Restricted Lie Algebra
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In mathematics, a restricted Lie algebra is a Lie algebra together with an additional "''p'' operation."


Definition

Let ''L'' be a Lie algebra over a field ''k'' of characteristic ''p>0''. A ''p'' operation on ''L'' is a map X \mapsto X^ satisfying * \mathrm(X^) = \mathrm(X)^p for all X \in L, * (tX)^ = t^pX^ for all t \in k, X \in L, * (X+Y)^ = X^ + Y^ + \sum_^ \frac, for all X,Y \in L, where s_i(X,Y) is the coefficient of t^ in the formal expression \mathrm(tX+Y)^(X). If the characteristic of ''k'' is 0, then ''L'' is a restricted Lie algebra where the ''p'' operation is the identity map.


Examples

For any associative algebra ''A'' defined over a field of characteristic ''p'', the bracket operation ,Y:= XY-YX and ''p'' operation X^ := X^p make ''A'' into a restricted Lie algebra \mathrm(A). Let ''G'' be an algebraic group over a field k of characteristic ''p'', and \mathrm(G) be the
Zariski tangent space In algebraic geometry, the Zariski tangent space is a construction that defines a tangent space at a point ''P'' on an algebraic variety ''V'' (and more generally). It does not use differential calculus, being based directly on abstract algebra, an ...
at the identity element of ''G''. Each element of \mathrm(G) uniquely defines a left-invariant vector field on ''G'', and the commutator of vector fields defines a Lie algebra structure on \mathrm(G) just as in the Lie group case. If ''p>0'', the
Frobenius map In commutative algebra and field theory, the Frobenius endomorphism (after Ferdinand Georg Frobenius) is a special endomorphism of commutative rings with prime characteristic , an important class which includes finite fields. The endomorphism m ...
x \mapsto x^p defines a ''p'' operation on \mathrm(G).


Restricted universal enveloping algebra

The functor A \mapsto \mathrm(A) has a
left adjoint In mathematics, specifically category theory, adjunction is a relationship that two functors may exhibit, intuitively corresponding to a weak form of equivalence between two related categories. Two functors that stand in this relationship are kno ...
L \mapsto U^(L) called the restricted universal enveloping algebra. To construct this, let U(L) be the
universal enveloping algebra In mathematics, the universal enveloping algebra of a Lie algebra is the unital associative algebra whose representations correspond precisely to the representations of that Lie algebra. Universal enveloping algebras are used in the represent ...
of ''L'' forgetting the ''p'' operation. Letting ''I'' be the two-sided ideal generated by elements of the form x^p - x^, we set U^(L) = U(L) / I. It satisfies a form of the
PBW theorem PBW may refer to: * Philadelphia-Baltimore-Washington Stock Exchange * Peanut Butter Wolf, American hip hop record producer * Proton beam writing, a lithography process * Play by Web, Play-by-post role-playing game * Prosopography of the Byzant ...
.


See also

Restricted Lie algebras are used in Jacobson's Galois correspondence for
purely inseparable extension In algebra, a purely inseparable extension of fields is an extension ''k'' ⊆ ''K'' of fields of characteristic ''p'' > 0 such that every element of ''K'' is a root of an equation of the form ''x'q'' = ''a'', wit ...
s of fields of exponent 1.


References

* . * . * {{citation , last=Montgomery , first=Susan , authorlink=Susan Montgomery , title=Hopf algebras and their actions on rings. Expanded version of ten lectures given at the CBMS Conference on Hopf algebras and their actions on rings, which took place at DePaul University in Chicago, USA, August 10-14, 1992 , zbl=0793.16029 , series=Regional Conference Series in Mathematics , volume=82 , location=Providence, RI , publisher=American Mathematical Society , year=1993 , isbn=978-0-8218-0738-5 , page=23 . Algebraic groups Lie algebras