Talk:Dedekind group

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Axiom of choice

Latest comment: 11 months ago2 comments2 people in discussion

The existence of bases for vector spaces is equivalent to the axiom of choice. The group B only needs to be a vector space over the field with 2 elements. It does not need to have a basis without the axiom of choice. GeoffreyT2000 (talk) 20:37, 7 March 2015 (UTC)Reply

??? 67.198.37.16 (talk) 05:37, 11 June 2023 (UTC)Reply

"All abelian groups are Dedekind groups. A non-abelian Dedekind group is called a Hamiltonian group."

Latest comment: 6 years ago2 comments2 people in discussion

this doesn't make sense. i suppose what it is meant to say is that Dedekind groups are Hamiltonian groups that are Abelian (Hamiltonian superset of Dedekind)? --sofias. (talk) 09:59, 12 September 2017 (UTC)Reply

What do you mean? Dedekind groups may or may not be Abelian, but all Abelian groups are Dedekind. A group is called a Hamilton group if it is Dedekind and non-abelian. So, a Dedekind group is either an Abelian group or a Hamiltonian group. – Tea2min (talk) 12:07, 12 September 2017 (UTC)Reply