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Non-Abelian varieties of lattice-ordered groups in which every solvable \(\ell\)-group is Abelian. (Russian) Zbl 0574.06012
From the author’s introduction: ”In the present paper linearly ordered groups (l.o. groups) are constructed which possess a number of interesting properties and a variety of o-approximable \(\ell\)-groups in which solvable non-abelian \(\ell\)-groups do not exist. In particular, the l.o. group F constructed in §§ 2 and 3 possesses the following properties: F is non-abelian with the property \(e<a\ll b\) implies \(a\ll b^{-1}ab\); the factor group H/N of a subgroup H of F modulo a convex and normal (with respect to H) subgroup N is either abelian or non- solvable. The variety of \(\ell\)-groups \(\ell\)-var F generated by F is non-abelian and consists of o-approximable \(\ell\)-groups and each of its solvable \(\ell\)-groups is abelian. This variety is a new example of a minimal cover of the \(\ell\)-variety of the abelian \(\ell\)-groups in the lattice of varieties of \(\ell\)-groups. The description of properties of the l.o. group F or the variety \(\ell\)-var F is given in §3 or 4 resp.”
Reviewer: F.Šik

MSC:
06F15 Ordered groups
08B15 Lattices of varieties
06B20 Varieties of lattices
20F60 Ordered groups (group-theoretic aspects)
20E10 Quasivarieties and varieties of groups
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