Weakly abelian lattice-ordered groups

Glass, A.

doi:10.1090/S0002-9939-00-05706-3

Weakly abelian lattice-ordered groups
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by A. M. W. Glass PDF

Proc. Amer. Math. Soc. 129 (2001), 677-684 Request permission

Corrigendum: Proc. Amer. Math. Soc. 130 (2002), 925-926.

Abstract:

Every nilpotent lattice-ordered group is weakly Abelian; i.e., satisfies the identity $x^{-1}(y\vee 1)x\vee (y\vee 1)^2=(y\vee 1)^2$. In 1984, V. M. Kopytov asked if every weakly Abelian lattice-ordered group belongs to the variety generated by all nilpotent lattice-ordered groups [The Black Swamp Problem Book, Question 40]. In the past 15 years, all attempts have centred on finding counterexamples. We show that two constructions of weakly Abelian lattice-ordered groups fail to be counterexamples. They include all preiously considered potential counterexamples and also many weakly Abelian ordered free groups on finitely many generators. If every weakly Abelian ordered free group on finitely many generators belongs to the variety generated by all nilpotent lattice-ordered groups, then every weakly Abelian lattice-ordered group belongs to this variety. This paper therefore redresses the balance and suggests that Kopytov’s problem is even more intriguing.

References

A. M. W. Glass, Partially Ordered Groups, Series in Algebra vol. 7, World Scientific Pub. Co., Singapore, 1999.
S. A. Gurchenkov, About varieties of weakly abelian $l$-groups, Math. Slovaca 42 (1992), no. 4, 437–441. MR 1195037
Marshall Hall Jr., The theory of groups, The Macmillan Company, New York, N.Y., 1959. MR 0103215
J. Martinez, Varieties of lattice-ordered groups, Math. Z. 137(1974), 265-284.
Norman R. Reilly, Nilpotent, weakly abelian and Hamiltonian lattice ordered groups, Czechoslovak Math. J. 33(108) (1983), no. 3, 348–353. MR 718919
A. A. Vinogradov, Non-axiomatizability of lattice-ordered groups, Siberian Math. J. 13(1971), 331-332.