Van Kampen diagram explained

In the mathematical area of geometric group theory, a Van Kampen diagram (sometimes also called a Lyndon–Van Kampen diagram[1] [2] [3]) is a planar diagram used to represent the fact that a particular word in the generators of a group given by a group presentation represents the identity element in that group.

History

The notion of a Van Kampen diagram was introduced by Egbert van Kampen in 1933.[4] This paper appeared in the same issue of American Journal of Mathematics as another paper of Van Kampen, where he proved what is now known as the Seifert–Van Kampen theorem.[5] The main result of the paper on Van Kampen diagrams, now known as the van Kampen lemma can be deduced from the Seifert–Van Kampen theorem by applying the latter to the presentation complex of a group.[6] However, Van Kampen did not notice it at the time and this fact was only made explicit much later (see, e.g.[7]). Van Kampen diagrams remained an underutilized tool in group theory for about thirty years, until the advent of the small cancellation theory in the 1960s, where Van Kampen diagrams play a central role.[8] Currently Van Kampen diagrams are a standard tool in geometric group theory. They are used, in particular, for the study of isoperimetric functions in groups, and their various generalizations such as isodiametric functions, filling length functions, and so on.

Formal definition

The definitions and notations below largely follow Lyndon and Schupp.[9]

Let

G=\langleA|R\rangle

   (†)be a group presentation where all rR are cyclically reduced words in the free group F(A). The alphabet A and the set of defining relations R are often assumed to be finite, which corresponds to a finite group presentation, but this assumption is not necessary for the general definition of a Van Kampen diagram. Let R be the symmetrized closure of R, that is, let R be obtained from R by adding all cyclic permutations of elements of R and of their inverses.

lD

, given with a specific embedding

lD\subseteqR2

with the following additional data and satisfying the following additional properties:
  1. The complex

lD

is connected and simply connected.
  1. Each edge (one-cell) of

lD

is labelled by an arrow and a letter aA.
  1. Some vertex (zero-cell) which belongs to the topological boundary of

lD\subseteqR2

is specified as a base-vertex.
  1. For each region (two-cell) of

lD

, for every vertex on the boundary cycle of that region, and for each of the two choices of direction (clockwise or counter-clockwise), the label of the boundary cycle of the region read from that vertex and in that direction is a freely reduced word in F(A) that belongs to R.

Thus the 1-skeleton of

lD

is a finite connected planar graph Γ embedded in

R2

and the two-cells of

lD

are precisely the bounded complementary regions for this graph.

By the choice of R Condition 4 is equivalent to requiring that for each region of

lD

there is some boundary vertex of that region and some choice of direction (clockwise or counter-clockwise) such that the boundary label of the region read from that vertex and in that direction is freely reduced and belongs to R.

A Van Kampen diagram

lD

also has the boundary cycle, denoted

\partiallD

, which is an edge-path in the graph Γ corresponding to going around

lD

once in the clockwise direction along the boundary of the unbounded complementary region of Γ, starting and ending at the base-vertex of

lD

. The label of that boundary cycle is a word w in the alphabet A ∪ A-1 (which is not necessarily freely reduced) that is called the boundary label of

lD

.

Further terminology

lD

is called a disk diagram if

lD

is a topological disk, that is, when every edge of

lD

is a boundary edge of some region of

lD

and when

lD

has no cut-vertices.

lD

is called non-reduced if there exists a reduction pair in

lD

, that is a pair of distinct regions of

lD

such that their boundary cycles share a common edge and such that their boundary cycles, read starting from that edge, clockwise for one of the regions and counter-clockwise for the other, are equal as words in A ∪ A-1. If no such pair of region exists,

lD

is called reduced.

lD

is called the area of

lD

denoted

{\rmArea}(lD)

.

In general, a Van Kampen diagram has a "cactus-like" structure where one or more disk-components joined by (possibly degenerate) arcs, see the figure below:

Example

The following figure shows an example of a Van Kampen diagram for the free abelian group of rank two

G=\langlea,b|aba-1b-1\rangle.

The boundary label of this diagram is the word

w=b-1b3a-1b-2ab-1ba-1ab-1ba-1a.

The area of this diagram is equal to 8.

Van Kampen lemma

A key basic result in the theory is the so-called Van Kampen lemma[9] which states the following:

  1. Let

lD

be a Van Kampen diagram over the presentation (†) with boundary label w which is a word (not necessarily freely reduced) in the alphabet A ∪ A-1. Then w=1 in G.
  1. Let w be a freely reduced word in the alphabet A ∪ A-1 such that w=1 in G. Then there exists a reduced Van Kampen diagram

lD

over the presentation (†) whose boundary label is freely reduced and is equal to w.

Sketch of the proof

First observe that for an element w ∈ F(A) we have w = 1 in G if and only if w belongs to the normal closure of R in F(A) that is, if and only if w can be represented as

w=u1s1u

-1
1

unsnu

-1
n

inF(A),

   (♠)

where n ≥ 0 and where si ∈ R for i = 1, ..., n.

Part 1 of Van Kampen's lemma is proved by induction on the area of

lD

. The inductive step consists in "peeling" off one of the boundary regions of

lD

to get a Van Kampen diagram

lD'

with boundary cycle w and observing that in F(A) we have

w=usu-1w',

where sR is the boundary cycle of the region that was removed to get

lD'

from

lD

.

The proof of part two of Van Kampen's lemma is more involved. First, it is easy to see that if w is freely reduced and w = 1 in G there exists some Van Kampen diagram

lD0

with boundary label w0 such that w = w0 in F(A) (after possibly freely reducing w0). Namely consider a representation of w of the form (♠) above. Then make

lD0

to be a wedge of n "lollipops" with "stems" labeled by ui and with the "candys" (2-cells) labelled by si. Then the boundary label of

lD0

is a word w0 such that w = w0 in F(A). However, it is possible that the word w0 is not freely reduced. One then starts performing "folding" moves to get a sequence of Van Kampen diagrams

lD0,lD1,lD2,...

by making their boundary labels more and more freely reduced and making sure that at each step the boundary label of each diagram in the sequence is equal to w in F(A). The sequence terminates in a finite number of steps with a Van Kampen diagram

lDk

whose boundary label is freely reduced and thus equal to w as a word. The diagram

lDk

may not be reduced. If that happens, we can remove the reduction pairs from this diagram by a simple surgery operation without affecting the boundary label. Eventually this produces a reduced Van Kampen diagram

lD

whose boundary cycle is freely reduced and equal to w.

Strengthened version of Van Kampen's lemma

Moreover, the above proof shows that the conclusion of Van Kampen's lemma can be strengthened as follows.[9] Part 1 can be strengthened to say that if

lD

is a Van Kampen diagram of area n with boundary label w then there exists a representation (♠) for w as a product in F(A) of exactly n conjugates of elements of R. Part 2 can be strengthened to say that if w is freely reduced and admits a representation (♠) as a product in F(A) of n conjugates of elements of R then there exists a reduced Van Kampen diagram with boundary label w and of area at most n.

Dehn functions and isoperimetric functions

See main article: Dehn function.

Area of a word representing the identity

Let w ∈ F(A) be such that w = 1 in G. Then the area of w, denoted Area(w), is defined as the minimum of the areas of all Van Kampen diagrams with boundary labels w (Van Kampen's lemma says that at least one such diagram exists).

One can show that the area of w can be equivalently defined as the smallest n≥0 such that there exists a representation (♠) expressing w as a product in F(A) of n conjugates of the defining relators.

Isoperimetric functions and Dehn functions

A nonnegative monotone nondecreasing function f(n) is said to be an isoperimetric function for presentation (†) if for every freely reduced word w such that w = 1 in G we have

{\rmArea}(w)\lef(|w|),

where |w| is the length of the word w.

Suppose now that the alphabet A in (†) is finite.Then the Dehn function of (†) is defined as

{\rmDehn}(n)=max\{{\rmArea}(w):w=1inG,|w|\len,wfreelyreduced.\}

It is easy to see that Dehn(n) is an isoperimetric function for (†) and, moreover, if f(n) is any other isoperimetric function for (†) then Dehn(n) ≤ f(n) for every n ≥ 0.

Let w ∈ F(A) be a freely reduced word such that w = 1 in G. A Van Kampen diagram

lD

with boundary label w is called minimal if

{\rmArea}(lD)={\rmArea}(w).

Minimal Van Kampen diagrams are discrete analogues of minimal surfaces in Riemannian geometry.

Generalizations and other applications

See also

Basic references

External links

Notes and References

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  2. I.G. Lysenok, and A.G. Myasnikov, A polynomial bound for solutions of quadratic equations in free groups. Tr. Mat. Inst. Steklova 274 (2011), Algoritmicheskie Voprosy Algebry i Logiki, 148-190; translation in Proc. Steklov Inst. Math. 274 (2011), no. 1, 136–173
  3. B. Fine, A. Gaglione, A. Myasnikov, G. Rosenberger, and D. Spellman, The elementary theory of groups. A guide through the proofs of the Tarski conjectures. De Gruyter Expositions in Mathematics, 60. De Gruyter, Berlin, 2014.
  4. E. van Kampen. On some lemmas in the theory of groups. American Journal of Mathematics.vol. 55, (1933), pp. 268 - 273.
  5. E. R. van Kampen. On the connection between the fundamental groups of some related spaces. American Journal of Mathematics, vol. 55 (1933), pp. 261 - 267.
  6. Book: Invitations to Geometry and Topology. 2003. Oxford University Press. 9780198507727. Oxford Graduate Texts in Mathematics. Oxford, New York.
  7. Aleksandr Yur'evich Ol'shanskii. Geometry of defining relations in groups. Translated from the 1989 Russian original by Yu. A. Bakhturin. Mathematics and its Applications (Soviet Series), 70. Kluwer Academic Publishers Group, Dordrecht, 1991. .
  8. Bruce Chandler, and Wilhelm Magnus. The history of combinatorial group theory. A case study in the history of ideas. Studies in the History of Mathematics and Physical Sciences, 9. Springer-Verlag, New York, 1982. .
  9. [Roger Lyndon|Roger C. Lyndon]
  10. Ian M. Chiswell, Donald J. Collins, and Johannes Huebschmann. Aspherical group presentations. Mathematische Zeitschrift, vol. 178 (1981), no. 1, pp. 1 - 36.
  11. Martin Greendlinger. Dehn's algorithm for the word problem. Communications on Pure and Applied Mathematics, vol. 13 (1960), pp. 67 - 83.
  12. M. Gromov. Hyperbolic Groups. Essays in Group Theory (G. M. Gersten, ed.), MSRI Publ. 8, 1987, pp. 75 - 263; .
  13. Michel Coornaert, Thomas Delzant, Athanase Papadopoulos, Géométrie et théorie des groupes: les groupes hyperboliques de Gromov. Lecture Notes in Mathematics, vol. 1441, Springer-Verlag, Berlin, 1990. .
  14. B. H. Bowditch. A short proof that a subquadratic isoperimetric inequality implies a linear one. Michigan Mathematical Journal, vol. 42 (1995), no. 1, pp. 103 - 107.
  15. M. R. Bridson, Fractional isoperimetric inequalities and subgroup distortion. Journal of the American Mathematical Society, vol. 12 (1999), no. 4, pp. 1103 - 1118.
  16. M. Sapir, J.-C. Birget, E. Rips, Isoperimetric and isodiametric functions of groups. Annals of Mathematics (2), vol. 156 (2002), no. 2, pp. 345 - 466.
  17. J.-C. Birget, Aleksandr Yur'evich Ol'shanskii, E. Rips, M. Sapir, Isoperimetric functions of groups and computational complexity of the word problem. Annals of Mathematics (2), vol. 156 (2002), no. 2, pp. 467 - 518.
  18. Ol'sanskii . A. Yu. . 1979 . ru:Бесконечные группы с циклическими подгруппами . Infinite groups with cyclic subgroups . Russian . . 245 . 4 . 785 - 787.
  19. A. Yu. Ol'shanskii.On a geometric method in the combinatorial group theory. Proceedings of the International Congress of Mathematicians, Vol. 1, 2 (Warsaw, 1983), pp. 415 - 424, PWN, Warsaw, 1984.
  20. S. V. Ivanov. The free Burnside groups of sufficiently large exponents. International Journal of Algebra and Computation, vol. 4 (1994), no. 1-2.
  21. Denis V. Osin. Relatively hyperbolic groups: intrinsic geometry, algebraic properties, and algorithmic problems. Memoirs of the American Mathematical Society 179 (2006), no. 843.