Exact sequences, lower central series and representations of surface braid groups

Bellingeri, Paolo; Godelle, Eddy; Guaschi, John

doi:10.48550/arxiv.1106.4982

Cited by 2 publications

(3 citation statements)

References 29 publications

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“…As noted in [4,Proposition 6.3], the property of a split extension B " A ¸ϕ C being an almost direct product does not depend on the choice of splitting. That is, if σ 1 : C Ñ B is another splitting of the projection β : B Ñ C, and if ϕ 1 : C Ñ AutpAq is the corresponding monodromy action, then the split extension B " A¸ϕ1 C is again an almost direct product.…”

Section: Trivial Action On Abelianizationmentioning

confidence: 91%

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Lower central series and split extensions

Suciu¹

2021

Preprint

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Following Lazard, we study the N-series of a group G and their associated graded Lie algebras. The main examples we consider are the lower central series and Stallings' rational and mod-p versions of this series. Building on the work of Massuyeau and Guaschi-Pereiro, we describe these N-series and Lie algebras in the case when G splits as a semidirect product, in terms of the relevant data for the factors and the monodromy action. As applications, we recover a well-known theorem of Falk-Randell regarding split extensions with trivial monodromy on abelianization and its mod-p version due to Bellingeri-Gervais and prove an analogous result for the rational lower central series of split extensions with trivial monodromy on torsion-free abelianization.

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Section: Trivial Action On Abelianizationmentioning

confidence: 91%

“…Arguing as in the proofs of [4,Proposition 6.3] and [3, Proposition 3.2], it is readily seen that the property of a split extension being a rational almost direct product does not depend on the choice of splitting.…”

Section: Trivial Action On Torsion-free Abelianizationmentioning

confidence: 98%

Lower central series and split extensions

Suciu¹

2021

Preprint

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“…Among the successive quotients of the derives series of a group G, the second one plays a special role. The Alexander invariant of G is the abelian group (6) BpGq ≔ G 1 {G 2 , viewed as a module over the group-ring ZrG ab s; alternatively, BpGq " G 1 ab " H 1 pG 1 ab ; Zq. Addition in BpGq is induced from multiplication in G, to wit, pxG 2 q `pyG 2 q " xyG 2 for all x, y P G 1 , while scalar multiplication is induced from conjugation in the maximal metabelian quotient, G{G 2 , via the exact sequence (7) 1…”

Section: Derived Series and The Alexander Invariantmentioning

confidence: 99%

Alexander invariants and cohomology jump loci in group extensions

Suciu¹

2021

Preprint

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We study the integral, rational, and modular Alexander invariants, as well as the cohomology jump loci of groups arising as extensions with trivial algebraic monodromy. Our focus is on extensions of the form 1 Ñ K Ñ G Ñ Q Ñ 1, where Q is an abelian group acting trivially on H 1 pK; Zq, with suitable modifications in the rational and mod-p settings. We find a tight relationship between the Alexander invariants, the characteristic varieties, and the resonance varieties of the groups K and G. This leads to an inequality between the respective Chen ranks, which becomes an equality in degrees greater than 1 for split extensions.

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Exact sequences, lower central series and representations of surface braid groups

Cited by 2 publications

References 29 publications

Lower central series and split extensions

Lower central series and split extensions

Alexander invariants and cohomology jump loci in group extensions

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