Category:Subgroup properties
From Wikipedia, the free encyclopedia
Subgroup properties are properties of subgroups of a group. These properties are assumed to satisfy only one condition : they must be invariant up to commuting isomorphism. That is, if G and G' are isomorphic groups, and H is a subgroup of G whose image under the isomorphism is H' then H has the property in G if and only if H' has the property in G'.
Pages in category "Subgroup properties"
The following 36 pages are in this category, out of 36 total. Updates to this list can occasionally be delayed for a few days.
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