Every group is a subgroup of an acyclic group
This article gives the statement, and possibly proof, of an embeddability theorem: a result that states that any group of a certain kind can be embedded in a group of a more restricted kind.
View a complete list of embeddability theorems
Every group can be realized as a subgroup of an acyclic group.
- Every group is a conjugacy-closed subgroup of an acyclic group
- Every group is a subgroup of a binate group