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On the basis-conjugating automorphism groups of free groups and free metabelian groups

Published online by Cambridge University Press:  08 December 2014

TAKAO SATOH*
Affiliation:
Department of Mathematics, Faculty of Science Division II, Tokyo University of Science, 1-3 Kagurazaka, Shinjuku, Tokyo, 162-8601, Japan. e-mail: [email protected]

Abstract

In this paper we study the images of the Johnson homomorphisms of the basis-conjugating automorphism groups of free groups and free metabelian groups. In particular, we show that the Johnson image is contained in a certain proper Lie subalgebra $\mathfrak{p}$Mn of the derivation algebra of the Chen Lie algebra. Furthermore, we completely determine the Johnson images, and give the abelianisation of $\mathfrak{p}$Mn as a Lie algebra by using Morita's trace maps.

Type
Research Article
Copyright
Copyright © Cambridge Philosophical Society 2014 

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References

REFERENCES

[1]Andreadakis, S.On the automorphisms of free groups and free nilpotent groups. Proc. London Math. Soc. (3) 15 (1965), 239268.CrossRefGoogle Scholar
[2]Bachmuth, S.Automorphisms of free metabelian groups. Trans. Amer. Math. Soc. 118 (1965), 93104.CrossRefGoogle Scholar
[3]Bachmuth, S.Induced automorphisms of free groups and free metabelian groups. Trans. Amer. Math. Soc. 122 (1966), 117.CrossRefGoogle Scholar
[4]Bachmuth, S. and Mochizuki, H. Y.The non-finite generation of Aut(G), G free metabelian of rank 3, Trans. Amer. Math. Soc. 270 (1982), 693700.Google Scholar
[5]Bachmuth, S. and Mochizuki, H. Y.Aut(F) → Aut(F/F”) is surjective for free group for rank ⩾ 4, Trans. Amer. Math. Soc. 292, no. 1 (1985), 81101.Google Scholar
[6]Bestvina, M., Bux, Kai–Uwe and Margalit, D.Dimension of the Torelli group for Out (Fn). Invent. Math. 170 (2007), no. 1, 132.CrossRefGoogle Scholar
[7]Birman, J. S.Braids, Links, and Mapping Class Groups. Ann. of Math. Stud. 82. Princeton University Press (1974).Google Scholar
[8]Bourbaki, N.Lie groups and Lie Algebra, Chapters 1–3, Softcover edition of the 2nd printing, Springer-Verlag (1989).Google Scholar
[9]Chen, K. T.Integration in free groups. Ann. of Math. 54, no. 1 (1951), 147162.Google Scholar
[10]Church, T. and Farb, B.Infinite generation of the kernels of the Magnus and Burau representations. Algebr. Geom. Topol. 10 (2010), 837851.Google Scholar
[11]Cohen, F. and Pakianathan, J. On automorphism groups of free groups. and their nilpotent quotients, preprint.Google Scholar
[12]Cohen, F. and Pakianathan, J. On subgroups of the automorphism group of a free group and associated graded Lie algebras, preprint.Google Scholar
[13]Cohen, F., Pakianathan, J., Vershinin, V. V. and Wu, J.Basis-conjugating automorphisms of a free group and associated Lie algebras. Geom. Topol. Monogr. 13 (2008), 147168.Google Scholar
[14]Enomoto, N. and Satoh, T.On the derivation algebra of the free Lie algebra and trace maps. Algebr Geom. Topol 11 (2011) 28612901.Google Scholar
[15]Farb, B. Automorphisms of Fn which act trivially on homology, in preparation.Google Scholar
[16]Hain, R.Infinitesimal presentations of the Torelli group. J. Amer. Math. Soc. 10 (1997), 597651.CrossRefGoogle Scholar
[17]Hall, M.A basis for free Lie rings and higher commutators in free groups. Proc. Amer. Math. Soc. 1 (1950), 575581.Google Scholar
[18]Hall, M.The Theory of Groups, second edition (AMS Chelsea Publishing, 1999).Google Scholar
[19]Johnson, D.An abelian quotient of the mapping class group. Math. Ann. 249 (1980), 225242.Google Scholar
[20]Johnson, D.The structure of the Torelli group I: a Finite Set of Generators for $\mathcal{I}$. Ann. Math. 2nd Ser. 118, No. 3 (1983), 423442.CrossRefGoogle Scholar
[21]Johnson, D.The structure of the Torelli group II: a characterisation of the group generated by twists on bounding curves. Topo. 24, No. 2 (1985), 113126.Google Scholar
[22]Johnson, D.The structure of the Torelli group III: the abelianisation of $\mathcal{I}$. Topo. 24 (1985), 127144.Google Scholar
[23]Kawazumi, N. Cohomological aspects of Magnus expansions, preprint, arXiv:math.GT/0505497.Google Scholar
[24]Krstić, S. and McCool, J.The non-finite presentability in IA(F 3) and GL 2(Z[t, t −1]). Invent. Math. 129 (1997), 595606.Google Scholar
[25]Magnus, W.Über n-dimensinale Gittertransformationen. Acta Math. 64 (1935), 353367.Google Scholar
[26]Magnus, W., Karras, A., and Solitar, D.Combinatorial Group Theory. (Interscience Publ., New York, 1966).Google Scholar
[27]Magnus, W. and Peluso, A.On a theorem of V. I. Arnold. Comm. Pure Appl. Math. XXII (1969), 683692.Google Scholar
[28]McCool, J.On basis-conjugating automorphisms of free groups. Canad. J. Math. XXXVIII, No. 6 (1986), 15251529.Google Scholar
[29]Morita, S.Abelian quotients of subgroups of the mapping class group of surfaces. Duke Math. J. 70 (1993), 699726.Google Scholar
[30]Morita, S.Structure of the mapping class groups of surfaces: a survey and a prospect. Geom. Topo. Monogr. 2 (1999), 349406.Google Scholar
[31]Morita, S.Cohomological structure of the mapping class group and beyond. Proc. Sympos. Pure Math. 74 (2006), 329354.CrossRefGoogle Scholar
[32]Nielsen, J.Die Isomorphismen der allgemeinen unendlichen Gruppe mit zwei Erzeugenden. Math. Ann. 78 (1918), 385397.Google Scholar
[33]Papadima, S. and Suciu, A. I.Homological finiteness in the Johnson filtration of the automorphism group of a free group. J. Topo. 5 (2012), no. 4, 909944.Google Scholar
[34]Pettet, A.The Johnson homomorphism and the second cohomology of IAn. Algeb. Geom. Topo. 5 (2005) 725740.Google Scholar
[35]Reutenauer, C.Free Lie Algebras. London Math. Soc. Monogr., new series, no. 7 (Oxford University Press, 1993).Google Scholar
[36]Satoh, T.New obstructions for the surjectivity of the Johnson homomorphism of the automorphism group of a free group. J. London Math. Soc. (2) 74 (2006) 341360.Google Scholar
[37]Satoh, T.The cokernel of the Johnson homomorphisms of the automorphism group of a free metabelian group. Trans. Amer. Math. Soc. 361 (2009), 20852107.CrossRefGoogle Scholar
[38]Satoh, T.On the lower central series of the IA-automorphism group of a free group. J. Pure Appl. Alg. 216 (2012), 709717.Google Scholar
[39]Satoh, T.The kernel of the Magnus representation of the automorphism group of a free group is not finitely generated. Math. Proc. Camb. Phil. Soc. 151 (2011), 407419.CrossRefGoogle Scholar
[40]Satoh, T.On the Johnson filtration of the basis-conjugating automorphism group of a free group. Michigan Math. J. 61 (2012), 87105.Google Scholar
[41]Satoh, T. A survey of the Johnson homomorphisms of the automorphism groups of free groups and related topics. Submitted to Handbook of Teichmueller theory, volume V.Google Scholar
[42]Witt, E.Treue Darstellung Liescher Ringe. J. Reine Angew. Math. 177 (1937), 152160.Google Scholar