In algebraic geometry, a derived scheme is a homotopy-theoretic generalization of a scheme in which classical commutative rings are replaced with derived versions such as differential graded algebras, commutative simplicial rings, or commutative ring spectra.
From the functor of points point-of-view, a derived scheme is a sheaf X on the category of simplicial commutative rings which admits an open affine covering
\{Spec(Ai)\toX\}
From the locally ringed space point-of-view, a derived scheme is a pair
(X,l{O})
l{O}
(X,\pi0l{O})
\pikl{O}
\pi0l{O}
A derived stack is a stacky generalization of a derived scheme.
Over a field of characteristic zero, the theory is closely related to that of a differential graded scheme.[2] By definition, a differential graded scheme is obtained by gluing affine differential graded schemes, with respect to étale topology.[3] It was introduced by Maxim Kontsevich[4] "as the first approach to derived algebraic geometry."[5] and was developed further by Mikhail Kapranov and Ionut Ciocan-Fontanine.
Just as affine algebraic geometry is equivalent (in categorical sense) to the theory of commutative rings (commonly called commutative algebra), affine derived algebraic geometry over characteristic zero is equivalent to the theory of commutative differential graded rings. One of the main example of derived schemes comes from the derived intersection of subschemes of a scheme, giving the Koszul complex. For example, let
f1,\ldots,fk\in\Complex[x1,\ldots,xn]=R
(X,l{O}\bullet)=RSpec\left(R/(f1)
| L | |
| ⊗ | |
| R |
…
| L | |
| ⊗ | |
| R |
R/(fk)\right)
where
| op | |
| bf{RSpec}:(bf{dga} | |
| \Complex) |
\tobf{DerSch}
is the étale spectrum. Since we can construct a resolution
\begin{matrix} 0\to&R&\xrightarrow{ ⋅ fi}&R&\to0\\ &\downarrow&&\downarrow&\\ 0\to&0&\to&R/(fi)&\to0 \end{matrix}
R/(f1)
| L | |
| ⊗ | |
| R |
…
| L | |
| ⊗ | |
| R |
R/(fk)
KR(f1,\ldots,fk)
[-1,0]
\operatorname{Proj}\left(
| \Z[x0,\ldots,xn] | |
| (f1,\ldots,fk) |
\right)
where
\deg(fi)=di
(Pn,
| \bullet,(f | |
| l{E} | |
| 1,\ldots, |
fk))
l{E}\bullet=[l{O}(-d1) ⊕ … ⊕ l{O}(-dk)\xrightarrow{( ⋅ f1,\ldots, ⋅ fk)}l{O}]
with amplitude
[-1,0]
Let
(A\bullet,d)
0
A\bullet
(R\bullet,dR)
R\bullet
A\bullet
A\bullet[\{xi\}i]
\varnothing=I0\subseteqI1\subseteq …
I
\cupnIn=I
s(xi)\inA\bullet[\{xj\}
| j\inIn |
]
xi\inIn+1
A\bullet
(A\bullet,d)
(A\bullet,d)
(B\bullet,dB)
(R\bullet,dR)\to(B\bullet,dB)
| L | |
| B\bullet/A\bullet |
:=
| \Omega | |
| R\bullet/A\bullet |
| ⊗ | |
| R\bullet |
B\bullet
Many examples can be constructed by taking the algebra
B
R
(B\bullet,0)
B\bullet
The cotangent complex of a hypersurface
X=V(f)\subset
| n | |
| A | |
| \Complex |
KR(f)
X
0\toR ⋅ ds\xrightarrow{\Phi}oplusiR ⋅ dxi\to0
where
\Phi(gds)=g ⋅ df
d
R\bullet=
| \Complex[x1,\ldots,xn] | |
| (f1) |
| L | |
| ⊗ | |
| \Complex[x1,\ldots,xn] |
…
| L | |
| ⊗ | |
| \Complex[x1,\ldots,xn] |
| \Complex[x1,\ldots,xn] | |
| (fk) |
is quasi-isomorphic to the complex
| \Complex[x1,\ldots,xn] | |
| (f1,\ldots,fk) |
[+0].
This implies we can construct the cotangent complex of the derived ring
R\bullet
fi
Please note that the cotangent complex in the context of derived geometry differs from the cotangent complex of classical schemes. Namely, if there was a singularity in the hypersurface defined by
f
Given a polynomial function
f:An\toAm,
\begin{matrix} Z&\to&An\\ \downarrow&&\downarrowf\\ \{pt\}&\xrightarrow{0}&Am \end{matrix}
where the bottom arrow is the inclusion of a point at the origin. Then, the derived scheme
Z
x\inZ
Tx=
| n | |
| T | |
| xA |
\xrightarrow{dfx}
| m | |
| T | |
| 0A |
where the complex is of amplitude
[-1,0]
H0
H-1
x\inZ
Given a stack
[X/G]
Tx=ak{g}x\toTxX
If the morphism is not injective, the
H-1
G
ak{g}[+1]
Derived schemes can be used for analyzing topological properties of affine varieties. For example, consider a smooth affine variety
M\subsetAn
f:M\to\Complex
\OmegaM
\begin{cases}\Gammadf:M\to\OmegaM\ x\mapsto(x,df(x))\end{cases}
Then, we can take the derived pullback diagram
\begin{matrix} X&\to&M\\ \downarrow&&\downarrow0\\ M&\xrightarrow{\Gammadf
where
0
f
Consider the affine variety
M=\operatorname{Spec}(\Complex[x,y])
and the regular function given by
f(x,y)=x2+y3
\Gammadf(a,b)=(a,b,2a,3b2)
where we treat the last two coordinates as
dx,dy
| bf{RSpec}\left( | \Complex[x,y,dx,dy] |
| (dx,dy) |
| L | |
| ⊗ | |
| \Complex[x,y,dx,dy] |
| \Complex[x,y,dx,dy] | |
| (2x-dx,3y2-dy) |
\right)
Note that since the left term in the derived intersection is a complete intersection, we can compute a complex representing the derived ring as
| \bullet(\Complex | |
| K | |
| dx,dy |
[x,y,dx,dy]) ⊗ \Complex
| \Complex[x,y,dx,dy] | |
| (2-dx,3y2-dy) |
where
| \bullet(\Complex | |
| K | |
| dx,dy |
[x,y,dx,dy])
Consider a smooth function
f:M\to\Complex
M
\operatorname{Crit}(f)
(M,l{A}\bullet,Q)
l{A}-i=\wedgeiTM
and the differential
Q
df
For example, if
\begin{cases}f:\Complex2\to\Complex\ f(x,y)=x2+y3\end{cases}
we have the complex
R ⋅ \partialx\wedge\partialy\xrightarrow{2xdx+3y2dy}R ⋅ \partialx ⊕ R ⋅ \partialy\xrightarrow{2xdx+3y2dy}R
representing the derived enhancement of
\operatorname{Crit}(f)
Einfty