Notes 07/08/2013

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

Last update: 7 August 2013

$D -modules$

The Weyl algebra is the algebra $𝒟$ with generators $x_{1}, \dots, x_{n},$ $y_{1}, \dots, y_{n}$ and relations

x_{i} x_{j} = x_{j} x_{i}, y_{i} y_{j} = y_{j} y_{i} and [y_{j}, x_{i}] = δ_{i j} .

i.e. $[x_{i}, x_{j}] = 0,$ $[y_{i}, y_{j}] = 0$ and $y_{j} x_{i} - x_{i} y_{j} = δ_{i j} .$

Often we write $\partial_{j}$ instead of $y_{j}$ since

\frac{\partial}{\partial x_{j}} x_{i} f - x_{i} \frac{\partial}{\partial x_{j}} f = \partial_{i j} f + x_{i} \frac{\partial f}{\partial x_{j}} - x_{i} \frac{\partial}{\partial x_{j}} f = δ_{i j} f .

If $𝒪_{X} = ℂ [x_{1}, \dots, x_{n}]$ then elements of $𝒟_{X}$ are

\sum_{a \in ℤ_{\geq 0}^{n}} c_{a} {(\frac{\partial}{\partial x_{1}})}^{a_{1}} \dots {(\frac{\partial}{\partial x_{n}})}^{a_{n}}, with c_{a} \in 𝒪_{X} .

The Bernstein filtration is $ℬ_{0} \subseteq ℬ_{1} \subseteq \dots \subseteq 𝒟$ with

ℬ_{j} = span {x^{a} \partial^{b} with | a | + | b | \leq j} .

The standard filtration is $Σ_{0} \subseteq Σ_{1} \subseteq \dots \subseteq 𝒟$ with

Σ_{j} = 𝒪_{X} -span {\partial^{b} with | b | \leq j} .

Then

gr 𝒟 = ⨁_{j \in ℤ_{\geq 0}} \frac{ℱ_{j}}{ℱ_{j - 1}} = ℂ [x_{1}, \dots, x_{n}, y_{1}, \dots, y_{n}] .

Let $M$ be a $𝒟 -module.$

A filtration of $M$ is $M_{0} \subseteq M_{1} \subseteq \dots \subseteq M$ with $⋃ M_{j} = M$ and

(a)	$ℱ_{i} M_{j} \subseteq M_{i + j}$
(b)	$M_{j}$ is a finitely generated $ℱ_{0} -module.$

Then

gr M is a gr 𝒟 -module.

A good filtration is a filtration of $M$ such that $gr M$ is a finitely generated $gr 𝒟 -module.$

This happens if and only if there exists a $j_{0}$ with $ℱ_{i} M_{j} = M_{i + j}$ for $j \geq j_{0}, i \geq 0 .$

\begin{matrix} {Ann}_{gr 𝒟} (gr M) = {p \in gr 𝒟 | p m = 0 for all m \in gr M}, \\ \sqrt{{Ann}_{gr 𝒟} (gr M)} = {p \in gr 𝒟 | p^{n} \in {Ann}_{gr 𝒟} (gr M) for some n \in ℤ_{> 0}} . \end{matrix}

The characteristic variety of $M$ is

\begin{matrix} ch M & = & {(v_{1}, \dots, v_{2 n}) \in ℂ^{2 n} | p (v_{1}, \dots, v_{2 n}) = 0 for all p \in \sqrt{{Ann}_{gr 𝒟} (gr M)}} \\ = & zero set of \sqrt{{Ann}_{gr 𝒟} (gr M)} . \end{matrix}

Let $X$ be a space

	$𝒪_{X}$ the sheaf of functions on $X$
	$𝒟_{X}$ the sheaf of $𝒪_{X} -coefficient$ differential operators on $X .$

In local coordinates, sections of $𝒟_{X}$ are

\sum_{a \in ℤ_{\geq 0}^{n}} c_{a} {(\frac{\partial}{\partial x_{1}})}^{a_{1}} \dots {(\frac{\partial}{\partial x_{n}})}^{a_{n}}, with c_{a} \in 𝒪_{X} .

A $𝒟_{X} -module$ $M$ is equivalent to a connection $\nabla : M \to M \otimes_{𝒪_{X}} Ω^{1} (X)$ on $M$ via the formula

\nabla (m) = \sum_{i = 1}^{n} \frac{\partial}{\partial x_{i}} m \otimes d x_{i} .

The center of $𝒟_{X}$ is

Z (𝒟_{X}) = ℂ_{X}, the constant sheaf on X .

The functors

\begin{matrix} {Hom}_{𝒟_{X}} (-, 𝒪_{X}) : Mod (𝒟_{X}) ⟶ Mod (𝒪_{X}) \\ {Hom}_{𝒟_{X}} (𝒪_{X}, -) : Mod (𝒟_{X}) ⟶ Mod (𝒪_{X}) \end{matrix}

have derived functors

\begin{matrix} ℛ {Hom}_{𝒟_{X}} (-, 𝒪_{X}) : 𝒟^{+} (𝒟_{X}) ⟶ 𝒟^{+} (ℂ_{X}) \\ ℛ {Hom}_{𝒟_{X}} (𝒪_{X}, -) : 𝒟^{+} (𝒟_{X}) ⟶ 𝒟^{+} (ℂ_{X}) . \end{matrix}

If $M$ is a $𝒟_{X} -module$ then

\begin{matrix} DR (M) = ℛ {Hom}_{𝒟_{X}} (𝒪_{X}, M) = (0 \to M \overset{\nabla}{\to} M \otimes_{𝒪_{X}} Ω^{1} (X) \overset{\nabla}{\to} M \otimes_{𝒪_{X}} Ω^{2} (X) \to \dots) \\ with \nabla (m \otimes w) = \nabla m \land w - {(- 1)}^{deg w} m \land d w, \end{matrix}

is the de Rham complex of $M .$

The complex of holomorphic solutions of $M$ is

Sol (M) = ℛ {Hom}_{𝒟_{X}} (M, 𝒪_{X}) .

This is a typed copy of handwritten notes by Arun Ram.