Mixed Hodge module explained

(M,F^\bullet)

l{F}

such that the functor from the Riemann–Hilbert correspondence sends

(M,F^\bullet)

l{F}

. This makes it possible to construct a Hodge structure on intersection cohomology, one of the key problems when the subject was discovered. This was solved by Morihiko Saito who found a way to use the filtration on a coherent D-module as an analogue of the Hodge filtration for a Hodge structure.^[1] This made it possible to give a Hodge structure on an intersection cohomology sheaf, the simple objects in the Abelian category of perverse sheaves.

Abstract structure

Before going into the nitty gritty details of defining Mixed hodge modules, which is quite elaborate, it is useful to get a sense of what the category of Mixed Hodge modules actually provides. Given a complex algebraic variety

there is an abelian category

bf{MHM}(X)

^[2] ^{pg 339} with the following functorial properties

	bbf{MHM}(X)\to
rat
	X:D

	b
D
	cs

(X;Q)

called the rationalization functor. This gives the underlying rational perverse sheaf of a mixed Hodge module.

There is a faithful functor

	bbf{MHM}(X)\to
Dmod
	X:D

	b
D
	coh

(l{D}_X)

sending a mixed Hodge module to its underlying D-module

These functors behave well with respect to the Riemann-Hilbert correspondence

	b
DR
	Coh

(l{D}_X)\to

	b
D
	cs

(X;C)

, meaning for every mixed Hodge module

there is an isomorphism

\alpha:rat_{X(M) ⊗}C\xrightarrow{\sim}DR_X(Dmod_X(M))

In addition, there are the following categorical properties

The category of mixed Hodge modules over a point is isomorphic to the category of Mixed hodge structures,

bf{MHM}(\{pt\})\congMHS

Every object

bf{MHM}(X)

admits a weight filtration

such that every morphism in

bf{MHM}(X)

preserves the weight filtration strictly, the associated graded objects

	W(M)
Gr
	k

are semi-simple, and in the category of mixed Hodge modules over a point, this corresponds to the weight filtration of a Mixed hodge structure.

D_X

lifting the Verdier dualizing functor in

	b
D
	cs

(X;Q)

which is an involution on

bf{MHM}(X)

For a morphism

f:X\toY

of algebraic varieties, the associated six functors on

D^bbf{MHM}(X)

and

D^bbf{MHM}(Y)

have the following properties

	*
f
	!,f

don't increase the weights of a complex

M^\bullet

of mixed Hodge modules.

	!,f
f
	*

don't decrease the weights of a complex

M^\bullet

of mixed Hodge modules.

Relation between derived categories

The derived category of mixed Hodge modules

D^bbf{MHM}(X)

is intimately related to the derived category of constructuctible sheaves

	b
D
	cs

(X;Q)\congD^b(Perv(X;Q))

equivalent to the derived category of perverse sheaves. This is because of how the rationalization functor is compatible with the cohomology functor

H^k

of a complex

M^\bullet

of mixed Hodge modules. When taking the rationalization, there is an isomorphism

k(M
rat
X(H

^\bullet))=^pH

\bullet))
X(M

for the middle perversity

. Note^{pg 310} this is the function

p:2N\toZ

sending

p(2k)=-k

, which differs from the case of pseudomanifolds where the perversity is a function

p:[2,n]\toZ_\geq

where

p(2k)=p(2k-1)=k-1

. Recall this is defined as taking the composition of perverse truncations with the shift functor, so^{pg 341}

^pH

\bullet))
X(M

= ^p\tau_\leq^p\tau_\geq

\bullet)[+k])
(rat
X(M

This kind of setup is also reflected in the derived push and pull functors

	*,f
f
	!,f

	!,f

	*

and with nearby and vanishing cycles

\psi_f,\phi_f

, the rationalization functor takes these to their analogous perverse functors on the derived category of perverse sheaves.

Tate modules and cohomology

Here we denote the canonical projection to a point by

p:X\to\{pt\}

. One of the first mixed Hodge modules available is the weight 0 Tate object, denoted

\underline{Q

}_X^ which is defined as the pullback of its corresponding object in

Q^Hdg\inbf{MHM}(\{pt\})

, so

\underline{Q

}_X^ = p^*\mathbb^

It has weight zero, so

Q^Hdg

corresponds to the weight 0 Tate object

Q(0)

in the category of mixed Hodge structures. This object is useful because it can be used to compute the various cohomologies of

through the six functor formalism and give them a mixed Hodge structure. These can be summarized with the table

\begin{matrix} H^k(X;Q)&=H^k(\{pt\},

*Q
p
*p

^Hdg)

k
\\ H
c(X;Q)

&=H^k(\{pt\},

*Q
p
!p

^Hdg)\\ H_-k(X;Q)&=H^k(\{pt\},

!Q
p
!p

^Hdg)

BM
\\ H
-k

(X;Q)&=H^k(\{pt\},

*Q
p
!p

^Hdg) \end{matrix}

Moreover, given a closed embedding

i:Z\toX

there is the local cohomology group

k
H
Z(X;Q)

=H^k(\{pt\},p_*i

!\underline{Q
*i

}_X^)

Variations of Mixed Hodge structures

For a morphism of varieties

f:X\toY

the pushforward maps

f_{*\underline{Q}

}^_X and

f_{!\underline{Q}

}^_X give degenerating variations of mixed Hodge structures on

. In order to better understand these variations, the decomposition theorem and intersection cohomology are required.

Intersection cohomology

One of the defining features of the category of mixed Hodge modules is the fact intersection cohomology can be phrased in its language. This makes it possible to use the decomposition theorem for maps

f:X\toY

of varieties. To define the intersection complex, let

j:U\hookrightarrowX

be the open smooth part of a variety

. Then the intersection complex of

can be defined as

\bulletQ
IC
X

^Hdg:=j_!*\underline{Q

}_U^[d_X]

where

j_!*(\underline{Q

}_U^) = \operatorname[j_!(\underline{\mathbb{Q}}_U^{Hdg}) \to j_*(\underline{\mathbb{Q}}_U^{Hdg})]

as with perverse sheaves^{pg 311}. In particular, this setup can be used to show the intersection cohomology groups

IH^k(X)=

\bullet\underline{Q
H
*IC

}_X)

have a pure weight

Hodge structure.

References

Web site: Hodge structure via filtered $\mathcal$-modules. 2020-08-16. www.numdam.org.
Book: Peters, C. (Chris). Mixed Hodge Structures. 2008. Springer Berlin Heidelberg. 978-3-540-77017-6. 1120392435.

A young person's guide to mixed Hodge modules

Mixed Hodge module explained

Abstract structure

Relation between derived categories

Tate modules and cohomology

Variations of Mixed Hodge structures

Intersection cohomology

See also

References