free group

The free group on k generators is the group F_k = ⟨a₁,...,a_k⟩. See generators and relations for groups for precise definition and explanation of what "generated" means here (or see the short explanation below). There are no relations for this group. One can also define free groups on infinite sets of generators in the obvious manner; however, note that products of these generators are still finite (we have no topology, hence no convergence).

Elements of the group have a canonical form a_i1^n₁...a_im^n_m, where 1≤i_j≤k is the index of some generator, 0≠n_j∈Z is a nonzero integer, and i_j≠i_j+1. Any element can be translated to canonical form by combining adjacently equal a_i's. For instance,

a₂ a₁ a₃² a₃^-4 a₁² = a₂ a₁ a₃^-2 a₁².

Making groups from the free group

Any group with k generators is a quotient group of F_k. The relations of the group are a normal subgroup N, and the group is simply F_k/N.

Obviously, F_j is a subgroup (as well as a quotient group) of F_k whenever j≤k. Somewhat amazingly, the reverse also holds! We shall show that F_k is a subgroup of F₂ -- thus, study of this one group encompasses all of (finite, and even countable) group theory!

To generate a copy F_k≅G≤F₂=⟨a,b⟩, we look at the subgroup generated by the elements

⟨e₁=a¹ba^-1,...,e_k=a^kba^-k⟩.

e_i^me_jⁿ = aⁱb^ma^j-ibⁿa^-j.

The free group can also be found as a quotient in numerous places. Perhaps the most famous is the identification of a subgroup of PSL₂(Z) (itself a quotient group of the group SL₂(Z) of integer 2×2 matrices with determinant 1) as the free group F₂. This identification is what makes hyperbolic geometry interesting.