the complex conjugation called.${\ displaystyle {\ overline {\ mathbb {R}}} = \ mathbb {C}}$${\ displaystyle G _ {\ mathbb {R}} = \ {id, c \}}$${\ displaystyle c}$
  • For no explicit characterization has been out of place. Statements It is hoped that from the set of Belyi , after the faithful on certain graphs , called dessins d'enfants , operates . The Absolute Galois group over the rational numbers is important in number theory and the subject of the Serre conjecture, which has since been proven .${\ displaystyle K = \ mathbb {Q}}$${\ displaystyle G_ {K}}$${\ displaystyle G_ {K}}$
  • If the body is with elements, the following applies , with the projective limit of , the so-called test ring , being on the right-hand side .${\ displaystyle \ mathbb {F} _ {q}}$${\ displaystyle q}$${\ displaystyle G _ {\ mathbb {F} _ {q}} = \ lim _ {\ longleftarrow} \ mathbb {Z} / n \ mathbb {Z} =: {\ hat {\ mathbb {Z}}}}$${\ displaystyle \ mathbb {Z} / n \ mathbb {Z} ~ (n \ in \ mathbb {N})}$