Group satisfying Tits alternative

Statement

A group is said to satisfy the Tits alternative if every subgroup of it is either virtually solvable (i.e., has a solvable subgroup of finite index) or contains a free non-Abelian subgroup.

Relation with other properties

Stronger properties

• Finite group
• Abelian group
• Nilpotent group
• Solvable group
• Virtually Abelian group
• Virtually nilpotent group
• Virtually solvable group
• Free group

Weaker properties

• Group satisfying Tits alternative for finitely generated subgroups