- Archimedean group
In
abstract algebra , a branch ofmathematics , an Archimedean group is analgebraic structure consisting of a set together with abinary operation andbinary relation satisfying certain axioms detailed below. We can also say that an Archimedean group is alinearly ordered group for which theArchimedean property holds. For example, the set R ofreal number s together with the operation of addition and usual ordering relation (≤) is an Archimedean group. The concept is named afterArchimedes .Definition
In the subsequent, we use the notation (where is in the set N of
natural number s) for the sum of "a" with itself "n" times.An Archimedean group ("G", +, ≤) is a
linearly ordered group subject to the following condition:for any "a" and "b" in "G" which are greater than "0", the inequality "na" ≤ "b" for any "n" in N implies "a" = 0.
Examples of Archimedean groups
The sets of the
integer s, therational number s, thereal number s, together with the operation of addition and the usual ordering (≤), are Archimedean groups.Examples of non-Archimedean groups
An ordered group ("G", +, ≤) defined as follows is not Archimedean:
* "G" = R × R.
* Let "a" = ("u", "v") and "b" = ("x", "y") then "a" + "b" = ("u" + "x", "v" + "y")
* "a" ≤ "b"iff "v" < "y" or ("v" = "y" and "u" ≤ "x") (lexicographical order with the least-significant number on the left).Proof: Consider the elements (1, 0) and (0, 1). For all "n" in N one evidently has "n" (1, 0) < (0, 1).
For another example, see
p-adic number .Theorems
For each "a", "b" in "G" there exist "m", "n" in N such that "ma" ≤ "b" and "a" ≤ "nb".
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