Nottingham group

In the mathematical field of infinite group theory, the Nottingham group is the group J(Fp) or N(Fp) consisting of formal power series t + a2t2+...with coefficients in Fp. The group multiplication is given by formal composition also called substitution. That is, if and if is another element, then . The group multiplication is not abelian. The group was studied number theorists as the group of wild automorphisms of the local field Fp((t)) and by group theorists including D. and the name "Nottingham group" refers to his former domicile.

Nottingham group

In the mathematical field of infinite group theory, the Nottingham group is the group J(Fp) or N(Fp) consisting of formal power series t + a2t2+...with coefficients in Fp. The group multiplication is given by formal composition also called substitution. That is, if and if is another element, then . The group multiplication is not abelian. The group was studied number theorists as the group of wild automorphisms of the local field Fp((t)) and by group theorists including D. and the name "Nottingham group" refers to his former domicile.