General Ring Theory/Derivations

Definition (derivation):

Let $S$ be a unital $R$ -algebra. Moreover, let $M$ be a module over the algebra $S$ . Then a derivation on $S$ over $R$ with values in $M$ is a morphism of $R$ -modules $d:S\to M$ such that

d(st)=sd(t)+td(s)

for all $s,t\in S$ . We denote the $S$ -module of all derivations of $S$ over $R$ with values in $M$ by $\operatorname {Der} _{R}(S,M)$ .

Definition (universal derivation):

Let $S$ be a unital $R$ -algebra. Then the universal derivation of $S$ over $R$ is the derivation $d:S\to \Omega _{S/R}$ , where $\Omega _{S/R}$ is the $S$ -module that arises by taking the free $S$ -module generated by the formal symbols $ds$ (one for each $s\in S$ ) and dividing out the ideal generated by elements of the form $d(ts)-tds-sdt$ as well as $d(rs)-rd(s)$ (where $r\in R$ , $t,s\in S$ ), and $d$ sends $s$ to $ds$ .

Proposition (universal property of the universal derivation):

Let $S$ be a unital $R$ -algebra and let $M$ be a module over the algebra $S$ . Then for each $\delta \in \operatorname {Der} _{R}(S,M)$ , there exists a unique morphism of $S$ -modules $f:\Omega _{S/R}\to M$ such that $\delta =f\circ d$ . This pairing induces an isomorphism of $R$ -modules

\operatorname {Hom} _{S}(\Omega _{S/R},M)\cong \operatorname {Der} _{R}(S,M)

.

Proof: For uniqueness, note that the universal derivation $d$ is surjective, so $f$ is determined by $\delta =f\circ d$ . For existence, note that if $F$ is the free $S$ -module with generators $ds$ for all $s\in S$ , then there is a morphism $F\to M$ that sends $ds$ to $\delta (s)$ , and it factors over the quotient in the definition of $\Omega _{S/R}$ by the properties of $\delta$ . $\Box$

Proposition (universal derivation is unique):

The universal derivation of a unital $R$ -algebra $S$ together with its target module is uniquely defined.

Proof: This follows immediately from the universal property that defines the corresponding object uniquely. $\Box$

General Ring Theory/Derivations

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