Atlas: Ordered Groups in which Every Automorphism Preserves the Order by Vasiliy Bludov

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International Conference on Ordered Algebraic Structures and Related Areas
July 6-10, 1998
Nanjing University
Nanjing, China

Organizers
W.C.Holland, P.Conrad, K.Denecke, M.Giraudet, A.C.Kim, V.Kopytov, N.Y.Medvedev, I.Rival, K.P.Shum, Dao-Rong Ton, C.Tsinakis, Minxie Jiang, Kaiyao He

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Ordered Groups in which Every Automorphism Preserves the Order
by
Vasiliy Bludov
Irkutsk State University

In the report we represent an example of orderable nilpotent group G with the property: every automorphism of G preserve every full order of G.

We use the following notations: Aut G - group of all automorphisms of G, IA G - subgroup of IA-automorphisms (i.e. subgroup of automorphisms induce identical automorphism on G/G').

Example. Let k, q - nonzero integers and G_{k, q} - nilpotent group of class 5 with generators a, b and defining relations:

[a, [a, [a, [a, b]]]]=[a, [a, b, b, b]]=[a, b, b, b, b]=1,

[a, [a, [a, b, b]]]=[a, [a, b], [a, b]],

[a, [a, [a, b]]]=[a, [a, b], [a, b]]^k=1,

[a, b, b, b]=[a, b, [a, b, b]]^q.

Direct calculations show that G_{k, q} is orderable, Aut G_{k, q}=IA G_{k, q} and every automorphism of G_{k, q} preserve every full order of G_{k, q}. Moreover, IA G_{k, q} is orderable as torsion-free nilpotent group.

Remark. If G is a two-generated torsion-free group of nilpotency class less than 5 then Aut G has nontrivial elements of finite orders.

Date received: April 30, 1998