Archimedean group
In abstract algebra, a branch of mathematics, an Archimedean group is a linearly ordered group for which the Archimedean property holds: every two positive group elements are bounded by integer multiples of each other. The set R of real numbers together with the operation of addition and the usual ordering relation between pairs of numbers is an Archimedean group. By a result of Otto Hölder, every Archimedean group is isomorphic to a subgroup of this group. The name "Archimedean" comes from Otto Stolz, who named the Archimedean property after its appearance in the works of Archimedes.
Wikipage disambiguates
Wikipage redirect
Link from a Wikipage to another Wikipage
primaryTopic
Archimedean group
In abstract algebra, a branch of mathematics, an Archimedean group is a linearly ordered group for which the Archimedean property holds: every two positive group elements are bounded by integer multiples of each other. The set R of real numbers together with the operation of addition and the usual ordering relation between pairs of numbers is an Archimedean group. By a result of Otto Hölder, every Archimedean group is isomorphic to a subgroup of this group. The name "Archimedean" comes from Otto Stolz, who named the Archimedean property after its appearance in the works of Archimedes.
has abstract
Dalam aljabar abstrak, sebuah ...... lannya dalam karya Archimedes.
@in
In abstract algebra, a branch ...... ce in the works of Archimedes.
@en
Wikipage page ID
page length (characters) of wiki page
Wikipage revision ID
1,019,223,744
Link from a Wikipage to another Wikipage
wikiPageUsesTemplate
subject
comment
Dalam aljabar abstrak, sebuah ...... lannya dalam karya Archimedes.
@in
In abstract algebra, a branch ...... ce in the works of Archimedes.
@en
label
Archimedean group
@en
Grup Archimedean
@in