Factorization algebra

In mathematics and mathematical physics, a factorization algebra is an algebraic structure first introduced by Beilinson and Drinfel'd in an algebro-geometric setting as a reformulation of chiral algebras,^[1] and also studied in a more general setting by Costello to study quantum field theory.^[2]

Definition

Prefactorization algebras

A factorization algebra is a prefactorization algebra satisfying some properties, similar to sheafs being a presheaf with extra conditions.

If ${\displaystyle M}$  is a topological space, a prefactorization algebra ${\displaystyle {\mathcal {F}}}$  of vector spaces on ${\displaystyle M}$  is an assignment of vector spaces ${\displaystyle {\mathcal {F}}(U)}$  to open sets ${\displaystyle U}$  of ${\displaystyle M}$ , along with the following conditions on the assignment:

• For each inclusion ${\displaystyle U\subset V}$ , there's a linear map ${\displaystyle m_{V}^{U}:{\mathcal {F}}(U)\rightarrow {\mathcal {F}}(V)}$ 
• There is a linear map ${\displaystyle m_{V}^{U_{1},\cdots ,U_{n}}:{\mathcal {F}}(U_{1})\otimes \cdots \otimes {\mathcal {F}}(U_{n})\rightarrow {\mathcal {F}}(V)}$  for each finite collection of open sets with each ${\displaystyle U_{i}\subset V}$  and the ${\displaystyle U_{i}}$  pairwise disjoint.
• The maps compose in the obvious way: for collections of opens ${\displaystyle U_{i,j}}$ , ${\displaystyle V_{i}}$  and an open ${\displaystyle W}$  satisfying ${\displaystyle U_{i,1}\sqcup \cdots \sqcup U_{i,n_{i}}\subset V_{i}}$  and ${\displaystyle V_{1}\sqcup \cdots V_{n}\subset W}$ , the following diagram commutes.

${\displaystyle {\begin{array}{lcl}&\bigotimes _{i}\bigotimes _{j}{\mathcal {F}}(U_{i,j})&\rightarrow &\bigotimes _{i}{\mathcal {F}}(V_{i})&\\&\downarrow &\swarrow &\\&{\mathcal {F}}(W)&&&\\\end{array}}}$ 

So ${\displaystyle {\mathcal {F}}}$  resembles a precosheaf, except the vector spaces are tensored rather than (direct-)summed.

The category of vector spaces can be replaced with any symmetric monoidal category.

Factorization algebras

To define factorization algebras, it is necessary to define a Weiss cover. For ${\displaystyle U}$  an open set, a collection of opens ${\displaystyle {\mathfrak {U}}=\{U_{i}|i\in I\}}$  is a Weiss cover of ${\displaystyle U}$  if for any finite collection of points ${\displaystyle \{x_{1},\cdots ,x_{k}\}}$  in ${\displaystyle U}$ , there is an open set ${\displaystyle U_{i}\in {\mathfrak {U}}}$  such that ${\displaystyle \{x_{1},\cdots ,x_{k}\}\subset U_{i}}$ .

Then a factorization algebra of vector spaces on ${\displaystyle M}$  is a prefactorization algebra of vector spaces on ${\displaystyle M}$  so that for every open ${\displaystyle U}$  and every Weiss cover ${\displaystyle \{U_{i}|i\in I\}}$  of ${\displaystyle U}$ , the sequence

$${\displaystyle \bigoplus _{i,j}{\mathcal {F}}(U_{i}\cap U_{j})\rightarrow \bigoplus _{k}{\mathcal {F}}(U_{k})\rightarrow {\mathcal {F}}(U)\rightarrow 0}$$

 

is exact. That is, ${\displaystyle {\mathcal {F}}}$  is a factorization algebra if it is a cosheaf with respect to the Weiss topology.

A factorization algebra is multiplicative if, in addition, for each pair of disjoint opens ${\displaystyle U,V\subset M}$ , the structure map

$${\displaystyle m_{U\sqcup V}^{U,V}:{\mathcal {F}}(U)\otimes {\mathcal {F}}(V)\rightarrow {\mathcal {F}}(U\sqcup V)}$$

 

is an isomorphism.

Algebro-geometric formulation

While this formulation is related to the one given above, the relation is not immediate.

Let ${\displaystyle X}$  be a smooth complex curve. A factorization algebra on ${\displaystyle X}$  consists of

• A quasicoherent sheaf ${\displaystyle {\mathcal {V}}_{X,I}}$  over ${\displaystyle X^{I}}$  for any finite set ${\displaystyle I}$ , with no non-zero local section supported at the union of all partial diagonals
• Functorial isomorphisms of quasicoherent sheaves ${\displaystyle \Delta _{J/I}^{*}{\mathcal {V}}_{X,J}\rightarrow {\mathcal {V}}_{X,I}}$  over ${\displaystyle X^{I}}$  for surjections ${\displaystyle J\rightarrow I}$ .
• (Factorization) Functorial isomorphisms of quasicoherent sheaves

$${\displaystyle j_{J/I}^{*}{\mathcal {V}}_{X,J}\rightarrow j_{J/I}^{*}(\boxtimes _{i\in I}{\mathcal {V}}_{X,p^{-1}(i)})}$$

 

over ${\displaystyle U^{J/I}}$ .

• (Unit) Let ${\displaystyle {\mathcal {V}}={\mathcal {V}}_{X,\{1\}}}$  and ${\displaystyle {\mathcal {V}}_{2}={\mathcal {V}}_{X,\{1,2\}}}$ . A global section (the unit) ${\displaystyle 1\in {\mathcal {V}}(X)}$  with the property that for every local section ${\displaystyle f\in {\mathcal {V}}(U)}$  (${\displaystyle U\subset X}$ ), the section ${\displaystyle 1\boxtimes f}$  of ${\displaystyle {\mathcal {V}}_{2}|_{U^{2}\Delta }}$  extends across the diagonal, and restricts to ${\displaystyle f\in {\mathcal {V}}\cong {\mathcal {V}}_{2}|_{\Delta }}$ .

Example

Associative algebra

See also: associative algebra

Any associative algebra ${\displaystyle A}$  can be realized as a prefactorization algebra ${\displaystyle A^{f}}$  on ${\displaystyle \mathbb {R} }$ . To each open interval ${\displaystyle (a,b)}$ , assign ${\displaystyle A^{f}((a,b))=A}$ . An arbitrary open is a disjoint union of countably many open intervals, ${\displaystyle U=\bigsqcup _{i}I_{i}}$ , and then set ${\displaystyle A^{f}(U)=\bigotimes _{i}A}$ . The structure maps simply come from the multiplication map on ${\displaystyle A}$ . Some care is needed for infinite tensor products, but for finitely many open intervals the picture is straightforward.

See also

• Vertex algebra

References

1. Beilinson, Alexander; Drinfeld, Vladimir (2004). Chiral algebras. Providence, R.I.: American Mathematical Society. ISBN 978-0-8218-3528-9. Retrieved 21 February 2023.
2. Costello, Kevin; Gwilliam, Owen (2017). Factorization algebras in quantum field theory, Volume 1. Cambridge. ISBN 9781316678626.