Stallings theorem about ends of groups explained

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

has more than one end if and only if

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

See main article: End (graph theory). Let

\Gamma

be a connected graph where the degree of every vertex is finite. One can view

\Gamma

as a topological space by giving it the natural structure of a one-dimensional cell complex. Then the ends of

\Gamma

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\geqslant0

be a non-negative integer. The graph

\Gamma

is said to satisfy

e(\Gamma)\leqslantn

if for every finite collection

of edges of

\Gamma

the graph

\Gamma-F

has at most

infinite connected components. By definition,

e(\Gamma)=m

e(\Gamma)\leqslantm

and if for every

0\leqslantn<m

the statement

e(\Gamma)\leqslantn

is false. Thus

e(\Gamma)=m

is the smallest nonnegative integer

such that

e(\Gamma)\leqslantn

. If there does not exist an integer

n\geqslant0

such that

e(\Gamma)\leqslantn

, put

e(\Gamma)=infty

. The number

e(\Gamma)

is called the number of ends of

\Gamma

Informally,

e(\Gamma)

is the number of "connected components at infinity" of

\Gamma

. If

e(\Gamma)=m<infty

, then for any finite set

of edges of

\Gamma

there exists a finite set

of edges of

\Gamma

with

F\subseteqK

such that

\Gamma-F

has exactly

infinite connected components. If

e(\Gamma)=infty

, then for any finite set

of edges of

\Gamma

and for any integer

n\geqslant0

there exists a finite set

of edges of

\Gamma

with

F\subseteqK

such that

\Gamma-K

has at least

infinite connected components.

Ends of groups

Let

be a finitely generated group. Let

S\subseteqG

be a finite generating set of

and let

\Gamma(G,S)

be the Cayley graph of

with respect to

. The number of ends of

is defined as

e(G)=e(\Gamma(G,S))

. A basic fact in the theory of ends of groups says that

e(\Gamma(G,S))

does not depend on the choice of a finite generating set

, so that

e(G)

is well-defined.

Basic facts and examples

we have

e(G)=0

if and only if

is finite.

we have

e(Z)=2.

For the free abelian group of rank two

Z²

we have

e(Z^2)=1.

F(X)

where

1<|X|<infty

we have

e(F(X))=infty

Freudenthal-Hopf theorems

Hans Freudenthal^[3] and independently Heinz Hopf^[4] established in the 1940s the following two facts:

we have

e(G)\in\{0,1,2,infty\}

we have

e(G)=2

if and only if

is virtually infinite cyclic (that is,

contains an infinite cyclic subgroup of finite index).Charles T. C. Wall proved in 1967 the following complementary fact:^[5]

A group

is virtually infinite cyclic if and only if it has a finite normal subgroup

such that

G/W

is either infinite cyclic or infinite dihedral.

Cuts and almost invariant sets

Let

be a finitely generated group,

S\subseteqG

be a finite generating set of

and let

\Gamma=\Gamma(G,S)

be the Cayley graph of

with respect to

. For a subset

A\subseteqG

denote by

A^*

the complement

G-A

For a subset

A\subseteqG

, the edge boundary or the co-boundary

\deltaA

consists of all (topological) edges of

\Gamma

connecting a vertex from

with a vertex from

A^*

. Note that by definition

\deltaA=\deltaA^*

An ordered pair

(A,A^*)

is called a cut in

\Gamma

\deltaA

is finite. A cut

(A,A^*)

is called essential if both the sets

and

A^*

are infinite.

A subset

A\subseteqG

is called almost invariant if for every

g\inG

the symmetric difference between

and

is finite. It is easy to see that

(A,A^*)

is a cut if and only if the sets

and

A^*

are almost invariant (equivalently, if and only if the set

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

G=H*K

where

and

are nontrivial finitely generated groups then the Cayley graph of

has at least one essential cut and hence

e(G)>1

. Indeed, let

and

be finite generating sets for

and

accordingly so that

S=X\cupY

is a finite generating set for

and let

\Gamma=\Gamma(G,S)

be the Cayley graph of

with respect to

. Let

consist of the trivial element and all the elements of

whose normal form expressions for

G=H*K

starts with a nontrivial element of

. Thus

A^*

consists of all elements of

whose normal form expressions for

G=H*K

starts with a nontrivial element of

. It is not hard to see that

(A,A^*)

is an essential cut in Γ so that

e(G)>1

G=H*_CK

is a free product with amalgamation where

is a finite group such that

C ≠ H

and

C ≠ K

then

and

are finitely generated and

e(G)>1

G=\langleH,t|t^-1C_1t=C_2\rangle

is an HNN-extension where

C₁

C₂

are isomorphic finite subgroups of

then

is a finitely generated group and

e(G)>1

Stallings' theorem shows that the converse is also true.

Formal statement of Stallings' theorem

Let

be a finitely generated group.

Then

e(G)>1

if and only if one of the following holds:

The group

admits a splitting

G=H*_CK

as a free product with amalgamation where

is a finite group such that

C ≠ H

and

C ≠ K

The group

is an HNN extension
G=\langleH,t|t^-1C_1t=C_2\rangle

where and
C₁

,
C₂

are isomorphic finite subgroups of
H

.

we have

e(G)>1

if and only if

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

is a torsion-free finitely generated group, Stallings' theorem implies that

e(G)=infty

if and only if

admits a proper free product decomposition

G=A*B

with both

and

nontrivial.

Applications and generalizations

Among the immediate applications of Stallings' theorem was a proof by Stallings^[6] of a long-standing conjecture that every finitely generated group of cohomological dimension one is free and that every torsion-free virtually free group is free.
Stallings' theorem also implies that the property of having a nontrivial splitting over a finite subgroup is a quasi-isometry invariant of a finitely generated group since the number of ends of a finitely generated group is easily seen to be a quasi-isometry invariant. For this reason Stallings' theorem is considered to be one of the first results in geometric group theory.
Stallings' theorem was a starting point for Dunwoody's accessibility theory. A finitely generated group

is said to be accessible if the process of iterated nontrivial splitting of

over finite subgroups always terminates in a finite number of steps. In Bass–Serre theory terms that the number of edges in a reduced splitting of

as the fundamental group of a graph of groups with finite edge groups is bounded by some constant depending on

. Dunwoody proved^[7] that every finitely presented group is accessible but that there do exist finitely generated groups that are not accessible.^[8] Linnell^[9] showed that if one bounds the size of finite subgroups over which the splittings are taken then every finitely generated group is accessible in this sense as well. These results in turn gave rise to other versions of accessibility such as Bestvina-Feighn accessibility^[10] of finitely presented groups (where the so-called "small" splittings are considered), acylindrical accessibility,^[11] ^[12] strong accessibility,^[13] and others.

Stallings' theorem is a key tool in proving that a finitely generated group

is virtually free if and only if

can be represented as the fundamental group of a finite graph of groups where all vertex and edge groups are finite (see, for example,^[14]).

Using Dunwoody's accessibility result, Stallings' theorem about ends of groups and the fact that if

is a finitely presented group with asymptotic dimension 1 then

is virtually free one can show that for a finitely presented word-hyperbolic group

the hyperbolic boundary of

has topological dimension zero if and only if

is virtually free.

Relative versions of Stallings' theorem and relative ends of finitely generated groups with respect to subgroups have also been considered. For a subgroup

H\leqslantG

of a finitely generated group

one defines the number of relative ends

e(G,H)

as the number of ends of the relative Cayley graph (the Schreier coset graph) of

with respect to

. The case where

e(G,H)>1

is called a semi-splitting of

over

. Early work on semi-splittings, inspired by Stallings' theorem, was done in the 1970s and 1980s by Scott,^[15] Swarup,^[16] and others.^[17] ^[18] The work of Sageev^[19] and Gerasimov^[20] in the 1990s showed that for a subgroup

H\leqslantG

the condition

e(G,H)>1

corresponds to the group

admitting an essential isometric action on a CAT(0)-cubing where a subgroup commensurable with

stabilizes an essential "hyperplane" (a simplicial tree is an example of a CAT(0)-cubing where the hyperplanes are the midpoints of edges). In certain situations such a semi-splitting can be promoted to an actual algebraic splitting, typically over a subgroup commensurable with

, such as for the case where

is finite (Stallings' theorem). Another situation where an actual splitting can be obtained (modulo a few exceptions) is for semi-splittings over virtually polycyclic subgroups. Here the case of semi-splittings of word-hyperbolic groups over two-ended (virtually infinite cyclic) subgroups was treated by Scott-Swarup^[21] and by Bowditch.^[22] The case of semi-splittings of finitely generated groups with respect to virtually polycyclic subgroups is dealt with by the algebraic torus theorem of Dunwoody-Swenson.^[23]

A number of new proofs of Stallings' theorem have been obtained by others after Stallings' original proof. Dunwoody gave a proof^[24] based on the ideas of edge-cuts. Later Dunwoody also gave a proof of Stallings' theorem for finitely presented groups using the method of "tracks" on finite 2-complexes.^[7] Niblo obtained a proof^[25] of Stallings' theorem as a consequence of Sageev's CAT(0)-cubing relative version, where the CAT(0)-cubing is eventually promoted to being a tree. Niblo's paper also defines an abstract group-theoretic obstruction (which is a union of double cosets of

) for obtaining an actual splitting from a semi-splitting. It is also possible to prove Stallings' theorem for finitely presented groups using Riemannian geometry techniques of minimal surfaces, where one first realizes a finitely presented group as the fundamental group of a compact

-manifold (see, for example, a sketch of this argument in the survey article of Wall^[26]). Gromov outlined a proof (see pp. 228–230 in ^[27]) where the minimal surfaces argument is replaced by an easier harmonic analysis argument and this approach was pushed further by Kapovich to cover the original case of finitely generated groups.^[28] ^[29]

Notes and References

John R. Stallings. On torsion-free groups with infinitely many ends. Annals of Mathematics (2), vol. 88 (1968), pp. 312 - 334
John Stallings. Group theory and three-dimensional manifolds. A James K. Whittemore Lecture in Mathematics given at Yale University, 1969. Yale Mathematical Monographs, 4. Yale University Press, New Haven, Conn.-London, 1971.
H. Freudenthal. Über die Enden diskreter Räume und Gruppen. Comment. Math. Helv. 17, (1945). 1-38.
H. Hopf.Enden offener Räume und unendliche diskontinuierliche Gruppen.Comment. Math. Helv. 16, (1944). 81-100
Lemma 4.1 in C. T. C. Wall, Poincaré Complexes: I. Annals of Mathematics, Second Series, Vol. 86, No. 2 (Sep., 1967), pp. 213-245
John R. Stallings. Groups of dimension 1 are locally free. Bulletin of the American Mathematical Society, vol. 74 (1968), pp. 361 - 364
M. J. Dunwoody. The accessibility of finitely presented groups. Inventiones Mathematicae, vol. 81 (1985), no. 3, pp. 449-457
M. J. Dunwoody. An inaccessible group. Geometric group theory, Vol. 1 (Sussex, 1991), pp. 75 - 78, London Mathematical Society Lecture Note Series, vol. 181, Cambridge University Press, Cambridge, 1993;
Linnell . P. A. . 10.1016/0022-4049(83)90037-3 . 1 . Journal of Pure and Applied Algebra . 716233 . 39–46 . On accessibility of groups . 30 . 1983. free .
M. Bestvina and M. Feighn. Bounding the complexity of simplicial group actions on trees. Inventiones Mathematicae, vol. 103 (1991), no. 3, pp. 449 - 469
Z. Sela. Acylindrical accessibility for groups. Inventiones Mathematicae, vol. 129 (1997), no. 3, pp. 527 - 565
T. Delzant. Sur l'accessibilité acylindrique des groupes de présentation finie. Université de Grenoble. Annales de l'Institut Fourier, vol. 49 (1999), no. 4, pp. 1215 - 1224
Delzant . Thomas . Potyagailo . Leonid . 10.1016/S0040-9383(99)00078-6 . 3 . Topology . 1838998 . 617–629 . Accessibilité hiérarchique des groupes de présentation finie . 40 . 2001. free .
H. Bass. Covering theory for graphs of groups. Journal of Pure and Applied Algebra, vol. 89 (1993), no. 1-2, pp. 3 - 47
Scott . Peter . 10.1016/0022-4049(77)90051-2 . 1-3 . Journal of Pure and Applied Algebra . 487104 . 179–198 . Ends of pairs of groups . 11 . 1977–1978.
Swarup . G. Ananda . 10.1016/0022-4049(77)90042-1 . 1-3 . Journal of Pure and Applied Algebra . 466326 . 75–82 . Relative version of a theorem of Stallings . 11 . 1977–1978. free .
H. Müller. Decomposition theorems for group pairs. Mathematische Zeitschrift, vol. 176 (1981), no. 2, pp. 223 - 246
Kropholler . P. H. . Roller . M. A. . 10.1016/0022-4049(89)90014-5 . 2 . Journal of Pure and Applied Algebra . 1025923 . 197–210 . Relative ends and duality groups . 61 . 1989.
Michah Sageev. Ends of group pairs and non-positively curved cube complexes. Proceedings of the London Mathematical Society (3), vol. 71 (1995), no. 3, pp. 585 - 617
V. N. Gerasimov. Semi-splittings of groups and actions on cubings. (in Russian) Algebra, geometry, analysis and mathematical physics (Novosibirsk, 1996), pp. 91 - 109, 190, Izdat. Ross. Akad. Nauk Sib. Otd. Inst. Mat., Novosibirsk, 1997
G. P. Scott, and G. A. Swarup. An algebraic annulus theorem. Pacific Journal of Mathematics, vol. 196 (2000), no. 2, pp. 461 - 506
B. H. Bowditch. Cut points and canonical splittings of hyperbolic groups. Acta Mathematica, vol. 180 (1998), no. 2, pp. 145 - 186
M. J. Dunwoody, and E. L. Swenson. The algebraic torus theorem. Inventiones Mathematicae, vol. 140 (2000), no. 3, pp. 605 - 637
M. J. Dunwoody. Cutting up graphs. Combinatorica, vol. 2 (1982), no. 1, pp. 15 - 23
Graham A. Niblo. A geometric proof of Stallings' theorem on groups with more than one end. Geometriae Dedicata, vol. 105 (2004), pp. 61 - 76
C. T. C. Wall. The geometry of abstract groups and their splittings. Revista Matemática Complutense vol. 16(2003), no. 1, pp. 5 - 101
M. Gromov, Hyperbolic Groups, in "Essays in Group Theory" (G. M. Gersten, ed.), MSRI Publ. 8, 1987, pp. 75-263
Gentimis Thanos, Asymptotic dimension of finitely presented groups, http://www.ams.org/journals/proc/2008-136-12/S0002-9939-08-08973-9/home.html
M. Kapovich. Energy of harmonic functions and Gromov's proof of Stallings' theorem, preprint, 2007, arXiv:0707.4231

Stallings theorem about ends of groups explained

Ends of graphs

Ends of groups

Basic facts and examples

Freudenthal-Hopf theorems

Cuts and almost invariant sets

Cuts and ends

Cuts and splittings over finite groups

Formal statement of Stallings' theorem

Applications and generalizations

See also

Notes and References