Questions tagged [d-modules]
Modules over rings of differential operators.
221
questions
2
votes
0answers
73 views
On the use of the fundamental exact sequence of K\"ahler differentials in a paper of Lyubeznik
Let $k$ be a field, $R := k[x_1, \cdots , x_n]$ the polynomial ring in $n$ indeterminates over $k$ and $f$ a nonzero element of $R$. The following paper of Lyubeznik which I have been recently reading,...
2
votes
0answers
66 views
Socle of a quotient of the ring of differential operators of a polynomial ring
I have been reading the following paper:
https://www.sciencedirect.com/science/article/pii/S002240491000263X
Proposition 2.4(ii) shows that if $\mathfrak D$ is a ring of $k$-linear differential ...
3
votes
0answers
179 views
Cohomological dimension for stacks
If $X$ is a scheme (maybe with conditions), I'm pretty sure that the ($\ell$-adic/de Rham) rational cohomology $H^*(X,\mathcal{F}$) of an $\ell$-adic sheaf/holonomic $D$-module $\mathcal{F}$ vanishes ...
5
votes
0answers
127 views
Geometric interpretation of $\mathbb{C}^{\times}$-gerbes
Let $X$ be a (nice enough, e.g. smooth etc.) variety over the complex numbers, and let $\mathcal{G}$ be a gerbe on $X$. Then $\mathcal{G}$ is classified by a cohomology class in $\alpha \in H^2(X, \...
4
votes
1answer
239 views
Symmetric powers of curves and completion along the diagonal
Given a smooth curve $C$, denote by $\text{Sym}^d(C)$ its $d$-th symmetric power. Let $\Delta$ be the diagonal subvariety which is defined as the codimension $1$ subvariety that at least two of the ...
7
votes
0answers
244 views
$K$-theory of $D$-modules
I have to admit I don't know much about topics appearing in this question, I just see very rough connections between these objects:
According to this page 23, a different $t$-structure on $D^b(\text{...
5
votes
1answer
94 views
Is analytification of regular holonomic D modules a fully faithful functor?
It seems to me that by the algebraic Riemann Hilbert functor(which factors through the analytification map) and also the analytic Riemann Hilbert functor that the (derived) category of (algebraic) ...
3
votes
1answer
160 views
Is the abelian category of pure Hodge modules semi-simple?
I am a beginner in the subject, and at the moment I am trying to understand basic properties of the main objects of the M. Saito's theory of the mixed Hodge modules in general.The question in the ...
3
votes
1answer
154 views
Is it possible that $\int |f^2(z)|^{t+1}(P\bar{P})\phi(z) dz=0$ for all compactly supported $\phi$?
When proving that the log-canonical threshold is minus the largest root of the Bernstein-Sato polynomial one considers the integral
$$\int |f^2(z)|^{t+1}(P\bar{P}(\phi(z))) dz,$$
where $P$ is a linear ...
3
votes
0answers
93 views
Are there six functors for twisted D modules?
Is there a notion of holonomic D module which admits the six functor formalism in the world of twisted D modules?
Recall that twisted D modules on $X$ are well-defined for any $T$ torsor $\tilde{X}\...
0
votes
0answers
87 views
Left $D$-modules for singular varieties?
I asked the same question on MSE but got no answer, I hope it's ok to ask it here.
In these notes one can read page $5$ "it may seem surprising, but one cannot define left $D$-modules for non-...
5
votes
0answers
126 views
BRST cohomology and vanishing cycles
Consider the $\mathbb{C}$-variety $\mathbb{A}^{1}$, equipped with the potential (ie global function) $P:=\frac{z^{n+1}}{n+1}$. We can form the twisted de Rham complex $H_{dR}(\mathbb{A}^{1},P)$ which ...
2
votes
0answers
54 views
Reference request: direct image of equivariant $\mathcal D$-modules
I'm hoping to find a detailed proof for the following well-known fact:
Given respective algebraic group actions $G_1, G_2$ on smooth varieties $X_1, X_2$ over $\mathbb C$ with an algebraic group ...
4
votes
0answers
78 views
Computing $\mathcal D$-module direct image along group action map
Say everything is over $\mathbb C$, and I have an action $act: N \times X \to X$ of an affine algebraic group $N$ on a smooth variety, say with finitely many orbits. I'm trying to compute the $\...
3
votes
0answers
51 views
Tensor product of modules over twisted differential operators
Let $R$ be an algebra over complex numbers. Let $N$ be a module over $R$. We can define the algebra $D(N)$ of differential operators $N \rightarrow N$ using Grothendieck’s approach as follows: we ...
3
votes
0answers
235 views
Absolute purity for intersection cohomology
If $i:Z\hookrightarrow X$ is a closed embedding of codimension $c$, then
$$i^*k_X\ =\ k_Z , \ \ \ i^!k_X\ \stackrel{(\star)}{=}\ k_Z[2c]$$
where $(\star)$ is true when $i$ is in addition regular.
Here ...
0
votes
1answer
165 views
Natural map from vector fields to cotangent variety
Let $X$ be a smooth variety, and let $\operatorname{Vec} (X)$ denote the $\mathcal{O}_X$-module of vector fields on $X$. It is stated in several books on D-modules, for example here in Corollary 6.6, ...
7
votes
0answers
241 views
$D(\mathcal{O}(n))$ via generators and relations
Let $V$ be a complex vector space. Consider the algebra $D(\mathbb{P}(V),\mathcal{O}(n)))$ of global differential operators from line bundle $\mathcal{O}(n)$ to itself, here $n \in \mathbb{Z}_{\...
4
votes
0answers
141 views
Quasi-unipotent monodromy for variation of Landau-Ginzburg cohomology
A pair, $(X,f)$, consisting of a smooth variety and a global function $f:X\rightarrow\mathbb{A}^{1}$ is called a Landau-Ginzburg model, LG-model for short. The LG-cohomology of the pair, dentoed $H(X,...
3
votes
0answers
53 views
Naive pushforward of D-modules and Gauss--Manin connection
Suppose that $f\colon X\to Y$ is a morphism of smooth quasi-projective varieties over a field of characteristic $0$. We then have a naive pullback functor $f^\circ:=\mathcal D_{X\to Y}\otimes_{f^{-1}\...
4
votes
0answers
74 views
$G$ invariant of $D$-module direct image of the structure sheaf under quotient map
Let $G$ be a finite group acting on $V$, a complex affine variety. Suppose $\pi:V\to V/G$ is the quotient map. $V/G$ is most likely singular, consider a map $i:V/G\hookrightarrow Y$ where $Y$ is ...
11
votes
0answers
195 views
When is cohomology of a finitely presented dg-algebra computable?
Given a smooth affine variety $X$ defined over $\mathbb{Q}$, its singular cohomology is isomorphic to the algebraic de Rham cohomology, which is the cohomology of the complex $\Omega_X^0\to\Omega_X^1\...
1
vote
0answers
82 views
Is this definition of a Fuchsian operator correct?
In Bjork, Analytic D-modules and applications, the following definition of a Fuchsian operator is given:
Here, I believe, $D(0)=\mathcal{O}$, the zeroth filtered piece of the ring of germs of ...
5
votes
1answer
438 views
What's the relationship between a $E_2$-Hochschild Cohomology module and a D-module?
Let's say for simplicity $A$ is a smooth algebra over a field $k$ ($A$ and $k$ are discrete commutative rings but from now on we are fully derived), and we will consider the $E_2$ algebra $HH^{\bullet}...
2
votes
0answers
116 views
On regular holonomic $D$-modules on the disk
Denote by $\Delta\subset \mathbb{C}$ a small neighborhood of $0$. Let $M$ be a regular holonomic $D_\Delta$ module. In Bjork, "Analytic D-modules and applications", section 5.2, it is proven ...
6
votes
0answers
120 views
Relations between $\mathcal D$-modules and Exterior Differential Systems?
As a followup of this answer, I wonder relations between $\mathcal D$-modules and Exterior Differential Systems, both of which could be used to describe systems of PDEs. If I understand correctly, $\...
12
votes
2answers
426 views
Examples of Stokes data
I'm trying to learn Stokes data but can't find an example to get my teeth into it.
Background. It's well-known that on a complex manifold $X$, there is the Riemann Hilbert equivalence
$$\text{regular ...
3
votes
0answers
86 views
Opers and global differential operators
This is a follow up question to a previous question of mine and my thought of answer to it.
Given a (compact) Riemann surface $\Sigma$, a $SL(n,\mathbb{C})$-oper is a rank $n$ holomorphic vector ...
1
vote
1answer
113 views
Cyclic vector of holomorphic vector bundle with flat connection over compact Riemann surface
I originally posted the question on math.stackexhange, but there doesn't seem to be an answer. I apalogize in advance for cross posting.
Let $E\rightarrow X$ be a holomorphic vector bundle over a ...
1
vote
0answers
97 views
Compare bounded (unbounded) derived categories of D-modules
I am reading [HTT, D-modules, Perverse Sheaf and Representation Theory]. In [HTT, 1.5.7, page 32], it is claimed that an equivalence of categories between bounded derived category with quasi-coherent ...
3
votes
0answers
81 views
The canonical morphism on the nearby cycle of a D-module
I am looking for some references of the following fact:
For a regular holonomic D-module $M$, let $V_\bullet M$ be the V-filtration wrt a smooth hypersurface $t=0$. Then the complex $\partial_t: gr^...
2
votes
0answers
106 views
Operations on perverse sheaves on disk
The category of perverse sheaves on the disk is isomorphic to the category of diagrams
$$E\substack{\substack{c\\\to}\\\substack{v\\\leftarrow}}F$$
With $E,V$ finite dimensional vector spaces, and ...
5
votes
0answers
280 views
On Grothendieck's abstract definition of differential operators
I have heard that there is the following abstract definition due to Grothendieck of differential operators on a module $M$ over a commutative associative unital algebra $A$ over a field of ...
3
votes
0answers
103 views
singular support in the singular case
For any constructible sheaf (or D-module) $\mathcal{F}$ over a smooth variety $X$ over $\mathbb{C}$, there is a notion of singular support $SS(\mathcal{F})$ that lives in the cotangent bundle $T^{*}X$ ...
12
votes
1answer
602 views
Factorization and vertex algebra cohomology
A chiral algebra on a smooth curve $X$, in the sense of Beilinson-Drinfeld, is a right $D_{X}$-module with a chiral bracket, which is a map $\mathcal{V}^{\boxtimes 2}(\infty\Delta)\rightarrow \Delta_{*...
3
votes
0answers
49 views
Is the characteristic cycle map for perverse sheaves injective?
Let $X$ be a smooth irreducible complex variety. Is the characteristic cycle map from the Grothendieck group of perverse sheaves (with complex coefficients) on $X$ to the free abelian group generated ...
1
vote
0answers
81 views
Embedding representation of fundamental group in functions on universal cover
Let $X$ be a complex manifold, $Y\rightarrow X$ the universal cover, and $\Gamma$ be the Galois group of this cover, ie the fundamental group of $X$.
Finite dimensional $\Gamma$-representations ...
5
votes
0answers
144 views
Solutions to holonomic $D$-modules: when are they square-integrable?
I want to apply the theory of $D$-modules to solve operator equations of several variables in the Bargmann space
$$\mathcal H :=\bigg\{\psi \in \mathcal O^\text{an}_{\mathbb{C}^n}\,\,\bigg|\,\,\,\...
5
votes
0answers
199 views
Can we reconstruct a regular variety from its $D$-$\mathrm{mod}$?
The famous Gabriel-Rosenberg reconstruction theorem states that the pre-additive category of quasi-coherent sheaves on a quasi-separated scheme contains enough information to recover the scheme.
One ...
6
votes
1answer
464 views
How to understand the Fourier-Sato transform and microlocalization functors?
Given a smooth real vector bundle $\pi: E \to M$ I can look at the (bounded from below) derived category of sheaves on $E$. Since $E$ admits a very natural action of $\mathbb{R}^{\geq 0}$ by scaling, ...
6
votes
1answer
173 views
Testing ideal membership in the Weyl algebra: a simple example
In Example 1.1.4 of the book Grobner Deformations of Hypergeometric Differential Equations, it is stated without proof that
$$\partial^2 \in D\cdot \langle x\partial^4, x^3\partial^2 \rangle \tag{$\...
6
votes
1answer
464 views
Category of $\mathcal{D}$-modules on a singular variety
Take $X\to V$ a closed embedding, where $X$ is not necessarily smooth, $V$ is affine and smooth. Define the category $\mathcal{C}$ of $\mathcal{D}$ modules on $X$ to be the full subcategory of $\...
2
votes
0answers
64 views
Roots of b-function and vanishing of D-modules
Let $f$ be a polynomial in $n$ variables with complex coefficient. The $b$-function (or Bernstein-Sato polynomial) is the minimal nonzero monic polynomial $b_f(s)$, such that there exists differential ...
2
votes
0answers
86 views
What is the precise relationship between projective duality and the Radon transform?
The Radon transform I am referring to is the one appearing in Brylinski's paper on projective duality, using the incidence correspondence over projective space and its dual projective space, $R p_{2*} ...
3
votes
1answer
105 views
Pullback of homogeneous twisted differential operators
Let $X,Y$ be smooth complex varieties and let $G$ be an smooth affine algebraic group acting on $X$ and $Y$ such that $X,Y$ are $G$-homogeneous spaces (the $G$ action is transitive). We also let $f:Y \...
7
votes
0answers
206 views
Proof of Kashiwara's constructibility theorem for algebraic D-modules
I am trying to understand the proof of Kashiwara's constructibility theorem for algebraic D-modules, following either the book "D-modules, Perverse sheaves, and representation theory" by Hotta, ...
4
votes
0answers
151 views
How to define a “truncated solution complex” $RHom_{D_{X,x}}(M_x,\mathcal{O}_{X,x}/\mathfrak{m}_x^k)$?
Let $M$ be a regular holonomic $D_X$ module on a smooth complex variety $X$. The comparision theorem says that
$$RHom_{D_X}(M,\mathcal{O}_X)_x\cong RHom_{D_X,x}(M_x,\hat{\mathcal{O}}_{X,x}).$$
Now ...
3
votes
0answers
58 views
Endomorphism of holonomic $D$-module has minimal polynomial
Let $M$ be a holonomic $D_n$ module, where $D_n=\mathbb{C}[x_1,\partial_1,\dots,x_n,\partial_n]$, so we work in affine space. What is the easiest way to prove that any endomorphism of $M$ has a ...
1
vote
1answer
164 views
For a holonomic $D_X$-module $M$, can $\operatorname{gr}M$ have embedded primes?
Let $M$ be a holonomic $D_X$-module. This means that the minimal primes in $\sqrt{\operatorname{Ann}(\operatorname{gr}M)}$ are $n=\dim X$ dimensional, for some (and any) good filtration on $M$. But ...
3
votes
0answers
65 views
Is there some nice “Nakayama-like” method to test whether a holonomic D module is 0?
A holonomic $D$-module is either the zero module, or one for which the characteristic variety is of the smallest possible dimension. Is there some useful trick to determine whether a holonomic $D$-...
