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http://dx.doi.org/10.4134/JKMS.2003.40.2.225

ORDERED GROUPS IN WHICH ALL CONVEX JUMPS ARE CENTRAL  

Bludov, V.V. (Institute of Mathematics and Economics Irkutsk State University)
Glass, A.M.W. (Department of Pure Mathematics and Mathematical Statistics Centre for Mathematical Sciences)
Rhemtulla, Akbar H. (Department of Mathematical and Statistical University of Alberta)
Publication Information
Journal of the Korean Mathematical Society / v.40, no.2, 2003 , pp. 225-239 More about this Journal
Abstract
(G, <) is an ordered group if'<'is a total order relation on G in which f < g implies that xfy < xgy for all f, g, x, y $\in$ G. We say that (G, <) is centrally ordered if (G, <) is ordered and [G,D] $\subseteq$ C for every convex jump C $\prec$ D in G. Equivalently, if $f^{-1}g f{\leq} g^2$ for all f, g $\in$ G with g > 1. Every order on a torsion-free locally nilpotent group is central. We prove that if every order on every two-generator subgroup of a locally soluble orderable group G is central, then G is locally nilpotent. We also provide an example of a non-nilpotent two-generator metabelian orderable group in which all orders are central.
Keywords
soluble group; locally nilpotent group; ordered group; convex jump; central series; weakly Abelian;
Citations & Related Records

Times Cited By Web Of Science : 3  (Related Records In Web of Science)
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연도 인용수 순위
1 /
[ V. M. Kopytov;N. Ya. Medvedev ] / The Theory of Lattice-ordered Groups
2 The Theory of Groups (<TEX>$2^{nd}$</TEX> edition) /
[ D. J. S. Robinson ] / Grad. Texts in Math.
3 Residual properties of infinite soluble groups /
[ K. W. Gruenberg ] / Proc. London Math. Soc.   DOI
4 Groups of Formal Power Series are Fully Orderable /
[ V. M. Kopytov ] / Algebra & Logic   DOI
5 Infrainvariant subgroups /
[ D. M. Smirnov ] / Ucen. Zap. Ivanovs. Gos. Ped. Inst.
6 Nilpotent Groups /
[ P. Hall ] / Lectures given at the Canadian Mathematical Congress
7 Two notes on nilpotent groups /
[ R. C. Lyndon ] / Proc. Amer. Math. Soc.   DOI   ScienceOn
8 Intersection and union of relatively convex subgroups of orderable groups /
[ A. I. Kokorin ] / Algebra & Logic   DOI
9 Varieties of lattice-ordered groups /
[ J. Martinez ] / Math. Z.   DOI
10 Orderable Groups /
[ R. B. Mura;A. H. Rhemtulla ] / Lecture Notes in Pure & Appl. Math.
11 On linearization of ordered groups /
[ A. H. Ohnishi ] / Osaka J. Math.
12 Free subgroups in linear groups /
[ J. Tits ] / J. Algebra   DOI
13 The stability group of a series of subgroups /
[ P. Hall;B. Hartley ] / Proc. London Math. Soc.   DOI
14 The Group of Formal Power Series Under Substitution /
[ D. L. Johnson ] / J. Aust. Math. Soc. (Series A)   DOI
15 Finiteness conditions for soluble groups /
[ P. Hall ] / Proc. London Math. Soc.
16 Nilpotent, weakly abelian and Hamiltonian lattice-ordered groups /
[ N. R. Reilly ] / Czechoslovak Math. J.
17 Residually <TEX>$F_p$</TEX> groups, for many primes p, are orderable /
[ A. H. Rhemtulla ] / Proc. Amer. Math. Soc.   DOI   ScienceOn
18 Partially Ordered Groups /
[ A. M. W. Glass ] / Series in Algebra
19 /
[ A. I. Kokorin;V. M. Kopytov ] / Fully Ordered Groups