Hostname: page-component-cd9895bd7-8ctnn Total loading time: 0 Render date: 2024-12-27T07:00:51.305Z Has data issue: false hasContentIssue false

Automorphisms of Free Nilpotent Lie Algebras

Published online by Cambridge University Press:  20 November 2018

Vesselin Drensky
Affiliation:
Bulgarian Academy of Sciences, Sofia, Bulgaria
C. K. Gupta
Affiliation:
University of Manitoba, Winnipeg, Manitoba
Rights & Permissions [Opens in a new window]

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

Let Fm be the free Lie algebra of rank m over a field K of characteristic 0 freely generated by the set ﹛x1,… ,xm﹜, m ≧ 2. Cohn [7] proved that the automorphism group Aut Fm of the K-algebra Fm is generated by the following automorphisms: (i) automorphisms which are induced by the action of the general linear group GLm (= GLm(K)) on the subspace of Fm spanned by ﹛x1, … ,xm﹜; (ii) automorphisms of the form x1x1 +f(x2,,xm),Xkxk, k ≠ 1, where the polynomial f(x2,…,xm) does not depend on x1.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1990

References

1. Andreadakis, S., On the automorphisms of free groups and free nilpotent groups, Proc. London Math. Soc. (3) 15 (1965), 239268.Google Scholar
2. Andreadakis, S., Generators for Aut G, G free nilpotent, Arch. Math. 42 (1984), 296300.Google Scholar
3. Bachmuth, S., Induced automorphisms of free groups and free metabelian groups. Trans. Amer. Math. Soc. 122 (1966), 117.Google Scholar
4. Bakhturin, Yu. A., Identical relations in Lie algebras (Nauka, Moscow, 1985), (Russian). Translation: (VNU Science Press, Utrecht, 1987).Google Scholar
5. Berele, A., Homogeneous polynomial identities, Israel J. Math. 42 (1982), 258272.Google Scholar
6. Bryant, R.M. and Gupta, C.K., Automorphism groups of free nilpotent groups. Arch. Math. 52 (1989), 313320.Google Scholar
7. Cohn, P.M., Subalgebras of free associative algebras, Proc. London Math. Soc. (3) 14 (1964), 618632.Google Scholar
8. Drenski, V.S., Representations of the symmetric group and varieties of linear algebras, Mat. Sb. 115 (1981), 98-115 (Russian). Translation: Math. USSR Sb. 43 (1981), 85101.Google Scholar
9. Drensky, V., Computational techniques for PI algebras, Banach Center Publications, (to appear).Google Scholar
10. Formanek, E., Invariants and the ring of generic matrices, J. Algebra 89 (1984), 178223.Google Scholar
11. Goryaga, A.V, Generating elements of the group of automorphisms of a free nilpotent group, Algebra i Logika 75 (1976), 458-463 (Russian); Translation: Algebra and Logic 15 (1976), 289292.Google Scholar
12. Green, J.A., Polynomial representations of GLn, Lecture Notes in Mathematics 830 (Springer Verlag, Berlin-Heidelberg-New York, 1980).Google Scholar
13. Gupta, C.K., lA-automorphisms of two generator metabelian groups, Arch. Math. 37 (1981), 106-112.Google Scholar
14. Macdonald, I.G., Symmetric functions and Hall polynomials (Oxford Univ. Press (Clarendon), Oxford, 1979).Google Scholar
15. Mischenko, S.P., Varieties of hypercentral-by-metabelian Lie algebras over a field of characteristic zero. Vest. Mosk. Univ., Ser. 1, Matem., Mekhan. (1983), NO. 5, 33-37 (Russian).Google Scholar
16. Nielsen, J., Die Isomorphismengruppe derfreien Gruppen, Math. Ann. 91 (1924), 169209.Google Scholar
17. Thrall, R.M., On symmetrized Kronecker powers and the structure of the free Lie ring. Trans. Amer. Math. Soc. 64 (1942), 371388.Google Scholar
18. Weyl, H., The classical groups, their invariants and representations (Princeton Univ. Press, Princeton, N.J., 1946).Google Scholar