Difference between revisions of "X-inner derivation"
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| + | The obvious Lie analogue of an [[X-inner automorphism|$X$-inner automorphism]]. | ||
| − | + | Let $R$ be a [[Prime ring|prime ring]] (with $1$) and let $Q = Q _ { s } ( R )$ denote its symmetric [[Martindale ring of quotients|Martindale ring of quotients]]. Then any derivation $\delta$ of $R$ (cf. also [[Derivation in a ring|Derivation in a ring]]) extends uniquely to a derivation $\hat{\delta}$ of $Q$, and one says that $\delta$ is $X$-inner if $\hat{\delta}$ is inner on $Q$ (cf. also [[X-inner automorphism|$X$-inner automorphism]]). It follows easily that $\delta$ is $X$-inner if there exists a $q \in Q$ with $\delta ( x ) = \operatorname { ad } _ { q } ( x ) = [ q , x ]$ for all $x \in R$. Of course, $q$ is determined by $\delta$ up to an additive term in the extended centroid $C = \mathbf{Z} ( Q ) = \mathbf{C} _ { Q } ( R )$. If $R$ is semi-prime (cf. also [[Prime ring|Prime ring]]), the definition is similar, but considerably more complicated. | |
| − | + | $X$-inner derivations are a tool in the study of differential identities, Galois theory with derivations, and enveloping algebra smash products. To start with, [[#References|[a1]]] and [[#References|[a2]]] show that the multi-linear differential identities of a semi-prime ring follow from generalized identities, where no derivations are involved, and from certain equations which are always satisfied by derivations. As a consequence, a prime ring satisfying a non-trivial differential identity must also satisfy a non-trivial generalized identity. | |
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| + | Next, let $R$ be a prime ring of characteristic $p > 0$ and let $D ( R )$ denote the set of all derivations $\delta$ of $Q$ such that $\delta ( I _ { \delta } ) \subseteq R$ for some $0 \neq I _ { \delta } \triangleleft R$. Then $D ( R )$ is a restricted Lie ring (cf. also [[Lie algebra|Lie algebra]]) which is a left $C$-vector space, and [[#References|[a3]]] and [[#References|[a4]]] study the Galois theory of $R$ determined by finite-dimensional restricted Lie subrings $L$ of $D ( R )$. Specifically, [[#References|[a3]]] considers the $X$-outer case, where $L$ contains no non-zero inner derivation of $Q$, and [[#References|[a4]]] assumes that $B ( L )$, the $C$-subalgebra of $Q$ generated by all $q \in Q$ with $\operatorname{ad} _ { q } \in L$, is quasi-Frobenius (cf. also [[Quasi-Frobenius ring|Quasi-Frobenius ring]]). Note that, if $\operatorname{ad} _ { q } \in L$, then $\operatorname{ad} _ { q }$ is (essentially) an $X$-inner derivation of $R$. | ||
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| + | Finally, $X$-inner derivations appear in [[#References|[a5]]] and [[#References|[a6]]], where the prime ideals of certain enveloping algebra smash products $R \# U ( L )$ are described. | ||
====References==== | ====References==== | ||
| − | <table>< | + | <table><tr><td valign="top">[a1]</td> <td valign="top"> V.K. Kharchenko, "Differential identities of prime rings" ''Algebra and Logic'' , '''17''' (1979) pp. 155–168 ''Algebra i Logika'' , '''17''' (1978) pp. 220–238</td></tr><tr><td valign="top">[a2]</td> <td valign="top"> V.K. Kharchenko, "Differential identities of semiprime rings" ''Algebra and Logic'' , '''18''' (1979) pp. 58–80 ''Algebra i Logika'' , '''18''' (1979) pp. 86–119</td></tr><tr><td valign="top">[a3]</td> <td valign="top"> V.K. Kharchenko, "Constants of derivations of prime rings" ''Math. USSR Izv.'' , '''45''' (1982) pp. 381–401 ''Izv. Akad. Nauk SSSR Ser. Mat.'' , '''45''' (1981) pp. 435–461</td></tr><tr><td valign="top">[a4]</td> <td valign="top"> V.K. Kharchenko, "Derivations of prime rings of positive characteristic" ''Algebra and Logic'' , '''35''' (1996) pp. 49–58 ''Algebra i Logika'' , '''35''' (1996) pp. 88–104</td></tr><tr><td valign="top">[a5]</td> <td valign="top"> D.S. Passman, "Prime ideals in enveloping rings" ''Trans. Amer. Math. Soc.'' , '''302''' (1987) pp. 535–560</td></tr><tr><td valign="top">[a6]</td> <td valign="top"> D.S. Passman, "Prime ideals in restricted enveloping rings" ''Commun. Algebra'' , '''16''' (1988) pp. 1411–1436</td></tr></table> |
Latest revision as of 16:46, 1 July 2020
The obvious Lie analogue of an $X$-inner automorphism.
Let $R$ be a prime ring (with $1$) and let $Q = Q _ { s } ( R )$ denote its symmetric Martindale ring of quotients. Then any derivation $\delta$ of $R$ (cf. also Derivation in a ring) extends uniquely to a derivation $\hat{\delta}$ of $Q$, and one says that $\delta$ is $X$-inner if $\hat{\delta}$ is inner on $Q$ (cf. also $X$-inner automorphism). It follows easily that $\delta$ is $X$-inner if there exists a $q \in Q$ with $\delta ( x ) = \operatorname { ad } _ { q } ( x ) = [ q , x ]$ for all $x \in R$. Of course, $q$ is determined by $\delta$ up to an additive term in the extended centroid $C = \mathbf{Z} ( Q ) = \mathbf{C} _ { Q } ( R )$. If $R$ is semi-prime (cf. also Prime ring), the definition is similar, but considerably more complicated.
$X$-inner derivations are a tool in the study of differential identities, Galois theory with derivations, and enveloping algebra smash products. To start with, [a1] and [a2] show that the multi-linear differential identities of a semi-prime ring follow from generalized identities, where no derivations are involved, and from certain equations which are always satisfied by derivations. As a consequence, a prime ring satisfying a non-trivial differential identity must also satisfy a non-trivial generalized identity.
Next, let $R$ be a prime ring of characteristic $p > 0$ and let $D ( R )$ denote the set of all derivations $\delta$ of $Q$ such that $\delta ( I _ { \delta } ) \subseteq R$ for some $0 \neq I _ { \delta } \triangleleft R$. Then $D ( R )$ is a restricted Lie ring (cf. also Lie algebra) which is a left $C$-vector space, and [a3] and [a4] study the Galois theory of $R$ determined by finite-dimensional restricted Lie subrings $L$ of $D ( R )$. Specifically, [a3] considers the $X$-outer case, where $L$ contains no non-zero inner derivation of $Q$, and [a4] assumes that $B ( L )$, the $C$-subalgebra of $Q$ generated by all $q \in Q$ with $\operatorname{ad} _ { q } \in L$, is quasi-Frobenius (cf. also Quasi-Frobenius ring). Note that, if $\operatorname{ad} _ { q } \in L$, then $\operatorname{ad} _ { q }$ is (essentially) an $X$-inner derivation of $R$.
Finally, $X$-inner derivations appear in [a5] and [a6], where the prime ideals of certain enveloping algebra smash products $R \# U ( L )$ are described.
References
| [a1] | V.K. Kharchenko, "Differential identities of prime rings" Algebra and Logic , 17 (1979) pp. 155–168 Algebra i Logika , 17 (1978) pp. 220–238 |
| [a2] | V.K. Kharchenko, "Differential identities of semiprime rings" Algebra and Logic , 18 (1979) pp. 58–80 Algebra i Logika , 18 (1979) pp. 86–119 |
| [a3] | V.K. Kharchenko, "Constants of derivations of prime rings" Math. USSR Izv. , 45 (1982) pp. 381–401 Izv. Akad. Nauk SSSR Ser. Mat. , 45 (1981) pp. 435–461 |
| [a4] | V.K. Kharchenko, "Derivations of prime rings of positive characteristic" Algebra and Logic , 35 (1996) pp. 49–58 Algebra i Logika , 35 (1996) pp. 88–104 |
| [a5] | D.S. Passman, "Prime ideals in enveloping rings" Trans. Amer. Math. Soc. , 302 (1987) pp. 535–560 |
| [a6] | D.S. Passman, "Prime ideals in restricted enveloping rings" Commun. Algebra , 16 (1988) pp. 1411–1436 |
How to Cite This Entry:
X-inner derivation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=X-inner_derivation&oldid=14490
X-inner derivation. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=X-inner_derivation&oldid=14490
This article was adapted from an original article by D.S. Passman (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article