Dissipation factor: Difference between revisions

Revision as of 07:14, 3 January 2014

In geometric group theory, Gromov's theorem on groups of polynomial growth, named for Mikhail Gromov, characterizes finitely generated groups of polynomial growth, as those groups which have nilpotent subgroups of finite index.

The growth rate of a group is a well-defined notion from asymptotic analysis. To say that a finitely generated group has polynomial growth means the number of elements of length (relative to a symmetric generating set) at most n is bounded above by a polynomial function p(n). The order of growth is then the least degree of any such polynomial function p.

A nilpotent group G is a group with a lower central series terminating in the identity subgroup.

Gromov's theorem states that a finitely generated group has polynomial growth if and only if it has a nilpotent subgroup that is of finite index.

There is a vast literature on growth rates, leading up to Gromov's theorem. An earlier result of Joseph A. Wolf showed that if G is a finitely generated nilpotent group, then the group has polynomial growth. Yves Guivarc'h and independently Hyman Bass (with different proofs) computed the exact order of polynomial growth. Let G be a finitely generated nilpotent group with lower central series

G=G_{1}\supseteq G_{2}\supseteq \ldots .

In particular, the quotient group G_k/G_k+1 is a finitely generated abelian group.

The Bass–Guivarc'h formula states that the order of polynomial growth of G is

d(G)=\sum _{k\geq 1}k\ \operatorname {rank} (G_{k}/G_{k+1})

where:

rank denotes the rank of an abelian group, i.e. the largest number of independent and torsion-free elements of the abelian group.

In particular, Gromov's theorem and the Bass–Guivarch formula imply that the order of polynomial growth of a finitely generated group is always either an integer or infinity (excluding for example, fractional powers).

In order to prove this theorem Gromov introduced a convergence for metric spaces. This convergence, now called the Gromov–Hausdorff convergence, is currently widely used in geometry.

A relatively simple proof of the theorem was found by Bruce Kleiner. Later, Terence Tao and Yehuda Shalom modified Kleiner's proof to make an essentially elementary proof as well as a version of the theorem with explicit bounds.^[1]^[2]

References

H. Bass, The degree of polynomial growth of finitely generated nilpotent groups, Proceedings London Mathematical Society, vol 25(4), 1972
M. Gromov, Groups of Polynomial growth and Expanding Maps, Publications mathematiques I.H.É.S., 53, 1981
Y. Guivarc'h, Groupes de Lie à croissance polynomiale, C. R. Acad. Sci. Paris Sér. A–B 272 (1971). [1]
Template:Cite arxiv
J. A. Wolf, Growth of finitely generated solvable groups and curvature of Riemannian manifolds, Journal of Differential Geometry, vol 2, 1968

[1] ttp://terrytao.wordpress.com/2010/02/18/a-proof-of-gromovs-theorem/

[2] Template:Cite arxiv

[1]

[2]

@@ Line 1: / Line 1: @@
-Seek out [http://www.alexa.com/search?q=educational+titles&r=topsites_index&p=bigtop educational titles]. It isn't generally plainly showcased on the list of primary blockbusters in game stores or digital item portions, however are nearly. Speak to other moms and daddies or question employees when it comes to specific suggestions, as post titles really exist that make it possible for by helping cover any learning languages, learning concepts and practicing mathematics.<br><br>If you beloved this posting and you would like to obtain additional information pertaining to [http://circuspartypanama.com clash of clans hack tool password] kindly go to our web-page. The fact that explained in the very last Clash of Clans' Tribe Wars overview, anniversary community war is breach ascending into a couple phases: Alertness Day and [http://search.un.org/search?ie=utf8&site=un_org&output=xml_no_dtd&client=UN_Website_en&num=10&lr=lang_en&proxystylesheet=UN_Website_en&oe=utf8&q=Activity&Submit=Go Activity] Day. Anniversary the look lasts 24 hours as well means that you could certainly accomplish altered things.<br><br>Okazaki, japan tartan draws desire through your country's fascination with cherry blossom and encompasses pink, white, green while brown lightly colours. clash of clans cheats. Determined by is called Sakura, china for cherry blossom.<br><br>A great deal as now, there exists not much social options / qualities with this game that i.e. there is not any chat, battling to team track using friends, etc but manage we could expect distinct to improve soon even though Boom Beach continues to stay their Beta Mode.<br><br>Nfl season is here and going strong, and similar many fans we in total for Sunday afternoon when the games begin. If you have gamed and liked Soul Caliber, you will love this in turn game. The new best is the Processor Cell which will randomly fill in some sections. Defeating players like that by any means necessary can be that reason that pushes these folks to use Words now with Friends Cheat. The app requires you to assist you to answer 40 questions with varying degrees of hard times.<br><br>It appears to be computer games are pretty much everywhere these times. Purchase play them on some telephone, boot a gaming system in the home and not to mention see them through social media on your personal mobile computer. It helps to comprehend this associated with amusement to help you'll benefit from the dozens of offers which are accessible.<br><br>Video game titles are some of you see, the finest kinds of amusement around. They are unquestionably also probably the the vast majority of pricey types of entertainment, with console games and this range from $50 to $60, and consoles on their own inside that 100s. It will be possible to spend lesser on clash of clans hack and console purchases, and you can track down out about them in the following paragraphs.
+In [[geometric group theory]], '''Gromov's theorem on groups of polynomial growth''', named for [[Mikhail Gromov (mathematician)|Mikhail Gromov]], characterizes finitely generated [[Group (mathematics)|groups]] of ''polynomial'' growth, as those groups which have [[nilpotent group|nilpotent]] subgroups of finite [[index of a subgroup|index]].
+The [[Growth rate (group theory)|growth rate]] of a group is a [[well-defined]] notion from [[asymptotic analysis]]. To say that a finitely generated group has '''polynomial growth''' means the number of elements of [[length]] (relative to a symmetric generating set) at most ''n'' is bounded above by a [[polynomial]] function ''p''(''n''). The ''order of growth'' is then the least degree of any such polynomial function ''p''.
+A ''nilpotent'' group ''G'' is a group with a [[lower central series]] terminating in the identity subgroup.
+Gromov's theorem states that a finitely generated group has polynomial growth if and only if it has a nilpotent subgroup that is of finite index.
+There is a vast literature on growth rates, leading up to Gromov's theorem. An earlier result of [[Joseph A. Wolf]] showed that if ''G'' is a finitely generated nilpotent group, then the group has polynomial growth. [[Yves Guivarc'h]] and independently [[Hyman Bass]] (with different proofs) computed the exact order of polynomial growth. Let ''G'' be a finitely generated nilpotent group with lower central series
+:<math> G = G_1 \supseteq G_2 \supseteq \ldots. </math>
+In particular, the quotient group ''G''<sub>''k''</sub>/''G''<sub>''k''+1</sub> is a finitely generated abelian group.
+'''The Bass&ndash;Guivarc'h formula''' states that the order of polynomial growth of ''G'' is
+:<math> d(G) = \sum_{k \geq 1} k \ \operatorname{rank}(G_k/G_{k+1}) </math>
+where:
+:''rank'' denotes the [[rank of an abelian group]], i.e. the largest number of independent and torsion-free elements of the abelian group.
+In particular, Gromov's theorem and the Bass&ndash;Guivarch formula imply that the order of polynomial growth of a finitely generated group is always either an integer or infinity (excluding for example, fractional powers).
+In order to prove this theorem Gromov introduced a convergence for metric spaces. This convergence, now called  the [[Gromov&ndash;Hausdorff convergence]], is currently widely used in geometry.
+A relatively simple proof of the theorem was found by [[Bruce Kleiner]]. Later, [[Terence Tao]] and [[Yehuda Shalom]] modified Kleiner's proof to make an essentially elementary proof as well as a version of the theorem with explicit bounds.<ref>http://terrytao.wordpress.com/2010/02/18/a-proof-of-gromovs-theorem/</ref><ref>{{cite arxiv |eprint=0910.4148 |author1=Yehuda Shalom |author2=Terence Tao |title=A finitary version of Gromov's polynomial growth theorem |class=math.GR |year=2009}}</ref>
+== References ==
+<references/>
+* H. Bass, The degree of polynomial growth of finitely generated nilpotent groups, ''Proceedings London Mathematical Society'', vol 25(4), 1972
+* M. Gromov, Groups of Polynomial growth and Expanding Maps, [http://www.numdam.org/numdam-bin/feuilleter?id=PMIHES_1981__53_ ''Publications mathematiques I.H.É.S.'', 53, 1981]
+* Y. Guivarc'h, Groupes de Lie à croissance polynomiale, C. R. Acad. Sci. Paris Sér. A&ndash;B 272 (1971). [http://www.numdam.org/item?id=BSMF_1973__101__333_0]
+* {{Cite arxiv | last1=Kleiner | first1=Bruce | year=2007  | title=A new proof of Gromov's theorem on groups of polynomial growth | arxiv=0710.4593}}
+* J. A. Wolf,  Growth of finitely generated solvable groups and curvature of Riemannian manifolds, ''Journal of Differential Geometry'', vol 2, 1968
+[[Category:Theorems in group theory]]
+[[Category:Nilpotent groups]]
+[[Category:Infinite group theory]]
+[[Category:Metric geometry]]
+[[Category:Geometric group theory]]

Dissipation factor: Difference between revisions

Revision as of 07:14, 3 January 2014

References

Navigation menu

Search