Stallings theorem about ends of groups

In the mathematical subject of group theory, the Stallings theorem about ends of groups states that a finitely generated group G has more than one end if and only if the group G admits a nontrivial decomposition as an amalgamated free product or an HNN extension over a finite subgroup. In the modern language of Bass–Serre theory the theorem says that a finitely generated group G has more than one end if and only if G admits a nontrivial (that is, without a global fixed point) action on a simplicial tree with finite edge-stabilizers and without edge-inversions.

The theorem was proved by John R. Stallings, first in the torsion-free case (1968)[1] and then in the general case (1971).[2]

Ends of graphs

Main article: End (graph theory)

Let Γ be a connected graph where the degree of every vertex is finite. One can view Γ as a topological space by giving it the natural structure of a one-dimensional cell complex. Then the ends of Γ are the ends of this topological space. A more explicit definition of the number of ends of a graph is presented below for completeness.

Let n ≥ 0 be a non-negative integer. The graph Γ is said to satisfy e(Γ) ≤ n if for every finite collection F of edges of Γ the graph Γ  F has at most n infinite connected components. By definition, e(Γ) = m if e(Γ) ≤ m and if for every 0 ≤ n < m the statement e(Γ) ≤ n is false. Thus e(Γ) = m if m is the smallest nonnegative integer n such that e(Γ) ≤ n. If there does not exist an integer n ≥ 0 such that e(Γ) ≤ n, put e(Γ) = ∞. The number e(Γ) is called the number of ends of Γ.

Informally, e(Γ) is the number of "connected components at infinity" of Γ. If e(Γ) = m < ∞, then for any finite set F of edges of Γ there exists a finite set K of edges of Γ with FK such that Γ  F has exactly m infinite connected components. If e(Γ) = ∞, then for any finite set F of edges of Γ and for any integer n ≥ 0 there exists a finite set K of edges of Γ with FK such that Γ  K has at least n infinite connected components.

Ends of groups

Let G be a finitely generated group. Let SG be a finite generating set of G and let Γ(G, S) be the Cayley graph of G with respect to S. The number of ends of G is defined as e(G) = e(Γ(G, S)). A basic fact in the theory of ends of groups says that e(Γ(G, S)) does not depend on the choice of a finite generating set S of G, so that e(G) is well-defined.

Basic facts and examples

Cuts and almost invariant sets

Let G be a finitely generated group, SG be a finite generating set of G and let Γ = Γ(G, S) be the Cayley graph of G with respect to S. For a subset AG denote by A the complement G  A of A in G.

For a subset AG, the edge boundary or the co-boundary δA of A consists of all (topological) edges of Γ connecting a vertex from A with a vertex from A. Note that by definition δA = δA.

An ordered pair (A, A) is called a cut in Γ if δA is finite. A cut (A,A) is called essential if both the sets A and A are infinite.

A subset AG is called almost invariant if for every gG the symmetric difference between A and Ag is finite. It is easy to see that (A, A) is a cut if and only if the sets A and A are almost invariant (equivalently, if and only if the set A is almost invariant).

Cuts and ends

A simple but important observation states:

e(G) > 1 if and only if there exists at least one essential cut (A,A) in Γ.

Cuts and splittings over finite groups

If G = HK where H and K are nontrivial finitely generated groups then the Cayley graph of G has at least one essential cut and hence e(G) > 1. Indeed, let X and Y be finite generating sets for H and K accordingly so that S = X  Y is a finite generating set for G and let Γ=Γ(G,S) be the Cayley graph of G with respect to S. Let A consist of the trivial element and all the elements of G whose normal form expressions for G = HK starts with a nontrivial element of H. Thus A consists of all elements of G whose normal form expressions for G = HK starts with a nontrivial element of K. It is not hard to see that (A,A) is an essential cut in Γ so that e(G) > 1.

A more precise version of this argument shows that for a finitely generated group G:

Stallings' theorem shows that the converse is also true.

Formal statement of Stallings' theorem

Let G be a finitely generated group.

Then e(G) > 1 if and only if one of the following holds:

In the language of Bass-Serre theory this result can be restated as follows: For a finitely generated group G we have e(G) > 1 if and only if G admits a nontrivial (that is, without a global fixed vertex) action on a simplicial tree with finite edge-stabilizers and without edge-inversions.

For the case where G is a torsion-free finitely generated group, Stallings' theorem implies that e(G) = ∞ if and only if G admits a proper free product decomposition G = AB with both A and B nontrivial.

Applications and generalizations

See also

Notes

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