Yoneda product

In algebra, the Yoneda product (named after Nobuo Yoneda) is the pairing between Ext groups of modules:

$${\displaystyle \operatorname {Ext} ^{n}(M,N)\otimes \operatorname {Ext} ^{m}(L,M)\to \operatorname {Ext} ^{n+m}(L,N)}$$

induced by

$${\displaystyle \operatorname {Hom} (N,M)\otimes \operatorname {Hom} (M,L)\to \operatorname {Hom} (N,L),\,f\otimes g\mapsto g\circ f.}$$

Specifically, for an element ${\displaystyle \xi \in \operatorname {Ext} ^{n}(M,N)}$, thought of as an extension

$${\displaystyle \xi :0\rightarrow N\rightarrow E_{0}\rightarrow \cdots \rightarrow E_{n-1}\rightarrow M\rightarrow 0,}$$

and similarly

$${\displaystyle \rho :0\rightarrow M\rightarrow F_{0}\rightarrow \cdots \rightarrow F_{m-1}\rightarrow L\rightarrow 0\in \operatorname {Ext} ^{m}(L,M),}$$

we form the Yoneda (cup) product

$${\displaystyle \xi \smile \rho :0\rightarrow N\rightarrow E_{0}\rightarrow \cdots \rightarrow E_{n-1}\rightarrow F_{0}\rightarrow \cdots \rightarrow F_{m-1}\rightarrow L\rightarrow 0\in \operatorname {Ext} ^{m+n}(L,N).}$$

Note that the middle map ${\displaystyle E_{n-1}\rightarrow F_{0}}$ factors through the given maps to ${\displaystyle M}$.

We extend this definition to include ${\displaystyle m,n=0}$ using the usual functoriality of the ${\displaystyle \operatorname {Ext} ^{*}(\cdot ,\cdot )}$ groups.

Applications

Ext Algebras

Given a commutative ring ${\displaystyle R}$  and a module ${\displaystyle M}$ , the Yoneda product defines a product structure on the groups ${\displaystyle {\text{Ext}}^{\bullet }(M,M)}$ , where ${\displaystyle {\text{Ext}}^{0}(M,M)={\text{Hom}}_{R}(M,M)}$  is generally a non-commutative ring. This can be generalized to the case of sheaves of modules over a ringed space, or ringed topos.

Grothendieck duality

In Grothendieck's duality theory of coherent sheaves on a projective scheme ${\displaystyle i:X\hookrightarrow \mathbb {P} _{k}^{n}}$  of pure dimension ${\displaystyle r}$  over an algebraically closed field ${\displaystyle k}$ , there is a pairing

$${\displaystyle {\text{Ext}}_{{\mathcal {O}}_{X}}^{p}({\mathcal {O}}_{X},{\mathcal {F}})\times {\text{Ext}}_{{\mathcal {O}}_{X}}^{r-p}({\mathcal {F}},\omega _{X}^{\bullet })\to k}$$

 

where ${\displaystyle \omega _{X}}$  is the dualizing complex ${\displaystyle \omega _{X}={\mathcal {Ext}}_{{\mathcal {O}}_{\mathbb {P} }}^{n-r}(i_{*}{\mathcal {F}},\omega _{\mathbb {P} })}$  and ${\displaystyle \omega _{\mathbb {P} }={\mathcal {O}}_{\mathbb {P} }(-(n+1))}$  given by the Yoneda pairing.^[1]

Deformation theory

The Yoneda product is useful for understanding the obstructions to a deformation of maps of ringed topoi.^[2] For example, given a composition of ringed topoi

$${\displaystyle X\xrightarrow {f} Y\to S}$$

 

and an ${\displaystyle S}$ -extension ${\displaystyle j:Y\to Y'}$  of ${\displaystyle Y}$  by an ${\displaystyle {\mathcal {O}}_{Y}}$ -module ${\displaystyle J}$ , there is an obstruction class

$${\displaystyle \omega (f,j)\in {\text{Ext}}^{2}(\mathbf {L} _{X/Y},f^{*}J)}$$

 

which can be described as the yoneda product

$${\displaystyle \omega (f,j)=f^{*}(e(j))\cdot K(X/Y/S)}$$

 

where

$${\displaystyle {\begin{aligned}K(X/Y/S)&\in {\text{Ext}}^{1}(\mathbf {L} _{X/Y},\mathbf {L} _{Y/S})\\f^{*}(e(j))&\in {\text{Ext}}^{1}(f^{*}\mathbf {L} _{Y/S},f^{*}J)\end{aligned}}}$$

 

and ${\displaystyle \mathbf {L} _{X/Y}}$  corresponds to the cotangent complex.

See also

• Ext functor
• Derived category
• Deformation theory
• Kodaira–Spencer map

References

1. Altman; Kleiman (1970). Grothendieck Duality. Lecture Notes in Mathematics. Vol. 146. p. 5. doi:10.1007/BFb0060932. ISBN 978-3-540-04935-7.
2. Illusie, Luc. "Complexe cotangent; application a la theorie des deformations" (PDF). p. 163.

• May, J. Peter. "Notes on Tor and Ext" (PDF).

External links

• Universality of Ext functor using Yoneda extensions