One-relator group

In the mathematical subject of group theory, a one-relator group is a group given by a group presentation with a single defining relation. One-relator groups play an important role in geometric group theory by providing many explicit examples of finitely presented groups.

Formal definition

A one-relator group is a group G that admits a group presentation of the form

${\displaystyle G=\langle X\mid r=1\,\rangle }$

(1)

where X is a set (in general possibly infinite), and where ${\displaystyle r\in F(X)}$  is a freely and cyclically reduced word.

If Y is the set of all letters ${\displaystyle x\in X}$  that appear in r and ${\displaystyle X'=X\setminus Y}$  then

${\displaystyle G=\langle Y\mid r=1\,\rangle \ast F(X').}$ 

For that reason X in (1) is usually assumed to be finite where one-relator groups are discussed, in which case (1) can be rewritten more explicitly as

${\displaystyle G=\langle x_{1},\dots ,x_{n}\mid r=1\,\rangle ,}$

(2)

where ${\displaystyle X=\{x_{1},\dots ,x_{n}\}}$  for some integer ${\displaystyle n\geq 1.}$ 

Freiheitssatz

Main article: Freiheitssatz

Let G be a one-relator group given by presentation (1) above. Recall that r is a freely and cyclically reduced word in F(X). Let ${\displaystyle y\in X}$  be a letter such that ${\displaystyle y}$  or ${\displaystyle y^{-1}}$  appears in r. Let ${\displaystyle X_{1}\subseteq X\setminus \{y\}}$ . The subgroup ${\displaystyle H=\langle X_{1}\rangle \leq G}$  is called a Magnus subgroup of G.

A famous 1930 theorem of Wilhelm Magnus,^[1] known as Freiheitssatz, states that in this situation H is freely generated by ${\displaystyle X_{1}}$ , that is, ${\displaystyle H=F(X_{1})}$ . See also^[2][3] for other proofs.

Properties of one-relator groups

Here we assume that a one-relator group G is given by presentation (2) with a finite generating set ${\displaystyle X=\{x_{1},\dots ,x_{n}\}}$  and a nontrivial freely and cyclically reduced defining relation ${\displaystyle 1\neq r\in F(X)}$ .

• A one-relator group G is torsion-free if and only if ${\displaystyle r\in F(x_{1},\ldots ,x_{n})}$  is not a proper power.

• Every one-relator group G is virtually torsion-free, that is, admits a torsion-free subgroup of finite index.^[4]

• A one-relator presentation is diagrammatically aspherical.^[5]

• If ${\displaystyle r\in F(x_{1},\ldots ,x_{n})}$  is not a proper power then the presentation complex P for presentation (2) is a finite Eilenberg–MacLane complex ${\displaystyle K(G,1)}$ .^[6]

• If ${\displaystyle r\in F(x_{1},\ldots ,x_{n})}$  is not a proper power then a one-relator group G has cohomological dimension ${\displaystyle \leq 2}$ .

• A one-relator group G is free if and only if ${\displaystyle r\in F(x_{1},\ldots ,x_{n})}$  is a primitive element; in this case G is free of rank n − 1.^[7]

• Suppose the element ${\displaystyle r\in F(x_{1},\ldots ,x_{n})}$  is of minimal length under the action of ${\displaystyle \operatorname {Aut} (F_{n})}$ , and suppose that for every ${\displaystyle i=1,\dots ,n}$  either ${\displaystyle x_{i}}$  or ${\displaystyle x_{i}^{-1}}$  occurs in r. Then the group G is freely indecomposable.^[8]

• If ${\displaystyle r\in F(x_{1},\ldots ,x_{n})}$  is not a proper power then a one-relator group G is locally indicable, that is, every nontrivial finitely generated subgroup of G admits a group homomorphism onto ${\displaystyle \mathbb {Z} }$ .^[9]

• Every one-relator group G has algorithmically decidable word problem.^[10]

• If G is a one-relator group and ${\displaystyle H\leq G}$  is a Magnus subgroup then the subgroup membership problem for H in G is decidable.^[10]

• It is unknown if one-relator groups have solvable conjugacy problem.

• It is unknown if the isomorphism problem is decidable for the class of one-relator groups.

• A one-relator group G given by presentation (2) has rank n (that is, it cannot be generated by fewer than n elements) unless ${\displaystyle r\in F(x_{1},\ldots ,x_{n})}$  is a primitive element.^[11]

• Let G be a one-relator group given by presentation (2). If ${\displaystyle n\geq 3}$  then the center of G is trivial, ${\displaystyle Z(G)=\{1\}}$ . If ${\displaystyle n=2}$  and G is non-abelian with non-trivial center, then the center of G is infinite cyclic.^[12]

• Let ${\displaystyle r,s\in F(X)}$  where ${\displaystyle X=\{x_{1},\dots ,x_{n}\}}$ . Let ${\displaystyle N_{1}=\langle \langle r\rangle \rangle _{F(X)}}$  and ${\displaystyle N_{2}=\langle \langle s\rangle \rangle _{F(X)}}$  be the normal closures of r and s in F(X) accordingly. Then ${\displaystyle N_{1}=N_{2}}$  if and only if ${\displaystyle r}$  is conjugate to ${\displaystyle s}$  or ${\displaystyle s^{-1}}$  in F(X).^[13][14]

• There exists a finitely generated one-relator group that is not Hopfian and therefore not residually finite, for example the Baumslag–Solitar group ${\displaystyle B(2,3)=\langle a,b\mid b^{-1}a^{2}b=a^{3}\rangle }$ .^[15]

• Let G be a one-relator group given by presentation (2). Then G satisfies the following version of the Tits alternative. If G is torsion-free then every subgroup of G either contains a free group of rank 2 or is solvable. If G has nontrivial torsion, then every subgroup of G either contains a free group of rank 2, or is cyclic, or is infinite dihedral.^[16]

• Let G be a one-relator group given by presentation (2). Then the normal subgroup ${\displaystyle N=\langle \langle r\rangle \rangle _{F(X)}\leq F(X)}$  admits a free basis of the form ${\displaystyle \{u_{i}^{-1}ru_{i}\mid i\in I\}}$  for some family of elements ${\displaystyle \{u_{i}\in F(X)\mid i\in I\}}$ .^[17]

One-relator groups with torsion

Suppose a one-relator group G given by presentation (2) where ${\displaystyle r=s^{m}}$  where ${\displaystyle m\geq 2}$  and where ${\displaystyle 1\neq s\in F(X)}$  is not a proper power (and thus s is also freely and cyclically reduced). Then the following hold:

• The element s has order m in G, and every element of finite order in G is conjugate to a power of s.^[18]

• Every finite subgroup of G is conjugate to a subgroup of ${\displaystyle \langle s\rangle }$  in G. Moreover, the subgroup of G generated by all torsion elements is a free product of a family of conjugates of ${\displaystyle \langle s\rangle }$  in G.^[4]

• G admits a torsion-free normal subgroup of finite index.^[4]

• Newman's "spelling theorem"^[19][20] Let ${\displaystyle 1\neq w\in F(X)}$  be a freely reduced word such that ${\displaystyle w=1}$  in G. Then w contains a subword v such that v is also a subword of ${\displaystyle r}$  or ${\displaystyle r^{-1}}$  of length ${\displaystyle |v|=1+(m-1)|s|}$ . Since ${\displaystyle m\geq 2}$  that means that ${\displaystyle |v|>|r|/2}$  and presentation (2) of G is a Dehn presentation.

• G has virtual cohomological dimension ${\displaystyle \leq 2}$ .^[21]

• G is a word-hyperbolic group.^[22]

• G has decidable conjugacy problem.^[19]

• G is coherent, that is every finitely generated subgroup of G is finitely presentable.^[23]

• The isomorphism problem is decidable for finitely generated one-relator groups with torsion, by virtue of their hyperbolicity.^[24]

• G is residually finite.^[25]

Magnus–Moldavansky method

Starting with the work of Magnus in the 1930s, most general results about one-relator groups are proved by induction on the length |r| of the defining relator r. The presentation below follows Section 6 of Chapter II of Lyndon and Schupp^[26] and Section 4.4 of Magnus, Karrass and Solitar^[27] for Magnus' original approach and Section 5 of Chapter IV of Lyndon and Schupp^[28] for the Moldavansky's HNN-extension version of that approach.^[29]

Let G be a one-relator group given by presentation (1) with a finite generating set X. Assume also that every generator from X actually occurs in r.

One can usually assume that ${\displaystyle \#X\geq 2}$  (since otherwise G is cyclic and whatever statement is being proved about G is usually obvious).

The main case to consider when some generator, say t, from X occurs in r with exponent sum 0 on t. Say ${\displaystyle X=\{t,a,b,\dots ,z\}}$  in this case. For every generator ${\displaystyle x\in X\setminus \{t\}}$  one denotes ${\displaystyle x_{i}=t^{-i}xt^{i}}$  where ${\displaystyle i\in \mathbb {Z} }$ . Then r can be rewritten as a word ${\displaystyle r_{0}}$  in these new generators ${\displaystyle X_{\infty }=\{(a_{i})_{i},(b_{i})_{i},\dots ,(z_{i})_{i}\}}$  with ${\displaystyle |r_{0}|<|r|}$ .

For example, if ${\displaystyle r=t^{-2}btat^{3}b^{-2}a^{2}t^{-1}at^{-1}}$  then ${\displaystyle r_{0}=b_{2}a_{1}b_{-2}^{-2}a_{-2}^{2}a_{-1}}$ .

Let ${\displaystyle X_{0}}$  be the alphabet consisting of the portion of ${\displaystyle X_{\infty }}$  given by all ${\displaystyle x_{i}}$  with ${\displaystyle m(x)\leq i\leq M(x)}$  where ${\displaystyle m(x),M(x)}$  are the minimum and the maximum subscripts with which ${\displaystyle x_{i}^{\pm 1}}$  occurs in ${\displaystyle r_{0}}$ .

Magnus observed that the subgroup ${\displaystyle L=\langle X_{0}\rangle \leq G}$  is itself a one-relator group with the one-relator presentation ${\displaystyle L=\langle X_{0}\mid r_{0}=1\rangle }$ . Note that since ${\displaystyle |r_{0}|<|r|}$ , one can usually apply the inductive hypothesis to ${\displaystyle L}$  when proving a particular statement about G.

Moreover, if ${\displaystyle X_{i}=t^{-i}X_{0}t^{i}}$  for ${\displaystyle i\in \mathbb {Z} }$  then ${\displaystyle L_{i}=\langle X_{i}\rangle =\langle X_{i}|r_{i}=1\rangle }$  is also a one-relator group, where ${\displaystyle r_{i}}$  is obtained from ${\displaystyle r_{0}}$  by shifting all subscripts by ${\displaystyle i}$ . Then the normal closure ${\displaystyle N=\langle \langle X_{0}\rangle \rangle _{G}}$  of ${\displaystyle X_{0}}$  in G is

${\displaystyle N=\left\langle \bigcup _{i\in \mathbb {Z} }L_{i}\right\rangle .}$ 

Magnus' original approach exploited the fact that N is actually an iterated amalgamated product of the groups ${\displaystyle L_{i}}$ , amalgamated along suitably chosen Magnus free subgroups. His proof of Freiheitssatz and of the solution of the word problem for one-relator groups was based on this approach.

Later Moldavansky simplified the framework and noted that in this case G itself is an HNN-extension of L with associated subgroups being Magnus free subgroups of L.

If for every generator from ${\displaystyle X_{0}}$  its minimum and maximum subscripts in ${\displaystyle r_{0}}$  are equal then ${\displaystyle G=L\ast \langle t\rangle }$  and the inductive step is usually easy to handle in this case.

Suppose then that some generator from ${\displaystyle X_{0}}$  occurs in ${\displaystyle r_{0}}$  with at least two distinct subscripts. We put ${\displaystyle Y_{-}}$  to be the set of all generators from ${\displaystyle X_{0}}$  with non-maximal subscripts and we put ${\displaystyle Y_{+}}$  to be the set of all generators from ${\displaystyle X_{0}}$  with non-maximal subscripts. (Hence every generator from ${\displaystyle Y_{-}}$  and from ${\displaystyle Y_{-}}$  occurs in ${\displaystyle r_{0}}$  with a non-unique subscript.) Then ${\displaystyle H_{-}=\langle Y_{-}\rangle }$  and ${\displaystyle H_{+}=\langle Y_{+}\rangle }$  are free Magnus subgroups of L and ${\displaystyle t^{-1}H_{-}t=H_{+}}$ . Moldavansky observed that in this situation

${\displaystyle G=\langle L,t\mid t^{-1}H_{-}t=H_{+}\rangle }$ 

is an HNN-extension of L. This fact often allows proving something about G using the inductive hypothesis about the one-relator group L via the use of normal form methods and structural algebraic properties for the HNN-extension G.

The general case, both in Magnus' original setting and in Moldavansky's simplification of it, requires treating the situation where no generator from X occurs with exponent sum 0 in r. Suppose that distinct letters ${\displaystyle x,y\in X}$  occur in r with nonzero exponents ${\displaystyle \alpha ,\beta }$  accordingly. Consider a homomorphism ${\displaystyle f:F(X)\to F(X)}$  given by ${\displaystyle f(x)=xy^{-\beta },f(y)=y^{\alpha }}$  and fixing the other generators from X. Then for ${\displaystyle r'=f(r)\in F(X)}$  the exponent sum on y is equal to 0. The map f induces a group homomorphism ${\displaystyle \phi :G\to G'=\langle X\mid r'=1\rangle }$  that turns out to be an embedding. The one-relator group G' can then be treated using Moldavansky's approach. When ${\displaystyle G'}$  splits as an HNN-extension of a one-relator group L, the defining relator ${\displaystyle r_{0}}$  of L still turns out to be shorter than r, allowing for inductive arguments to proceed. Magnus' original approach used a similar version of an embedding trick for dealing with this case.

Two-generator one-relator groups

It turns out that many two-generator one-relator groups split as semidirect products ${\displaystyle G=F_{m}\rtimes \mathbb {Z} }$ . This fact was observed by Ken Brown when analyzing the BNS-invariant of one-relator groups using the Magnus-Moldavansky method.

Namely, let G be a one-relator group given by presentation (2) with ${\displaystyle n=2}$  and let ${\displaystyle \phi :G\to \mathbb {Z} }$  be an epimorphism. One can then change a free basis of ${\displaystyle F(X)}$  to a basis ${\displaystyle t,a}$  such that ${\displaystyle \phi (t)=1,\phi (a)=0}$  and rewrite the presentation of G in this generators as

${\displaystyle G=\langle a,t\mid r=1\rangle }$ 

where ${\displaystyle 1\neq r=r(a,t)\in F(a,t)}$  is a freely and cyclically reduced word.

Since ${\displaystyle \phi (r)=0,\phi (t)=1}$ , the exponent sum on t in r is equal to 0. Again putting ${\displaystyle a_{i}=t^{-i}at^{i}}$ , we can rewrite r as a word ${\displaystyle r_{0}}$  in ${\displaystyle (a_{i})_{i\in \mathbb {Z} }.}$  Let ${\displaystyle m,M}$  be the minimum and the maximum subscripts of the generators occurring in ${\displaystyle r_{0}}$ . Brown showed^[30] that ${\displaystyle \ker(\phi )}$  is finitely generated if and only if ${\displaystyle m<M}$  and both ${\displaystyle a_{m}}$  and ${\displaystyle a_{M}}$  occur exactly once in ${\displaystyle r_{0}}$ , and moreover, in that case the group ${\displaystyle \ker(\phi )}$  is free. Therefore if ${\displaystyle \phi :G\to \mathbb {Z} }$  is an epimorphism with a finitely generated kernel, then G splits as ${\displaystyle G=F_{m}\rtimes \mathbb {Z} }$  where ${\displaystyle F_{m}=\ker(\phi )}$  is a finite rank free group.

Later Dunfield and Thurston proved^[31] that if a one-relator two-generator group ${\displaystyle G=\langle x_{1},x_{2}\mid r=1\rangle }$  is chosen "at random" (that is, a cyclically reduced word r of length n in ${\displaystyle F(x_{1},x_{2})}$  is chosen uniformly at random) then the probability ${\displaystyle p_{n}}$  that a homomorphism from G onto ${\displaystyle \mathbb {Z} }$  with a finitely generated kernel exists satisfies

${\displaystyle 0.0006<p_{n}<0.975}$ 

for all sufficiently large n. Moreover, their experimental data indicates that the limiting value for ${\displaystyle p_{n}}$  is close to ${\displaystyle 0.94}$ .

Examples of one-relator groups

• Free abelian group ${\displaystyle \mathbb {Z} \times \mathbb {Z} =\langle a,b\mid a^{-1}b^{-1}ab=1\rangle }$ 

• Baumslag–Solitar group ${\displaystyle B(m,n)=\langle a,b\mid b^{-1}a^{m}b=a^{n}\rangle }$  where ${\displaystyle m,n\neq 0}$ .

• Torus knot group ${\displaystyle G=\langle a,b\mid a^{p}=b^{q}\rangle }$  where ${\displaystyle p,q\geq 1}$  are coprime integers.

• Baumslag–Gersten group ${\displaystyle G=\langle a,t\mid a^{a^{t}}=a^{2}\rangle =\langle a,t\mid (t^{-1}a^{-1}t)a(t^{-1}at)=a^{2}\rangle }$ 

• Oriented surface group ${\displaystyle G=\langle a_{1},b_{1},\dots ,a_{n},b_{n}\mid [a_{1},b_{1}]\dots [a_{n},b_{n}]=1\rangle }$  where ${\displaystyle [a,b]=a^{-1}b^{-1}ab}$  and where ${\displaystyle n\geq 1}$ .

• Non-oriented surface group ${\displaystyle G=\langle a_{1},\dots ,a_{n}\mid a_{1}^{2}\cdots a_{n}^{2}=1\rangle }$ , where ${\displaystyle n\geq 1}$ .

Generalizations and open problems

• If A and B are two groups, and ${\displaystyle r\in A\ast B}$  is an element in their free product, one can consider a one-relator product ${\displaystyle G=A\ast B/\langle \langle r\rangle \rangle =\langle A,B\mid r=1\rangle }$ .

• The so-called Kervaire conjecture, also known as Kervaire–Laudenbach conjecture, asks if it is true that if A is a nontrivial group and ${\displaystyle B=\langle t\rangle }$  is infinite cyclic then for every ${\displaystyle r\in A\ast B}$  the one-relator product ${\displaystyle G=\langle A,t\mid r=1\rangle }$  is nontrivial.^[32]

• Klyachko proved the Kervaire conjecture for the case where A is torsion-free.^[33]

• A conjecture attributed to Gersten^[22] says that a finitely generated one-relator group is word-hyperbolic if and only if it contains no Baumslag–Solitar subgroups.

• If G is a finitely generated one-relator group (with or without torsion), ${\displaystyle H\leq G}$  is a torsion-free subgroup of finite index and ${\displaystyle \phi :H\to \mathbb {Z} }$  is an epimorphism then ${\displaystyle \ker(\phi )}$  has cohomological dimension 1 and therefore, by a result of Stallings, is locally free.^[34] Baumslag, with co-authors, showed that in many cases, by a suitable choice of H and ${\displaystyle \phi }$  one can prove that that ${\displaystyle \ker(\phi )}$  is actually free (of infinite rank).^[35][36] These results led to a conjecture^[22] that every finitely generated one-relator group with torsion is virtually free-by-cyclic.

See also

• 3-manifolds
• Geometric topology
• Small cancellation theory

Sources

• Wilhelm Magnus, Abraham Karrass, Donald Solitar, Combinatorial group theory. Presentations of groups in terms of generators and relations, Reprint of the 1976 second edition, Dover Publications, Inc., Mineola, NY, 2004. ISBN 0-486-43830-9. MR2109550

• Lyndon, Roger C.; Schupp, Paul E. (2001). Combinatorial group theory. Classics in Mathematics. Springer-Verlag, Berlin. ISBN 3-540-41158-5. MR 1812024.

References

1. Magnus, Wilhelm (1930). "Über diskontinuierliche Gruppen mit einer definierenden Relation. (Der Freiheitssatz)". Journal für die reine und angewandte Mathematik. 1930 (163): 141–165. doi:10.1515/crll.1930.163.141. MR 1581238. S2CID 117245586.
2. Lyndon, Roger C. (1972). "On the Freiheitssatz". Journal of the London Mathematical Society. Second Series. 5: 95–101. doi:10.1112/jlms/s2-5.1.95. hdl:2027.42/135658. MR 0294465.
3. Weinbaum, C. M. (1972). "On relators and diagrams for groups with one defining relation". Illinois Journal of Mathematics. 16 (2): 308–322. doi:10.1215/ijm/1256052287. MR 0297849.
4. Fischer, J.; Karrass, A.; Solitar, D. (1972). "On one-relator groups having elements of finite order". Proceedings of the American Mathematical Society. 33 (2): 297–301. doi:10.2307/2038048. JSTOR 2038048. MR 0311780.
5. Lyndon & Schupp, Ch. III, Section 11, Proposition 11.1, p. 161
6. Dyer, Eldon; Vasquez, A. T. (1973). "Some small aspherical spaces". Journal of the Australian Mathematical Society. 16 (3): 332–352. doi:10.1017/S1446788700015147. MR 0341476.
7. Magnus, Karrass and Solitar, Theorem N3, p. 167
8. Shenitzer, Abe (1955). "Decomposition of a group with a single defining relation into a free product". Proceedings of the American Mathematical Society. 6 (2): 273–279. doi:10.2307/2032354. JSTOR 2032354. MR 0069174.
9. Howie, James (1980). "On locally indicable groups". Mathematische Zeitschrift. 182 (4): 445–461. doi:10.1007/BF01214717. MR 0667000. S2CID 121292137.
10. Magnus, Karrass and Solitar, Theorem 4.14, p. 274
11. Lyndon & Schupp, Ch. II, Section 5, Proposition 5.11
12. Murasugi, Kunio (1964). "The center of a group with a single defining relation". Mathematische Annalen. 155 (3): 246–251. doi:10.1007/BF01344162. MR 0163945. S2CID 119454184.
13. Magnus, Wilhelm (1931). "Untersuchungen über einige unendliche diskontinuierliche Gruppen". Mathematische Annalen. 105 (1): 52–74. doi:10.1007/BF01455808. MR 1512704. S2CID 120949491.
14. Lyndon & Schupp, p. 112
15. Gilbert Baumslag; Donald Solitar (1962). "Some two-generator one-relator non-Hopfian groups". Bulletin of the American Mathematical Society. 68 (3): 199–201. doi:10.1090/S0002-9904-1962-10745-9. MR 0142635.
16. Chebotarʹ, A.A. (1971). "Subgroups of groups with one defining relation that do not contain free subgroups of rank 2" (PDF). Algebra i Logika. 10 (5): 570–586. MR 0313404.
17. Cohen, Daniel E.; Lyndon, Roger C. (1963). "Free bases for normal subgroups of free groups". Transactions of the American Mathematical Society. 108 (3): 526–537. doi:10.1090/S0002-9947-1963-0170930-9. MR 0170930.
18. Karrass, A.; Magnus, W.; Solitar, D. (1960). "Elements of finite order in groups with a single defining relation". Communications on Pure and Applied Mathematics. 13: 57–66. doi:10.1002/cpa.3160130107. MR 0124384.
19. Newman, B. B. (1968). "Some results on one-relator groups". Bulletin of the American Mathematical Society. 74 (3): 568–571. doi:10.1090/S0002-9904-1968-12012-9. MR 0222152.
20. Lyndon & Schupp, Ch. IV, Theorem 5.5, p. 205
21. Howie, James (1984). "Cohomology of one-relator products of locally indicable groups". Journal of the London Mathematical Society. 30 (3): 419–430. doi:10.1112/jlms/s2-30.3.419. MR 0810951.
22. Baumslag, Gilbert; Fine, Benjamin; Rosenberger, Gerhard (2019). "One-relator groups: an overview". Groups St Andrews 2017 in Birmingham. London Math. Soc. Lecture Note Ser. Vol. 455. Cambridge University Press. pp. 119–157. ISBN 978-1-108-72874-4. MR 3931411.
23. Louder, Larsen; Wilton, Henry (2020). "One-relator groups with torsion are coherent". Mathematical Research Letters. 27 (5): 1499–1512. arXiv:1805.11976. doi:10.4310/MRL.2020.v27.n5.a9. MR 4216595. S2CID 119141737.
24. Dahmani, Francois; Guirardel, Vincent (2011). "The isomorphism problem for all hyperbolic groups". Geometric and Functional Analysis. 21 (2): 223–300. arXiv:1002.2590. doi:10.1007/s00039-011-0120-0. MR 2795509.
25. Wise, Daniel T. (2009). "Research announcement: the structure of groups with a quasiconvex hierarchy". Electronic Research Announcements in Mathematical Sciences. 16: 44–55. doi:10.3934/era.2009.16.44. MR 2558631.
26. Lyndon& Schupp, Chapter II, Section 6, pp. 111-113
27. Magnus, Karrass, and Solitar, Section 4.4
28. Lyndon& Schupp, Chapter IV, Section 5, pp. 198-205
29. Moldavanskii, D.I. (1967). "Certain subgroups of groups with one defining relation". Siberian Mathematical Journal. 8: 1370–1384. doi:10.1007/BF02196411. MR 0220810. S2CID 119585707.
30. Brown, Kenneth S. (1987). "Trees, valuations, and the Bieri-Neumann-Strebel invariant". Inventiones Mathematicae. 90 (3): 479–504. Bibcode:1987InMat..90..479B. doi:10.1007/BF01389176. MR 0914847. S2CID 122703100., Theorem 4.3
31. Dunfield, Nathan; Thurston, Dylan (2006). "A random tunnel number one 3–manifold does not fiber over the circle". Geometry & Topology. 10 (4): 2431–2499. arXiv:math/0510129. doi:10.2140/gt.2006.10.2431. MR 2284062., Theorem 6.1
32. Gersten, S. M. (1987). "Nonsingular equations of small weight over groups". Combinatorial group theory and topology (Alta, Utah, 1984). Annals of Mathematics Studies. Vol. 111. Princeton University Press. pp. 121–144. doi:10.1515/9781400882083-007. ISBN 0-691-08409-2. MR 0895612.
33. Klyachko, A. A. (1993). "A funny property of sphere and equations over groups". Communications in Algebra. 21 (7): 2555–2575. doi:10.1080/00927879308824692. MR 1218513.
34. John R. Stallings (1968). "Groups of dimension 1 are locally free". Bulletin of the American Mathematical Society. 74 (2): 361–364. doi:10.1090/S0002-9904-1968-11955-X. MR 0223439.
35. Baumslag, Gilbert; Fine, Benjamin; Miller, Charles F. III; Troeger, Douglas (2009). "Virtual properties of cyclically pinched one-relator groups". International Journal of Algebra and Computation. 19 (2): 213–227. doi:10.1142/S0218196709005032. MR 2512551.
36. Baumslag, Gilbert; Troeger, Douglas (2008). "Virtually free-by-cyclic one-relator groups. I.". Aspects of infinite groups. Algebra and Discrete Mathematics. Vol. 1. World Scientific Publishing. ISBN 978-981-279-340-9. MR 2571508.

External links

• Andrew Putman's notes on one-relator groups, University of Notre Dame