THE LOWER CENTRAL AND DERIVED SERIES OF THE BRAID GROUPS OF THE FINITELY-PUNCTURED SPHERE

2009 ◽  
Vol 18 (05) ◽  
pp. 651-704 ◽  
Author(s):  
DACIBERG LIMA GONÇALVES ◽  
JOHN GUASCHI
Keyword(s):  
Free Group ◽  
Commutator Subgroup ◽  
Lower Central Series ◽  
Exceptional Case ◽  
Braid Groups ◽  
Central Series ◽  
Artin Groups ◽  
Almost Periodic ◽  
Algebraic Equations ◽  
Derived Series

Motivated in part by the study of Fadell–Neuwirth short exact sequences, we determine the lower central and derived series for the braid groups of the finitely-punctured sphere. For n ≥ 1, the class of m-string braid groups Bm(𝕊2\{x1,…,xn}) of the n-punctured sphere includes the usual Artin braid groups Bm (for n = 1), those of the annulus, which are Artin groups of type B (for n = 2), and affine Artin groups of type [Formula: see text] (for n = 3). We first consider the case n = 1. Motivated by the study of almost periodic solutions of algebraic equations with almost periodic coefficients, Gorin and Lin calculated the commutator subgroup of the Artin braid groups. We extend their results, and show that the lower central series (respectively, derived series) of Bm is completely determined for all m ∈ ℕ (respectively, for all m ≠ 4). In the exceptional case m = 4, we obtain some higher elements of the derived series and its quotients. When n ≥ 2, we prove that the lower central series (respectively, derived series) of Bm(𝕊2\{x1,…,xn}) is constant from the commutator subgroup onwards for all m ≥ 3 (respectively, m ≥ 5). The case m = 1 is that of the free group of rank n - 1. The case n = 2 is of particular interest notably when m = 2 also. In this case, the commutator subgroup is a free group of infinite rank. We then go on to show that B2(𝕊2\{x1,x2}) admits various interpretations, as the Baumslag–Solitar group BS(2,2), or as a one-relator group with non-trivial centre for example. We conclude from this latter fact that B2(𝕊2\{x1,x2}) is residually nilpotent, and that from the commutator subgroup onwards, its lower central series coincides with that of the free product ℤ2 * ℤ. Further, its lower central series quotients Γi/Γi + 1 are direct sums of copies of ℤ2, the number of summands being determined explicitly. In the case m ≥ 3 and n = 2, we obtain a presentation of the derived subgroup, from which we deduce its Abelianization. Finally, in the case n = 3, we obtain partial results for the derived series, and we prove that the lower central series quotients Γi/Γi + 1 are 2-elementary finitely-generated groups.

scholarly journals On the length of the shortest non-trivial element in the derived and the lower central series

2015 ◽  
Vol 18 (5) ◽  
Author(s):  
Abdelrhman Elkasapy ◽  
Andreas Thom
Keyword(s):  
Lower Bounds ◽  
Free Group ◽  
Lower Central Series ◽  
Upper And Lower Bounds ◽  
Compact Groups ◽  
Central Series ◽  
Residual Finiteness ◽  
Trivial Element ◽  
Nilpotent Residual ◽  
Derived Series

AbstractWe provide upper and lower bounds on the length of the shortest non-trivial element in the derived series and lower central series in the free group on two generators. The techniques are used to provide new estimates on the nilpotent residual finiteness growth and on almost laws for compact groups.

scholarly journals The third term of the lower central series of a free group as a subgroup of the second

1973 ◽  
Vol 16 (1) ◽  
pp. 18-23 ◽  
Author(s):  
Martin Ward
Keyword(s):  
Positive Integer ◽  
Free Group ◽  
Lower Central Series ◽  
Negative Integer ◽  
Central Series ◽  
The Third ◽  
Derived Series

In this paper the following notation will be used: for any group G, positive integer c and non-negative integer n, Gc is the cth term of the lower central series of G and δ nGc is the nth term of the derived series of Gc.

Massey Products and Lower Central Series of Free Groups

1987 ◽  
Vol 39 (2) ◽  
pp. 322-337 ◽  
Author(s):  
Roger Fenn ◽  
Denis Sjerve
Keyword(s):  
Free Group ◽  
Differential Calculus ◽  
Free Groups ◽  
Lower Central Series ◽  
Central Series ◽  
Massey Product ◽  
Massey Products ◽  
One Dimensional ◽  
Image Position

The purpose of this paper is to continue the investigation into the relationships amongst Massey products, lower central series of free groups and the free differential calculus (see [4], [9], [12]). In particular we set forth the notion of a universal Massey product ≪α1, …, αk≫, where the αi are one dimensional cohomology classes. This product is defined with zero indeterminacy, natural and multilinear in its variables.In order to state the results we need some notation. Throughout F will denote the free group on fixed generators x1, …, xn andwill denote the lower central series of F. If I = (i1, …, ik) is a sequence such that 1 ≦ i1, …, ik ≦ n then ∂1 is the iterated Fox derivative and , where is the augmentation. By convention we set ∂1 = identity if I is empty.

scholarly journals Filtrations of free groups arising from the lower central series

2016 ◽  
Vol 19 (3) ◽  
Author(s):  
Michael Chapman ◽  
Ido Efrat
Keyword(s):  
Free Group ◽  
Systematic Study ◽  
Free Groups ◽  
Lower Central Series ◽  
Central Series

AbstractWe make a systematic study of filtrations of a free group

Finite-by-nilpotent groups

1956 ◽  
Vol 52 (4) ◽  
pp. 611-616 ◽  
Author(s):  
P. Hall
Keyword(s):  
Commutator Subgroup ◽  
Lower Central Series ◽  
Nilpotent Groups ◽  
Central Series ◽  
Image Position

1. Introduction. 1·1. Notation. Letandbe, respectively, the upper and lower central series of a group G. By definition, Zi+1/Zi is the centre of G/Zi and Γj+1 = [Γj, G] is the commutator subgroup of Γj with G. When necessary for clearness, we write ZiG) for Zi and Γj(G) for Γj.

COMPUTING HALL EXPONENTS IN THE FREE GROUP

1993 ◽  
Vol 03 (03) ◽  
pp. 275-294 ◽  
Author(s):  
GUY MELANÇON ◽  
CHRISTOPHE REUTENAUER
Keyword(s):  
Free Group ◽  
Lower Central Series ◽  
Central Series ◽  
Linear Combinations ◽  
Nous Montrons

Nous donnons une généralisation de la décomposition de M. Hall des éléments du groupe libre en produits décroissant de commutateurs de Hall. Nous généralisons les identités de Thérien, qui expriment les exposants de la décomposition comme des sommes à coefficients entiers positifs de fonctions sous-mots. Nous étudions l’algèbre des fonctions sous-mots et nous montrons que cette algèbre est librement engendrée par les fonctions qui donnent ces exposants; nous montrons aussi la continuité de ces fonctions pour la topologie de Hall sur le groupe libre. De plus, nous donnons de nouvelles preuves de résultats connus, entre autres les théorèmes de Magnus et Witt qui caractérisent les éléments de la série centrale descendante du grouple libre. We give the generalization of M. Hall’s expansion of each element of the free group as a decreasing product of Hall commutators. We also prove the generalization of Therien’s identities expressing the Hall exponents as nonnegative linear combinations of subword functions. We study the algebra of subword functions and show that it is freely generated by the Hall exponents functions; we also prove the continuity of these functions for the Hall topology on the free group. Besides these results, we give new proofs of known results, especially of the theorem of Magnus and Witt on the lower central series of the free group.

scholarly journals A NOTE ON BRAIDS AND PARSEVAL'S THEOREM

2012 ◽  
Vol 21 (05) ◽  
pp. 1250024
Author(s):  
JONATHAN FINE
Keyword(s):  
Fourier Series ◽  
Linear Function ◽  
Laurent Series ◽  
Lower Central Series ◽  
Braid Groups ◽  
Central Series ◽  
Free Abelian Groups ◽  
Sum Formula ◽  
Parseval’S Theorem ◽  
Infinite Sum

In 1986 Falk and Randell, based on Arnold's 1969 paper on braids, proved that the pure braid groups are residually nilpotent. They also proved that the quotients in the lower central series are free abelian groups. This brief note uses an example to provide evidence for a much stronger conjectural statement: That each braid b can be written as an infinite sum [Formula: see text], where each bi is a linear function of the ith Vassiliev–Kontsevich Zi(b) invariant of b. The example is pure braids on two strands. This leads to solving eτ = q for τ a Laurent series in q. We set [Formula: see text] and use Fourier series and Parseval's theorem to prove eτ = q. For more than two strands the stronger statement seems to rely on an as yet unstated Plancherel theorem for braid groups, which is likely both to be deep and to have deep consequences.

scholarly journals FREE CENTRE-BY-NILPOTENT-BY-ABELIAN LIE RINGS OF RANK 2

2015 ◽  
Vol 102 (1) ◽  
pp. 63-73 ◽  
Author(s):  
MARIA ALEXANDROU ◽  
RALPH STÖHR
Keyword(s):  
Free Abelian Group ◽  
Torsion Group ◽  
Lower Central Series ◽  
Torsion Subgroup ◽  
Central Series ◽  
Lie Ring ◽  
Direct Sum ◽  
Lie Rings ◽  
Rank 2 ◽  
Derived Series

We study the free Lie ring of rank $2$ in the variety of all centre-by-nilpotent-by-abelian Lie rings of derived length $3$. This is the quotient $L/([\unicode[STIX]{x1D6FE}_{c}(L^{\prime }),L]+L^{\prime \prime \prime })$ with $c\geqslant 2$ where $L$ is the free Lie ring of rank $2$, $\unicode[STIX]{x1D6FE}_{c}(L^{\prime })$ is the $c$th term of the lower central series of the derived ideal $L^{\prime }$ of $L$, and $L^{\prime \prime \prime }$ is the third term of the derived series of $L$. We show that the quotient $\unicode[STIX]{x1D6FE}_{c}(L^{\prime })+L^{\prime \prime \prime }/[\unicode[STIX]{x1D6FE}_{c}(L^{\prime }),L]+L^{\prime \prime \prime }$ is a direct sum of a free abelian group and a torsion group of exponent $c$. We exhibit an explicit generating set for the torsion subgroup.

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