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In mathematics, a linearly ordered group is both a group and a linearly ordered set, in which the group operation is in a certain sense compatible with the linear ordering. Specifically, we have
- For any x in the group G, either x ≥ 0 or −x ≥ 0, but not both, and
- For any x, y, z in G, if x ≤ y, then x + z ≤ y + z.
(See also ordered group.)
Otto Hölder showed that every linearly ordered group satisfying an Archimedean property is isomorphic to a subgroup of the additive group of real numbers.
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