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Lie algebra, nil

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A Lie algebra ${\mathfrak g}$ over a field $k$ defined by the presence of a function $n:{\mathfrak g}\times{\mathfrak g}\to{\mathbb N}$ such that $({\rm ad}\; x)^{n(x,y)}(y) = 0$, where $({\rm ad}\; x)(y) = [x,y]$, for any $x,y\in{\mathfrak g}$. The main question about nil Lie algebras concerns the conditions on ${\mathfrak g}$, $k$, $n$ under which ${\mathfrak g}$ is (locally) nilpotent (see Lie algebra, nilpotent). A nil Lie algebra that is finite-dimensional over $k$ is nilpotent. On the other hand, over any field there are finitely-generated nil Lie algebras that are not nilpotent [1]. Suppose that $n$ is a constant. A nil Lie algebra is locally nilpotent if ${\rm char}\; k = 0$ or if $m\le p+1$, where $p={\rm char}\; k>0$ (Kostrikin's theorem, [2]). Local nilpotency also holds in the case when ${\mathfrak g}$ is locally solvable. An infinitely-generated nil Lie algebra is not necessarily nilpotent if $n\ge p-2$ (see [3]), and for $n\ge p+1$ non-nilpotency can still occur under the condition of solvability. Recently it has been proved by E.I. Zel'myanov that a nil Lie algebra is nilpotent if ${\rm char}\; k = 0$ (cf. [6]) and that a nil algebra is also locally nilpotent if $n> p+1$. The study of nil Lie algebras over a field $k$ of characteristic $p>0$ is closely connected with the Burnside problem.

References

[1] E.S. Golod, "On nil-algebras and residually finite

groups" Izv. Akad. Nauk SSSR Ser. Mat. , 28 : 2 (1964)

pp. 273–276 (In Russian)
[2] A.I. Kostrikin, "On Burnside's problem"

Izv. Akad. Nauk SSSR Ser. Mat. , 23 : 1 (1959) pp. 3–34 (In

Russian)
[3]

Yu.P. Razmyslov, "On Lie algebras satisfying the Engel condition" Algebra and Logic , 10 : 1 (1971) pp. 21–29 Algebra i

Logika , 10 : 1 (1971) pp. 33–44
[4] Yu. [Yu.A. Bakhturin]

Bahturin, "Lectures on Lie algebras" , Akademie Verlag

(1978)
[5]

A. Braun, "Lie rings and the Engel condition" J. of Algebra ,

31 (1974) pp. 287–292
[6] A.I. Kostrikin, "Around Burnside" , Springer (1989) (Translated from Russian)


Comments

References

[a1] N. Jacobson, "Lie algebras" , Interscience (1962) ((also: Dover, reprint, 1979))
[a2] J.E. Humphreys, "Introduction to Lie algebras and representation theory" , Springer (1972) pp. §5.4
How to Cite This Entry:
Lie algebra, nil. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Lie_algebra,_nil&oldid=21486
This article was adapted from an original article by Yu.A. Bakhturin (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article