Nilpotent Ideals in Graded Lie Algebras and Almost Constant-Free Derivations |
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| Authors: | E. I. Khukhro N. Yu. Makarenko P. Shumyatsky |
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| Affiliation: | 1. School of Mathematics , Cardiff University , Cardiff, United Kingdom khukhro@cardiff.ac.uk;3. Sobolev Institute of Mathematics , Novosibirsk, Russia;4. Department of Mathematics , University of Brasilia , Brazil, Brazil |
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| Abstract: | ![]()
It is proved that if a (?/p ?)-graded Lie algebra L, where p is a prime, has exactly d nontrivial grading components and dim L 0 = m, then L has a nilpotent ideal of d-bounded nilpotency class and of finite (m,d)-bounded codimension. As a consequence, Jacobson's theorem on constant-free nilpotent Lie algebras of derivations is generalized to the almost constant-free case. Another application is for Lie algebras with almost fixed-point-free automorphisms. |
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| Keywords: | Automorphism Derivation Graded Lie algebra Nilpotent ideal |
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