Automorphisms of the Nottingham group. (English) Zbl 0965.20021
Let \(K\) be a finite field of characteristic \(p\). The Nottingham group over \(K\) can be defined as the group \({\mathcal N}(K):=t+t^2K[[t]]\) of normalised power series under substitution. It is a finitely-generated pro-\(p\) group with some interesting properties [see the survey article in the book “New horizons in pro-\(p\) groups”, Birkhäuser, Prog. Math. 184, 205-221 (2000; Zbl 0977.20020)].
In the paper under review the author begins by giving representatives of the conjugacy classes of elements of order \(p\) in \({\mathcal N}(K)\). He then goes on to prove that, for \(p\geq 5\), every automorphism of \({\mathcal N}(K)\) is the composition of an inner automorphism and a field automorphism.
The Nottingham group can also be regarded as a group of automorphisms of the field \(K((t))\). Alternative proofs, from this viewpoint, are given in the Appendix.
In the paper under review the author begins by giving representatives of the conjugacy classes of elements of order \(p\) in \({\mathcal N}(K)\). He then goes on to prove that, for \(p\geq 5\), every automorphism of \({\mathcal N}(K)\) is the composition of an inner automorphism and a field automorphism.
The Nottingham group can also be regarded as a group of automorphisms of the field \(K((t))\). Alternative proofs, from this viewpoint, are given in the Appendix.
Reviewer: R.D.Camina (Cambridge)
MSC:
| 20F28 | Automorphism groups of groups |
| 20E18 | Limits, profinite groups |
| 20E36 | Automorphisms of infinite groups |
| 20E45 | Conjugacy classes for groups |
Keywords:
Nottingham group; automorphism groups; conjugacy classes; finitely generated pro-\(p\) groups; standard automorphismsCitations:
Zbl 0977.20020References:
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