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Generating Adjoint Groups

Published online by Cambridge University Press:  30 January 2019

Be'eri Greenfeld*
Affiliation:
Department of Mathematics, Bar Ilan University, Ramat Gan, 5290002, Israel ([email protected])

Abstract

We prove two approximations of the open problem of whether the adjoint group of a non-nilpotent nil ring can be finitely generated. We show that the adjoint group of a non-nilpotent Jacobson radical cannot be boundedly generated and, on the other hand, construct a finitely generated, infinite-dimensional nil algebra whose adjoint group is generated by elements of bounded torsion.

Type
Research Article
Copyright
Copyright © Edinburgh Mathematical Society 2019 

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References

1.Abert, M., Lubotzky, A. and Pyber, L., Bounded generation and linear groups, Int. J. Alg. Comp. 13(4) (2003), 401413.Google Scholar
2.Adian, S. I. and Mennicke, J., On bounded generation of SL n(ℤ), Int. J. Alg. Comp. 2 (1992), 357365.Google Scholar
3.Amberg, B. and Kazarin, L., Nilpotent p-algebras and factorized p-groups, Groups St Andrews 2005 Volume 1, pp. 130–147, London Mathematical Society Lecture Note Series, Volume 339 (Cambridge University Press, 2007).Google Scholar
4.Amberg, B. and Sysak, Ya. P., Radical rings and products of groups, Groups St Andrews 1997, Bath, Volume 1(ed. Campbell, C. M., Robertson, E. F., Ruskuc, N. and Smith, G. C.), pp. 119. London Mathematical Society Lecture Note Series, Volume 260 (Cambridge University Press, 1999).Google Scholar
5.Amberg, B. and Sysak, Ya. P., Radical rings with Engel conditions, J. Algebra 231 (2000), 364373.Google Scholar
6.Amberg, B. and Sysak, Ya. P., Radical rings with soluble adjoint group, J. Algebra 247 (2002), 692702.Google Scholar
7.Amberg, B. and Sysak, Ya. P., Associative rings with metabelian adjoint group, J. Algebra 277 (2004), 456473.Google Scholar
8.Amberg, B., Dickenschied, O. and Sysak, Ya. P., Subgroups of the adjoint group of a radical ring, Canad. J. Math. 50 (1998), 315.Google Scholar
9.Balog, A., Mann, A. and Pyber, L., Polynomial index growth groups, Int. J. Alg. Comp. 10 (2000), 773782.Google Scholar
10.Carter, D. and Keller, G., Bounded elementary generation of SL n(𝕆), Amer. J. Math. 105 (1983), 673687.Google Scholar
11.Cedó, F., Jespers, E. and Okniński, J., Braces and the Yang–Baxter equation, Comm. Math. Phys. 327(1) (2014), 101116.Google Scholar
12.Lubotzky, A. and Segal, D., Subgroup growth, Progress in Mathematics, Volume 212 (Birkhäuser, Basel, 2003).Google Scholar
13.Mann, A. and Segal, D., Uniform finiteness conditions in residually finite groups, Proc. Lond. Math. Soc. 61(3) (1990), 529545.Google Scholar
14.Muranov, A., Diagrams with selection and method for constructing boundedly generated and boundedly simple groups, Comm. Algebra 33(4) (2005), 12171258.Google Scholar
15.Nikolov, N. and Sury, B., Bounded generation of wreath products, J. Group Theory 18(6) (2015), 951959.Google Scholar
16.Pyber, L. and Segal, D., Finitely generated groups with polynomial index growth, J. Reine Angew. Math. 2007(612) (2007), 173211.Google Scholar
17.Rump, W., Modules over braces, Algebra Discrete Math. (2) (2006), 127137.Google Scholar
18.Smoktunowicz, A., A note on set-theoretic solutions of the Yang–Baxter equation, J. Algebra 500 (2018), 318.Google Scholar
19.Smoktunowicz, A., On Engel groups, nilpotent groups, rings, braces and the Yang–Baxter equation, Trans. Amer. Math. Soc. 370 (2018), 65356564.Google Scholar
20.Sury, B., Bounded generation does not imply finite presentation, Comm. Alg. 25 (1997), 16731683.Google Scholar
21.Sysak, Ya. P., The adjoint group of radical rings and related questions, Ischia group theory 2010, pp. 344365 (World Scientific, Singapore, 2011).Google Scholar
22.Wilson, J., Finite presentations of pro-p groups and discrete groups, Invent. Math. 105(1) (1991), 177183.Google Scholar