Dehn function

In the mathematical subject of geometric group theory, a Dehn function, named after Max Dehn, is an optimal function associated to a finite group presentation which bounds the area of a relation in that group (that is a freely reduced word in the generators representing the identity element of the group) in terms of the length of that relation (see pp. 7980 in [1]). The growth type of the Dehn function is a quasi-isometry invariant of a finitely presented group. The Dehn function of a finitely presented group is also closely connected with non-deterministic algorithmic complexity of the word problem in groups. In particular, a finitely presented group has solvable word problem if and only if the Dehn function for a finite presentation of this group is recursive (see Theorem 2.1 in [1]). The notion of a Dehn function is motivated by isoperimetric problems in geometry, such as the classic isoperimetric inequality for the Euclidean plane and, more generally, the notion of a filling area function that estimates the area of a minimal surface in a Riemannian manifold in terms of the length of the boundary curve of that surface.

History

The idea of an isoperimetric function for a finitely presented group goes back to the work of Max Dehn in 1910s. Dehn proved that the word problem for the standard presentation of the fundamental group of a closed oriented surface of genus at least two is solvable by what is now called Dehn's algorithm. A direct consequence of this fact is that for this presentation the Dehn function satisfies Dehn(n) ≤ n. This result was extended in 1960s by Martin Greendlinger to finitely presented groups satisfying the C'(1/6) small cancellation condition.[2] The formal notion of an isoperimetric function and a Dehn function as it is used today appeared in late 1980s early 1990s together with the introduction and development of the theory of word-hyperbolic groups. In his 1987 monograph "Hyperbolic groups"[3] Gromov proved that a finitely presented group is word-hyperbolic if and only if it satisfies a linear isoperimetric inequality, that is, if and only if the Dehn function of this group is equivalent to the function f(n) = n. Gromov's proof was in large part informed by analogy with filling area functions for compact Riemannian manifolds where the area of a minimal surface bounding a null-homotopic closed curve is bounded in terms of the length of that curve.

The study of isoperimetric and Dehn functions quickly developed into a separate major theme in geometric group theory, especially since the growth types of these functions are natural quasi-isometry invariants of finitely presented groups. One of the major results in the subject was obtained by Sapir, Birget and Rips who showed[4] that most "reasonable" time complexity functions of Turing machines can be realized, up to natural equivalence, as Dehn functions of finitely presented groups.

Formal definition

Let

 G=\langle X|R\rangle\qquad (*)

be a finite group presentation where the X is a finite alphabet and where R  F(X) is a finite set of cyclically reduced words.

Area of a relation

Let w  F(X) be a relation in G, that is, a freely reduced word such that w = 1 in G. Note that this is equivalent to saying that is, w belongs to the normal closure of R in F(X), that is, there exists a representation of w as

w=u_1r_1u_1^{-1}\cdots u_m r_mu_{m}^{-1} \text{ in } F(X),   (♠)

where m  0 and where ri  R± 1 for i = 1, ..., m.

For w  F(X) satisfying w = 1 in G, the area of w with respect to (∗), denoted Area(w), is the smallest m  0 such that there exists a representation (♠) for w as the product in F(X) of m conjugates of elements of R± 1.

A freely reduced word w  F(X) satisfies w = 1 in G if and only if the loop labeled by w in the presentation complex for G corresponding to (∗) is null-homotopic. This fact can be used to show that Area(w) is the smallest number of 2-cells in a van Kampen diagram over (∗) with boundary cycle labelled by w.

Isoperimetric function

An isoperimetric function for a finite presentation (∗) is a monotone non-decreasing function

f: \mathbb N\to [0,\infty)

such that whenever w  F(X) is a freely reduced word satisfying w = 1 in G, then

Area(w)  f(|w|),

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

Dehn function

Then the Dehn function of a finite presentation (∗) is defined as

{\rm Dehn}(n)=\max\{{\rm Area}(w): w=1 \text{ in } G, |w|\le n, w \text{ freely reduced}.\}

Equivalently, Dehn(n) is the smallest isoperimetric function for (∗), that is, Dehn(n) is an isoperimetric function for (∗) and for any other isoperimetric function f(n) we have

Dehn(n)  f(n)

for every n  0.

Growth types of functions

Because Dehn functions are usually difficult to compute precisely, one usually studies their asymptotic growth types as n tends to infinity.

For two monotone-nondecreasing functions

f,g: \mathbb N\to [0,\infty)

one says that f is dominated by g if there exists C ≥1 such that

 f(n)\le Cg(Cn+C)+Cn+C

for every integer n  0. Say that f  g if f is dominated by g and g is dominated by f. Then ≈ is an equivalence relation and Dehn functions and isoperimetric functions are usually studied up to this equivalence relation. Thus for any a,b > 1 we have an  bn. Similarly, if f(n) is a polynomial of degree d (where d  1 is a real number) with non-negative coefficients, then f(n)  nd. Also, 1  n.

If a finite group presentation admits an isoperimetric function f(n) that is equivalent to a linear (respectively, quadratic, cubic, polynomial, exponential, etc.) function in n, the presentation is said to satisfy a linear (respectively, quadratic, cubic, polynomial, exponential, etc.) isoperimetric inequality.

Basic properties

In particular, this implies that solvability of the word problem is a quasi-isometry invariant for finitely presented groups.

Examples

G=\langle a_1,a_2,b_1,b_n|[a_1,b_1][a_2,b_2]=1\rangle
satisfies Dehn(n)  n and Dehn(n)  n.
B(1,2)=\langle a,b| b^{-1}ab=a^2\rangle
has Dehn(n)  2n (see [7]).
H_3=\langle a,b, t| [a,t]=[b,t]=1, [a,b]=t^2 \rangle
satisfies a cubic but no quadratic isoperimetric inequality.[8]
H_{2k+1}=\langle a_1,b_1,\dots, a_k,b_k,t| [a_i,b_i]=t, [a_i,t]=[b_i,t]=1, i=1,\dots, k, [a_i,b_j]=1, i\ne j\rangle,
where k  2, satisfy quadratic isoperimetric inequalities.[9]
G=\langle a, t| (t^{-1}a^{-1} t) a (t^{-1} at)=a^2\rangle
has a Dehn function growing faster than any fixed iterated tower of exponentials. Specifically, for this group
Dehn(n)  exp(exp(exp(...(exp(1))...)))
where the number of exponentials is equal to the integral part of log2(n) (see [1][11]).

Known results

Generalizations

See also

Notes

  1. 1 2 3 4 S. M. Gersten, Isoperimetric and isodiametric functions of finite presentations. Geometric group theory, Vol. 1 (Sussex, 1991), pp. 7996, London Math. Soc. Lecture Note Ser., 181, Cambridge University Press, Cambridge, 1993.
  2. Martin Greendlinger, Dehn's algorithm for the word problem. Communications in Pure and Applied Mathematics, vol. 13 (1960), pp. 6783.
  3. 1 2 3 M. Gromov, Hyperbolic Groups in: "Essays in Group Theory" (G. M. Gersten, ed.), MSRI Publ. 8, 1987, pp. 75263. ISBN 0-387-96618-8.
  4. M. Sapir, J.-C. Birget, E. Rips. Isoperimetric and isodiametric functions of groups. Annals of Mathematics (2), vol 156 (2002), no. 2, pp. 345466.
  5. Juan M. Alonso, Inégalités isopérimétriques et quasi-isométries. Comptes Rendus de l'Académie des Sciences. Série I. Mathématique, vol. 311 (1990), no. 12, pp. 761764.
  6. 1 2 Martin R. Bridson. The geometry of the word problem. Invitations to geometry and topology, pp. 2991, Oxford Graduate Texts in Mathematics, 7, Oxford University Press, Oxford, 2002. ISBN 0-19-850772-0.
  7. S. M. Gersten, Dehn functions and l1-norms of finite presentations. Algorithms and classification in combinatorial group theory (Berkeley, CA, 1989), pp. 195224, Math. Sci. Res. Inst. Publ., 23, Springer, New York, 1992. ISBN 0-387-97685-X.
  8. 1 2 3 D. B. A. Epstein, J. W. Cannon, D. Holt, S. Levy, M. Paterson, W. Thurston. Word processing in groups. Jones and Bartlett Publishers, Boston, MA, 1992. ISBN 0-86720-244-0.
  9. D. Allcock, An isoperimetric inequality for the Heisenberg groups. Geometric and Functional Analysis, vol. 8 (1998), no. 2, pp. 219233.
  10. V. S. Guba, The Dehn function of Richard Thompson's group F is quadratic. Inventiones Mathematicae, vol. 163 (2006), no. 2, pp. 313342.
  11. A. N. Platonov, An isoparametric function of the Baumslag-Gersten group. (in Russian.) Vestnik Moskov. Univ. Ser. I Mat. Mekh. 2004, , no. 3, pp. 1217; translation in: Moscow University Mathematics Bulletin, vol. 59 (2004), no. 3, pp. 1217 (2005).
  12. A. Yu. Olʹshanskii. Hyperbolicity of groups with subquadratic isoperimetric inequality. International Journal of Algebra and Computation, vol. 1 (1991), no. 3, pp. 281289.
  13. B. H. Bowditch. A short proof that a subquadratic isoperimetric inequality implies a linear one. Michigan Mathematical Journal, vol. 42 (1995), no. 1, pp. 103107.
  14. S. M. Gersten, D. F. Holt, T. R. Riley, Isoperimetric inequalities for nilpotent groups. Geometric and Functional Analysis, vol. 13 (2003), no. 4, pp. 795814.
  15. N. Brady and M. R. Bridson, There is only one gap in the isoperimetric spectrum. Geometric and Functional Analysis, vol. 10 (2000), no. 5, pp. 10531070.
  16. M. Gromov, Asymptotic invariants of infinite groups, in: "Geometric Group Theory", Vol. 2 (Sussex, 1991), London Mathematical Society Lecture Note Series, 182, Cambridge University Press, Cambridge, 1993, pp. 1295.
  17. P. Papasoglu. On the asymptotic cone of groups satisfying a quadratic isoperimetric inequality. Journal of Differential Geometry, vol. 44 (1996), no. 4, pp. 789806.
  18. J. Burillo and J. Taback. Equivalence of geometric and combinatorial Dehn functions. New York Journal of Mathematics, vol. 8 (2002), pp. 169179.
  19. M. R. Bridson and A. Haefliger, Metric spaces of non-positive curvature. Grundlehren der Mathematischen Wissenschaften [Fundamental Principles of Mathematical Sciences], vol. 319. Springer-Verlag, Berlin, 1999. ISBN 3-540-64324-9; Remark 1.7, p. 444.
  20. E. Leuzinger. On polyhedral retracts and compactifications of locally symmetric spaces. Differential Geometry and its Applications, vol. 20 (2004), pp. 293318.
  21. R. Young. The Dehn function of SL(n;Z).
  22. Lee Mosher, Mapping class groups are automatic. Annals of Mathematics (2), vol. 142 (1995), no. 2, pp. 303384.
  23. Allen Hatcher and Karen Vogtmann, Isoperimetric inequalities for automorphism groups of free groups. Pacific Journal of Mathematics, vol. 173 (1996), no. 2, 425441.
  24. Martin R. Bridson and Karen Vogtmann, On the geometry of the automorphism group of a free group. Bulletin of the London Mathematical Society, vol. 27 (1995), no. 6, pp. 544552.
  25. Martin R. Bridson and Daniel Groves. The quadratic isoperimetric inequality for mapping tori of free-group automorphisms. Memoirs of the American Mathematical Society, to appear.
  26. J.-C. Birget, A. Yu. 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. 467518.
  27. S. M. Gersten, The double exponential theorem for isodiametric and isoperimetric functions. International Journal of Algebra and Computation, vol. 1 (1991), no. 3, pp. 321327.
  28. S. M. Gersten and T. Riley, Filling length in finitely presentable groups. Dedicated to John Stallings on the occasion of his 65th birthday. Geometriae Dedicata, vol. 92 (2002), pp. 4158.
  29. J. M. Alonso, X. Wang and S. J. Pride, Higher-dimensional isoperimetric (or Dehn) functions of groups. Journal of Group Theory, vol. 2 (1999), no. 1, pp. 81112.
  30. M. Gromov, Asymptotic invariants of infinite groups, in: "Geometric Group Theory", Vol. 2 (Sussex, 1991), London Mathematical Society Lecture Note Series, 182, Cambridge University Press, Cambridge, 1993, pp. 1295.
  31. O. Bogopolskii and E. Ventura. The mean Dehn functions of abelian groups. Journal of Group Theory, vol. 11 (2008), no. 4, pp. 569586.
  32. Robert Young. Averaged Dehn functions for nilpotent groups. Topology, vol. 47 (2008), no. 5, pp. 351367.
  33. E. G. Kukina and V. A. Roman'kov. Subquadratic Growth of the Averaged Dehn Function for Free Abelian Groups. Siberian Mathematical Journal, vol. 44 (2003), no. 4, 15739260.
  34. Densi Osin. Relatively Hyperbolic Groups: Intrinsic Geometry, Algebraic Properties, and Algorithmic Problems. Memoirs of the American Mathematical Society, vol. 179 (2006), no. 843. American Mathematical Society. ISBN 978-0-8218-3821-1.
  35. R. I. Grigorchuk and S. V. Ivanov, On Dehn Functions of Infinite Presentations of Groups, Geometric and Functional Analysis, vol. 18 (2009), no. 6, pp. 18411874

Further reading

External links

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