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:''For the direct limit of a sequence of ultrapowers, see [[Ultraproduct]].'' | |||
In [[mathematics]], an '''ultralimit''' is a geometric construction that assigns to a sequence of [[metric space]]s ''X<sub>n</sub>'' a limiting metric space. The notion of an ultralimit captures the limiting behavior of finite configurations in the spaces ''X<sub>n</sub>'' and uses an [[ultrafilter]] to avoid the process of repeatedly passing to subsequences to ensure convergence. An ultralimit is a generalization of the notion of [[Gromov-Hausdorff convergence]] of metric spaces. | |||
==Ultrafilters== | |||
== | Recall that an [[ultrafilter]] ''ω'' on the set of natural numbers <math>\mathbb N </math> is a finite-additive set function (which can be thought of as a measure) <math>\omega:2^{\mathbb N}\to \{0,1\}</math> from the [[power set]] <math>2^{\mathbb N}</math> (that is, the set of ''all'' subsets of <math>\mathbb N </math>) to the set {0,1} such that <math>\omega(\mathbb N)=1</math>. | ||
An ultrafilter ''ω'' on <math>\mathbb N </math> is ''non-principal'' if for every finite subset <math>F\subseteq \mathbb N</math> we have ''ω''(''F'')=0. | |||
==Limit of a sequence of points with respect to an ultrafilter== | |||
== | Let ''ω'' be a non-principal ultrafilter on <math>\mathbb N </math>. | ||
If <math>(x_n)_{n\in \mathbb N}</math> is a sequence of points in a [[metric space]] (''X'',''d'') and ''x''∈ ''X'', the point ''x'' is called the ''ω'' -''limit'' of ''x''<sub>''n''</sub>, denoted <math>x=\lim_\omega x_n</math>, if for every <math>\epsilon>0</math> we have: | |||
:<math>\omega\{n: d(x_n,x)\le \epsilon \}=1.</math> | |||
It is not hard to see the following: | |||
* If an ''ω'' -limit of a sequence of points exists, it is unique. | |||
* If <math>x=\lim_{n\to\infty} x_n </math> in the standard sense, <math>x=\lim_\omega x_n </math>. (For this property to hold it is crucial that the ultrafilter be non-principal.) | |||
= | An important basic fact<ref name="KL"/> states that, if (''X'',''d'') is compact and ''ω'' is a non-principal ultrafilter on <math>\mathbb N </math>, the ''ω''-limit of any sequence of points in ''X'' exists (and necessarily unique). | ||
In particular, any bounded sequence of real numbers has a well-defined ''ω''-limit in <math>\mathbb R</math> (as closed intervals are compact). | |||
== | ==Ultralimit of metric spaces with specified base-points== | ||
Let ''ω'' be a non-principal ultrafilter on <math>\mathbb N </math>. Let (''X''<sub>''n''</sub>,''d''<sub>''n''</sub>) be a sequence of [[metric space]]s with specified base-points ''p''<sub>''n''</sub>∈''X''<sub>''n''</sub>. | |||
Let us say that a sequence <math>(x_n)_{n\in\mathbb N}</math>, where ''x''<sub>''n''</sub>∈''X''<sub>''n''</sub>, is ''admissible'', if the sequence of real numbers (''d''<sub>''n''</sub>(''x<sub>n</sub>'',''p<sub>n</sub>''))<sub>''n''</sub> is bounded, that is, if there exists a positive real number ''C'' such that <math> d_n(x_n,p_n)\le C</math>. | |||
Let us denote the set of all admissible sequences by <math>\mathcal A</math>. | |||
== | It is easy to see from the triangle inequality that for any two admissible sequences <math>\mathbf x=(x_n)_{n\in\mathbb N}</math> and <math>\mathbf y=(y_n)_{n\in\mathbb N}</math> the sequence (''d''<sub>''n''</sub>(''x<sub>n</sub>'',''y<sub>n</sub>''))<sub>''n''</sub> is bounded and hence there exists an ''ω''-limit <math>\hat d_\infty(\mathbf x, \mathbf y):=\lim_\omega d_n(x_n,y_n)</math>. Let us define a relation <math>\sim</math> on the set <math>\mathcal A</math> of all admissible sequences as follows. For <math>\mathbf x, \mathbf y\in \mathcal A </math> we have <math>\mathbf x\sim\mathbf y</math> whenever <math>\hat d_\infty(\mathbf x, \mathbf y)=0.</math> It is easy to show that <math>\sim</math> is an [[equivalence relation]] on <math>\mathcal A.</math> | ||
The '''ultralimit''' with respect to ''ω'' of the sequence (''X''<sub>''n''</sub>,''d''<sub>''n''</sub>, ''p''<sub>''n''</sub>) is a metric space <math>(X_\infty, d_\infty)</math> defined as follows.<ref>John Roe. ''Lectures on Coarse Geometry.'' [[American Mathematical Society]], 2003. ISBN 978-0-8218-3332-2; Definition 7.19, p. 107.</ref> | |||
As a set, we have <math>X_\infty=\mathcal A/{\sim}</math> . | |||
For two <math>\sim</math>-equivalence classes <math>[\mathbf x], [\mathbf y]</math> of admissible sequences <math>\mathbf x=(x_n)_{n\in\mathbb N}</math> and <math>\mathbf y=(y_n)_{n\in\mathbb N}</math> we have <math>d_\infty([\mathbf x], [\mathbf y]):=\hat d_\infty(\mathbf x,\mathbf y)=\lim_\omega d_n(x_n,y_n).</math> | |||
It is not hard to see that <math>d_\infty</math> is well-defined and that it is a [[metric space|metric]] on the set <math>X_\infty</math>. | |||
Denote <math>(X_\infty, d_\infty)=\lim_\omega(X_n,d_n, p_n)</math> . | |||
==On basepoints in the case of uniformly bounded spaces== | |||
Suppose that (''X<sub>n</sub>'',''d<sub>n</sub>'') is a sequence of [[metric space]]s of uniformly bounded diameter, that is, there exists a real number ''C''>0 such that diam(''X''<sub>''n''</sub>)≤''C'' for every <math>n\in \mathbb N</math>. Then for any choice ''p<sub>n</sub>'' of base-points in ''X<sub>n</sub>'' ''every'' sequence <math>(x_n)_n, x_n\in X_n</math> is admissible. Therefore in this situation the choice of base-points does not have to be specified when defining an ultralimit, and the ultralimit <math>(X_\infty, d_\infty)</math> depends only on (''X<sub>n</sub>'',''d<sub>n</sub>'') and on ''ω'' but does not depend on the choice of a base-point sequence <math>p_n\in X_n.</math>. In this case one writes <math>(X_\infty, d_\infty)=\lim_\omega(X_n,d_n)</math>. | |||
==Basic properties of ultralimits== | |||
#If (''X<sub>n</sub>'',''d<sub>n</sub>'') are [[geodesic metric space]]s then <math>(X_\infty, d_\infty)=\lim_\omega(X_n, d_n, p_n)</math> is also a geodesic metric space.<ref name="KL" /> | |||
#If (''X<sub>n</sub>'',''d<sub>n</sub>'') are [[complete metric space]]s then <math>(X_\infty, d_\infty)=\lim_\omega(X_n,d_n, p_n)</math> is also a complete metric space.<ref name="DW">L.Van den Dries, A.J.Wilkie, ''On Gromov's theorem concerning groups of polynomial growth and elementary logic''. [[Journal of Algebra]], Vol. 89(1984), pp. 349–374.</ref><ref>John Roe. ''Lectures on Coarse Geometry.'' [[American Mathematical Society]], 2003. ISBN 978-0-8218-3332-2; Proposition 7.20, p. 108.</ref> | |||
Actually, by construction, the limit space is always complete, even when (''X<sub>n</sub>'',''d<sub>n</sub>'') | |||
is a repeating sequence of a space (''X'',''d'') which is not complete.<ref>Bridson, Haefliger "Metric Spaces of Non-positive curvature" Lemma 5.53</ref> | |||
#If (''X<sub>n</sub>'',''d<sub>n</sub>'') are compact metric spaces that converge to a compact metric space (''X'',''d'') in the [[Gromov–Hausdorff convergence|Gromov–Hausdorff]] sense (this automatically implies that the spaces (''X<sub>n</sub>'',''d<sub>n</sub>'') have uniformly bounded diameter), then the ultralimit <math>(X_\infty, d_\infty)=\lim_\omega(X_n,d_n)</math> is isometric to (''X'',''d''). | |||
#Suppose that (''X<sub>n</sub>'',''d<sub>n</sub>'') are [[proper metric space]]s and that <math>p_n\in X_n</math> are base-points such that the pointed sequence (''X''<sub>''n''</sub>,''d<sub>n</sub>'',''p<sub>n</sub>'') converges to a proper metric space (''X'',''d'') in the [[Gromov–Hausdorff convergence|Gromov–Hausdorff]] sense. Then the ultralimit <math>(X_\infty, d_\infty)=\lim_\omega(X_n,d_n,p_n)</math> is isometric to (''X'',''d'').<ref name="KL"/> | |||
#Let ''κ''≤0 and let (''X<sub>n</sub>'',''d<sub>n</sub>'') be a sequence of [[CAT(k) space|CAT(''κ'')-metric spaces]]. Then the ultralimit <math>(X_\infty, d_\infty)=\lim_\omega(X_n,d_n, p_n)</math> is also a CAT(''κ'')-space.<ref name="KL">M. Kapovich B. Leeb. ''On asymptotic cones and quasi-isometry classes of fundamental groups of 3-manifolds'', [[Geometric and Functional Analysis (GAFA)|Geometric and Functional Analysis]], Vol. 5 (1995), no. 3, pp. 582–603</ref> | |||
#Let (''X<sub>n</sub>'',''d<sub>n</sub>'') be a sequence of [[CAT(k) space|CAT(''κ<sub>n</sub>'')-metric spaces]] where <math>\lim_{n\to\infty}\kappa_n=-\infty.</math> Then the ultralimit <math>(X_\infty, d_\infty)=\lim_\omega(X_n,d_n, p_n)</math> is [[real tree]].<ref name="KL"/> | |||
==Asymptotic cones== | |||
An important class of ultralimits are the so-called ''asymptotic cones'' of metric spaces. Let (''X'',''d'') be a metric space, let ''ω'' be a non-principal ultrafilter on <math>\mathbb N </math> and let ''p<sub>n</sub>'' ∈ ''X'' be a sequence of base-points. Then the ''ω''–ultralimit of the sequence <math>(X, \frac{d}{n}, p_n)</math> is called the asymptotic cone of ''X'' with respect to ''ω'' and <math>(p_n)_n\,</math> and is denoted <math>Cone_\omega(X,d, (p_n)_n)\,</math>. One often takes the base-point sequence to be constant, ''p<sub>n</sub>'' = ''p'' for some ''p ∈ X''; in this case the asymptotic cone does not depend on the choice of ''p ∈ X'' and is denoted by <math>Cone_\omega(X,d)\,</math> or just <math>Cone_\omega(X)\,</math>. | |||
The notion of an asymptotic cone plays an important role in [[geometric group theory]] since asymptotic cones (or, more precisely, their [[homeomorphism|topological types]] and [[Lipschitz continuity|bi-Lipschitz types]]) provide [[quasi-isometry]] invariants of metric spaces in general and of finitely generated groups in particular.<ref name="Roe">John Roe. ''Lectures on Coarse Geometry.'' [[American Mathematical Society]], 2003. ISBN 978-0-8218-3332-2</ref> Asymptotic cones also turn out to be a useful tool in the study of [[relatively hyperbolic group]]s and their generalizations.<ref>[[Cornelia Druţu]] and Mark Sapir (with an Appendix by Denis Osin and Mark Sapir), ''Tree-graded spaces and asymptotic cones of groups.'' [[Topology (journal)|Topology]], Volume 44 (2005), no. 5, pp. 959–1058.</ref> | |||
==Examples== | |||
#Let (''X'',''d'') be a compact metric space and put (''X''<sub>''n''</sub>,''d''<sub>''n''</sub>)=(''X'',''d'') for every <math> n\in \mathbb N</math>. Then the ultralimit <math>(X_\infty, d_\infty)=\lim_\omega(X_n,d_n)</math> is isometric to (''X'',''d''). | |||
#Let (''X'',''d<sub>X</sub>'') and (''Y'',''d<sub>Y</sub>'') be two distinct compact metric spaces and let (''X<sub>n</sub>'',''d<sub>n</sub>'') be a sequence of metric spaces such that for each ''n'' either (''X<sub>n</sub>'',''d<sub>n</sub>'')=(''X'',''d<sub>X</sub>'') or (''X<sub>n</sub>'',''d<sub>n</sub>'')=(''Y'',''d<sub>Y</sub>''). Let <math>A_1=\{n | (X_n,d_n)=(X,d_X)\}\,</math> and <math>A_2=\{n | (X_n,d_n)=(Y,d_Y)\}\,</math>. Thus ''A''<sub>1</sub>, ''A''<sub>2</sub> are disjoint and <math>A_1\cup A_2=\mathbb N.</math> Therefore one of ''A''<sub>1</sub>, ''A''<sub>2</sub> has ''ω''-measure 1 and the other has ''ω''-measure 0. Hence <math>\lim_\omega(X_n,d_n)</math> is isometric to (''X'',''d<sub>X</sub>'') if ''ω''(''A''<sub>1</sub>)=1 and <math>\lim_\omega(X_n,d_n)</math> is isometric to (''Y'',''d<sub>Y</sub>'') if ''ω''(''A''<sub>2</sub>)=1. This shows that the ultralimit can depend on the choice of an ultrafilter ''ω''. | |||
#Let (''M'',''g'') be a compact connected [[Riemannian manifold]] of dimension ''m'', where ''g'' is a [[Riemannian metric]] on ''M''. Let ''d'' be the metric on ''M'' corresponding to ''g'', so that (''M'',''d'') is a [[geodesic metric space]]. Choose a basepoint ''p''∈''M''. Then the ultralimit (and even the ordinary [[Gromov-Hausdorff limit]]) <math>\lim_\omega(M,n d, p)</math> is isometric to the [[tangent space]] ''T<sub>p</sub>M'' of ''M'' at ''p'' with the distance function on ''T<sub>p</sub>M'' given by the [[inner product]] ''g(p)''. Therefore the ultralimit <math>\lim_\omega(M,n d, p)</math> is isometric to the [[Euclidean space]] <math>\mathbb R^m</math> with the standard [[Euclidean metric]].<ref>Yu. Burago, M. Gromov, and G. Perel'man. ''A. D. Aleksandrov spaces with curvatures bounded below'' (in Russian), Uspekhi Matematicheskih Nauk vol. 47 (1992), pp. 3–51; translated in: Russian Math. Surveys vol. 47, no. 2 (1992), pp. 1–58</ref> | |||
#Let <math>(\mathbb R^m, d)</math> be the standard ''m''-dimensional [[Euclidean space]] with the standard Euclidean metric. Then the asymptotic cone <math>Cone_\omega(\mathbb R^m, d)</math> is isometric to <math>(\mathbb R^m, d)</math>. | |||
#Let <math>(\mathbb Z^2,d)</math> be the 2-dimensional [[integer lattice]] where the distance between two lattice points is given by the length of the shortest edge-path between them in the grid. Then the asymptotic cone <math>Cone_\omega(\mathbb Z^2, d)</math> is isometric to <math>(\mathbb R^2, d_1)</math> where <math>d_1\,</math> is the [[Taxicab metric]] (or '''L'''<sup>1</sup>-metric) on <math>\mathbb R^2</math>. | |||
#Let (''X'',''d'') be a [[δ-hyperbolic space|''δ''-hyperbolic]] geodesic metric space for some ''δ''≥0. Then the asymptotic cone <math>Cone_\omega(X)\,</math> is a [[real tree]].<ref name="KL"/><ref>John Roe. ''Lectures on Coarse Geometry.'' [[American Mathematical Society]], 2003. ISBN 978-0-8218-3332-2; Example 7.30, p. 118.</ref> | |||
#Let (''X'',''d'') be a metric space of finite diameter. Then the asymptotic cone <math>Cone_\omega(X)\,</math> is a single point. | |||
#Let (''X'',''d'') be a [[CAT(k) space|CAT(0)-metric space]]. Then the asymptotic cone <math>Cone_\omega(X)\,</math> is also a CAT(0)-space.<ref name="KL"/> | |||
==Footnotes== | |||
{{reflist}} | |||
==Basic References== | |||
*John Roe. ''Lectures on Coarse Geometry.'' [[American Mathematical Society]], 2003. ISBN 978-0-8218-3332-2; Ch. 7. | |||
*L.Van den Dries, A.J.Wilkie, ''On Gromov's theorem concerning groups of polynomial growth and elementary logic''. [[Journal of Algebra]], Vol. 89(1984), pp. 349–374. | |||
*M. Kapovich B. Leeb. ''On asymptotic cones and quasi-isometry classes of fundamental groups of 3-manifolds'', [[Geometric and Functional Analysis (GAFA)|Geometric and Functional Analysis]], Vol. 5 (1995), no. 3, pp. 582–603 | |||
*M. Kapovich. ''Hyperbolic Manifolds and Discrete Groups.'' Birkhäuser, 2000. ISBN 978-0-8176-3904-4; Ch. 9. | |||
*Cornelia Druţu and Mark Sapir (with an Appendix by Denis Osin and Mark Sapir), ''Tree-graded spaces and asymptotic cones of groups.'' [[Topology (journal)|Topology]], Volume 44 (2005), no. 5, pp. 959–1058. | |||
*M. Gromov. ''Metric Structures for Riemannian and Non-Riemannian Spaces.'' Progress in Mathematics vol. 152, Birkhäuser, 1999. ISBN 0-8176-3898-9; Ch. 3. | |||
*B. Kleiner and B. Leeb, ''Rigidity of quasi-isometries for symmetric spaces and Euclidean buildings.'' [[Publications Mathématiques de l'IHÉS|Publications Mathématiques de L'IHÉS]]. Volume 86, Number 1, December 1997, pp. 115–197. | |||
==See also== | |||
*[[Ultrafilter]] | |||
*[[Geometric group theory]] | |||
*[[Gromov-Hausdorff convergence]] | |||
[[Category:Geometric group theory]] | |||
[[Category:Metric geometry]] |
Latest revision as of 01:24, 9 July 2013
- For the direct limit of a sequence of ultrapowers, see Ultraproduct.
In mathematics, an ultralimit is a geometric construction that assigns to a sequence of metric spaces Xn a limiting metric space. The notion of an ultralimit captures the limiting behavior of finite configurations in the spaces Xn and uses an ultrafilter to avoid the process of repeatedly passing to subsequences to ensure convergence. An ultralimit is a generalization of the notion of Gromov-Hausdorff convergence of metric spaces.
Ultrafilters
Recall that an ultrafilter ω on the set of natural numbers is a finite-additive set function (which can be thought of as a measure) from the power set (that is, the set of all subsets of ) to the set {0,1} such that . An ultrafilter ω on is non-principal if for every finite subset we have ω(F)=0.
Limit of a sequence of points with respect to an ultrafilter
Let ω be a non-principal ultrafilter on . If is a sequence of points in a metric space (X,d) and x∈ X, the point x is called the ω -limit of xn, denoted , if for every we have:
It is not hard to see the following:
- If an ω -limit of a sequence of points exists, it is unique.
- If in the standard sense, . (For this property to hold it is crucial that the ultrafilter be non-principal.)
An important basic fact[1] states that, if (X,d) is compact and ω is a non-principal ultrafilter on , the ω-limit of any sequence of points in X exists (and necessarily unique).
In particular, any bounded sequence of real numbers has a well-defined ω-limit in (as closed intervals are compact).
Ultralimit of metric spaces with specified base-points
Let ω be a non-principal ultrafilter on . Let (Xn,dn) be a sequence of metric spaces with specified base-points pn∈Xn.
Let us say that a sequence , where xn∈Xn, is admissible, if the sequence of real numbers (dn(xn,pn))n is bounded, that is, if there exists a positive real number C such that . Let us denote the set of all admissible sequences by .
It is easy to see from the triangle inequality that for any two admissible sequences and the sequence (dn(xn,yn))n is bounded and hence there exists an ω-limit . Let us define a relation on the set of all admissible sequences as follows. For we have whenever It is easy to show that is an equivalence relation on
The ultralimit with respect to ω of the sequence (Xn,dn, pn) is a metric space defined as follows.[2]
For two -equivalence classes of admissible sequences and we have
It is not hard to see that is well-defined and that it is a metric on the set .
On basepoints in the case of uniformly bounded spaces
Suppose that (Xn,dn) is a sequence of metric spaces of uniformly bounded diameter, that is, there exists a real number C>0 such that diam(Xn)≤C for every . Then for any choice pn of base-points in Xn every sequence is admissible. Therefore in this situation the choice of base-points does not have to be specified when defining an ultralimit, and the ultralimit depends only on (Xn,dn) and on ω but does not depend on the choice of a base-point sequence . In this case one writes .
Basic properties of ultralimits
- If (Xn,dn) are geodesic metric spaces then is also a geodesic metric space.[1]
- If (Xn,dn) are complete metric spaces then is also a complete metric space.[3][4]
Actually, by construction, the limit space is always complete, even when (Xn,dn) is a repeating sequence of a space (X,d) which is not complete.[5]
- If (Xn,dn) are compact metric spaces that converge to a compact metric space (X,d) in the Gromov–Hausdorff sense (this automatically implies that the spaces (Xn,dn) have uniformly bounded diameter), then the ultralimit is isometric to (X,d).
- Suppose that (Xn,dn) are proper metric spaces and that are base-points such that the pointed sequence (Xn,dn,pn) converges to a proper metric space (X,d) in the Gromov–Hausdorff sense. Then the ultralimit is isometric to (X,d).[1]
- Let κ≤0 and let (Xn,dn) be a sequence of CAT(κ)-metric spaces. Then the ultralimit is also a CAT(κ)-space.[1]
- Let (Xn,dn) be a sequence of CAT(κn)-metric spaces where Then the ultralimit is real tree.[1]
Asymptotic cones
An important class of ultralimits are the so-called asymptotic cones of metric spaces. Let (X,d) be a metric space, let ω be a non-principal ultrafilter on and let pn ∈ X be a sequence of base-points. Then the ω–ultralimit of the sequence is called the asymptotic cone of X with respect to ω and and is denoted . One often takes the base-point sequence to be constant, pn = p for some p ∈ X; in this case the asymptotic cone does not depend on the choice of p ∈ X and is denoted by or just .
The notion of an asymptotic cone plays an important role in geometric group theory since asymptotic cones (or, more precisely, their topological types and bi-Lipschitz types) provide quasi-isometry invariants of metric spaces in general and of finitely generated groups in particular.[6] Asymptotic cones also turn out to be a useful tool in the study of relatively hyperbolic groups and their generalizations.[7]
Examples
- Let (X,d) be a compact metric space and put (Xn,dn)=(X,d) for every . Then the ultralimit is isometric to (X,d).
- Let (X,dX) and (Y,dY) be two distinct compact metric spaces and let (Xn,dn) be a sequence of metric spaces such that for each n either (Xn,dn)=(X,dX) or (Xn,dn)=(Y,dY). Let and . Thus A1, A2 are disjoint and Therefore one of A1, A2 has ω-measure 1 and the other has ω-measure 0. Hence is isometric to (X,dX) if ω(A1)=1 and is isometric to (Y,dY) if ω(A2)=1. This shows that the ultralimit can depend on the choice of an ultrafilter ω.
- Let (M,g) be a compact connected Riemannian manifold of dimension m, where g is a Riemannian metric on M. Let d be the metric on M corresponding to g, so that (M,d) is a geodesic metric space. Choose a basepoint p∈M. Then the ultralimit (and even the ordinary Gromov-Hausdorff limit) is isometric to the tangent space TpM of M at p with the distance function on TpM given by the inner product g(p). Therefore the ultralimit is isometric to the Euclidean space with the standard Euclidean metric.[8]
- Let be the standard m-dimensional Euclidean space with the standard Euclidean metric. Then the asymptotic cone is isometric to .
- Let be the 2-dimensional integer lattice where the distance between two lattice points is given by the length of the shortest edge-path between them in the grid. Then the asymptotic cone is isometric to where is the Taxicab metric (or L1-metric) on .
- Let (X,d) be a δ-hyperbolic geodesic metric space for some δ≥0. Then the asymptotic cone is a real tree.[1][9]
- Let (X,d) be a metric space of finite diameter. Then the asymptotic cone is a single point.
- Let (X,d) be a CAT(0)-metric space. Then the asymptotic cone is also a CAT(0)-space.[1]
Footnotes
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Basic References
- John Roe. Lectures on Coarse Geometry. American Mathematical Society, 2003. ISBN 978-0-8218-3332-2; Ch. 7.
- L.Van den Dries, A.J.Wilkie, On Gromov's theorem concerning groups of polynomial growth and elementary logic. Journal of Algebra, Vol. 89(1984), pp. 349–374.
- M. Kapovich B. Leeb. On asymptotic cones and quasi-isometry classes of fundamental groups of 3-manifolds, Geometric and Functional Analysis, Vol. 5 (1995), no. 3, pp. 582–603
- M. Kapovich. Hyperbolic Manifolds and Discrete Groups. Birkhäuser, 2000. ISBN 978-0-8176-3904-4; Ch. 9.
- Cornelia Druţu and Mark Sapir (with an Appendix by Denis Osin and Mark Sapir), Tree-graded spaces and asymptotic cones of groups. Topology, Volume 44 (2005), no. 5, pp. 959–1058.
- M. Gromov. Metric Structures for Riemannian and Non-Riemannian Spaces. Progress in Mathematics vol. 152, Birkhäuser, 1999. ISBN 0-8176-3898-9; Ch. 3.
- B. Kleiner and B. Leeb, Rigidity of quasi-isometries for symmetric spaces and Euclidean buildings. Publications Mathématiques de L'IHÉS. Volume 86, Number 1, December 1997, pp. 115–197.
See also
- ↑ 1.0 1.1 1.2 1.3 1.4 1.5 1.6 M. Kapovich B. Leeb. On asymptotic cones and quasi-isometry classes of fundamental groups of 3-manifolds, Geometric and Functional Analysis, Vol. 5 (1995), no. 3, pp. 582–603
- ↑ John Roe. Lectures on Coarse Geometry. American Mathematical Society, 2003. ISBN 978-0-8218-3332-2; Definition 7.19, p. 107.
- ↑ L.Van den Dries, A.J.Wilkie, On Gromov's theorem concerning groups of polynomial growth and elementary logic. Journal of Algebra, Vol. 89(1984), pp. 349–374.
- ↑ John Roe. Lectures on Coarse Geometry. American Mathematical Society, 2003. ISBN 978-0-8218-3332-2; Proposition 7.20, p. 108.
- ↑ Bridson, Haefliger "Metric Spaces of Non-positive curvature" Lemma 5.53
- ↑ John Roe. Lectures on Coarse Geometry. American Mathematical Society, 2003. ISBN 978-0-8218-3332-2
- ↑ Cornelia Druţu and Mark Sapir (with an Appendix by Denis Osin and Mark Sapir), Tree-graded spaces and asymptotic cones of groups. Topology, Volume 44 (2005), no. 5, pp. 959–1058.
- ↑ Yu. Burago, M. Gromov, and G. Perel'man. A. D. Aleksandrov spaces with curvatures bounded below (in Russian), Uspekhi Matematicheskih Nauk vol. 47 (1992), pp. 3–51; translated in: Russian Math. Surveys vol. 47, no. 2 (1992), pp. 1–58
- ↑ John Roe. Lectures on Coarse Geometry. American Mathematical Society, 2003. ISBN 978-0-8218-3332-2; Example 7.30, p. 118.