The first-order theory of -permutation groups
Abstract
Let (, ≤) be a totally ordered set. We prove that if (,≤) is transitive and satisfies the same first-order sentences as (,≤) (in the language of lattice-ordered groups) then and are isomorphic ordered sets. This improvement of a theorem of Gurevich and Holland is obtained as one of many consequences of a study of centralizers and coloured chains associated with certain transitive subgroups of (,≤).
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