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| \input{preamble} | |
| % OK, start here. | |
| % | |
| \begin{document} | |
| \title{A Guide to the Literature} | |
| \maketitle | |
| \phantomsection | |
| \label{section-phantom} | |
| \tableofcontents | |
| \section{Short introductory articles} | |
| \label{section-short-introductions} | |
| \begin{itemize} | |
| \item Barbara Fantechi: \emph{Stacks for Everybody} \cite{fantechi_stacks} | |
| \item Dan Edidin: \emph{What is a stack?} \cite{edidin_whatis} | |
| \item Dan Edidin: \emph{Notes on the construction of the moduli space of | |
| curves} \cite{edidin_notes} | |
| \item Angelo Vistoli: \emph{Intersection theory on algebraic | |
| stacks and on their moduli spaces}, and especially the appendix. | |
| \cite{vistoli_intersection} | |
| \end{itemize} | |
| \section{Classic references} | |
| \label{section-classics} | |
| \begin{itemize} | |
| \item Mumford: \emph{Picard groups of moduli problems} | |
| \cite{mumford_picard} | |
| \begin{quote} | |
| Mumford never uses the term ``stack'' here but the | |
| concept is implicit in the paper; he computes the picard group of the moduli | |
| stack of elliptic curves. | |
| \end{quote} | |
| \item Deligne, Mumford: \emph{The irreducibility of the space of curves of | |
| given genus} \cite{DM} | |
| \begin{quote} | |
| This influential paper introduces ``algebraic stacks'' in the | |
| sense which are now universally called Deligne-Mumford stacks (stacks with | |
| representable diagonal which admit \'etale presentations by schemes). There | |
| are many foundational results \emph{without proof}. The paper uses stacks to | |
| give two proofs of the irreducibility of the moduli space of curves of genus | |
| $g$. | |
| \end{quote} | |
| \item Artin: \emph{Versal deformations and algebraic stacks} | |
| \cite{ArtinVersal} | |
| \begin{quote} | |
| This paper introduces ``algebraic stacks'' which generalize Deligne-Mumford | |
| stacks and are now commonly referred to as \emph{Artin stacks}, stacks with | |
| representable diagonal which admit smooth presentations by schemes. | |
| This paper gives deformation-theoretic criterion known as Artin's criterion | |
| which allows one to prove that a given moduli stack is an Artin stack without | |
| explicitly exhibiting a presentation. | |
| \end{quote} | |
| \end{itemize} | |
| \section{Books and online notes} | |
| \label{section-books} | |
| \begin{itemize} | |
| \item Laumon, Moret-Bailly: \emph{Champs Alg\'ebriques} \cite{LM-B} | |
| \begin{quote} | |
| This book is currently the most exhaustive reference on stacks containing | |
| many foundational results. It assumes the reader is familiar with algebraic | |
| spaces and frequently references Knutson's book \cite{Kn}. There is an | |
| error in chapter 12 concerning the functoriality of the lisse-\'etale site of | |
| an algebraic stack. One doesn't need to worry about this as the error has been | |
| patched by Martin Olsson (see \cite{olsson_sheaves}) and the results in the | |
| remaining chapters (after perhaps slight modification) are correct. | |
| \end{quote} | |
| \item The Stacks Project Authors: \emph{Stacks Project} | |
| \cite{stacks-project}. | |
| \begin{quote} | |
| You are reading it! | |
| \end{quote} | |
| \item Anton Geraschenko: | |
| \emph{Lecture notes for Martin Olsson's class on stacks} \cite{olsson_stacks} | |
| \begin{quote} | |
| This course systematically develops the theory of algebraic | |
| spaces before introducing algebraic stacks (first defined in Lecture 27!). In | |
| addition to basic properties, the course covers the equivalence between being | |
| Deligne-Mumford and having unramified diagonal, the lisse-\'etale site on an | |
| Artin stack, the theory of quasi-coherent sheaves, the Keel-Mori theorem, | |
| cohomological descent, and gerbes (and their relation to the Brauer group). | |
| There are also some exercises. | |
| \end{quote} | |
| \item | |
| Behrend, Conrad, Edidin, Fantechi, Fulton, G\"ottsche, and Kresch: | |
| \emph{Algebraic stacks}, online notes for a book being currently written | |
| \cite{stacks_book} | |
| \begin{quote} | |
| The aim of this book is to give a friendly introduction to stacks without | |
| assuming a sophisticated background with a focus on examples and applications. | |
| Unlike \cite{LM-B}, it is not assumed that the reader has digested the theory of | |
| algebraic spaces. Instead, Deligne-Mumford stacks are introduced with | |
| algebraic spaces being a special case with part of the goal being to develop | |
| enough theory to prove the assertions in \cite{DM}. The general | |
| theory of Artin stacks is to be developed in the second part. Only a fraction | |
| of the book is now available on Kresch's website. | |
| \end{quote} | |
| \item Olsson, Martin: \emph{Algebraic spaces and stacks}, \cite{olsson_book} | |
| \begin{quote} | |
| Highly recommended introduction to algebraic spaces and algebraic stacks | |
| starting at the level of somebody who has mastered Hartshorne's book | |
| on algebraic geometry. | |
| \end{quote} | |
| \end{itemize} | |
| \section{Related references on foundations of stacks} | |
| \label{section-related} | |
| \begin{itemize} | |
| \item Vistoli: | |
| \emph{Notes on Grothendieck topologies, fibered categories and descent theory} | |
| \cite{vistoli_fga} | |
| \begin{quote} | |
| Contains useful facts on fibered categories, stacks and descent theory in the | |
| fpqc topology as well as rigorous proofs. | |
| \end{quote} | |
| \item Knutson: \emph{Algebraic Spaces} \cite{Kn} | |
| \begin{quote} | |
| This book, which evolved from his PhD thesis under Michael Artin, | |
| contains the foundations of the theory of algebraic spaces. The book | |
| \cite{LM-B} frequently references this text. See also Artin's papers on | |
| algebraic spaces: \cite{Artin-Algebraic-Approximation}, | |
| \cite{ArtinI}, \cite{Artin-Implicit-Function}, | |
| \cite{ArtinII}, \cite{Artin-Construction-Techniques}, | |
| \cite{Artin-Algebraic-Spaces}, \cite{Artin-Theorem-Representability}, and | |
| \cite{ArtinVersal} | |
| \end{quote} | |
| \item Grothendieck et al, \emph{Th\'eorie des Topos et Cohomologie \'Etale des | |
| Sch\'emas I, II, III} also known as SGA4 \cite{SGA4} | |
| \begin{quote} | |
| Volume 1 contains many general facts on universes, sites and fibered | |
| categories. The word ``champ'' (French for ``stack'') appears in | |
| Deligne's Expos\'e XVIII. | |
| \end{quote} | |
| \item Jean Giraud: \emph{Cohomologie non ab\'elienne} \cite{giraud} | |
| \begin{quote} | |
| The book discusses fibered categories, stacks, torsors and gerbes over general | |
| sites but does not discuss algebraic stacks. For instance, if $G$ is a sheaf | |
| of abelian groups on $X$, then in the same way $H^1(X, G)$ can be identified | |
| with $G$-torsors, $H^2(X, G)$ can be identified with an appropriately defined | |
| set of $G$-gerbes. When $G$ is not abelian, then $H^2(X, G)$ is defined as the | |
| set of $G$-gerbes. | |
| \end{quote} | |
| \item Kelly and Street: \emph{Review of the elements of 2-categories} | |
| \cite{kelly-street} | |
| \begin{quote} | |
| The category of stacks form a 2-category although a simple type of 2-category | |
| where are 2-morphisms are invertible. This is a reference on general | |
| 2-categories. I have never used this so I cannot say how useful it is. Also | |
| note that \cite{stacks-project} contains some basics on 2-categories. | |
| \end{quote} | |
| \end{itemize} | |
| \section{Papers in the literature} | |
| \label{section-papers} | |
| \noindent | |
| Below is a list of research papers which contain fundamental results on stacks | |
| and algebraic spaces. The intention of the summaries is to indicate only the | |
| results of the paper which contribute toward stack theory; in many cases these | |
| results are subsidiary to the main goals of the paper. We divide the papers | |
| into categories with some papers falling into multiple categories. | |
| \subsection{Deformation theory and algebraic stacks} | |
| \label{subsection-deformation-theory} | |
| \noindent | |
| The first three papers by Artin do not contain anything on stacks but they | |
| contain powerful results with the first two papers being essential for | |
| \cite{ArtinVersal}. | |
| \begin{itemize} | |
| \item Artin: \emph{Algebraic approximation of structures over | |
| complete local rings} \cite{Artin-Algebraic-Approximation} | |
| \begin{quote} | |
| It is proved that under mild hypotheses any effective formal deformation can be | |
| approximated: if $F: (\Sch/S) \to (\textit{Sets})$ | |
| is a contravariant functor | |
| locally of finite presentation with $S$ finite type over a field or excellent | |
| DVR, $s \in S$, and $\hat{\xi} \in F(\hat{\mathcal{O}}_{S, s})$ is an effective | |
| formal | |
| deformation, then for any $n > 0$, there exists an residually trivial \'etale | |
| neighborhood $(S', s') \to (S, s)$ and $\xi' \in F(S')$ such that $\xi'$ and | |
| $\hat{\xi}$ agree up to order $n$ (ie. have the same restriction in | |
| $F(\mathcal{O}_{S, s} / \mathfrak m^n)$). | |
| \end{quote} | |
| \item | |
| Artin: \emph{Algebraization of formal moduli I} \cite{ArtinI} | |
| \begin{quote} | |
| It is proved that under mild hypotheses any effective formal versal deformation | |
| is algebraizable. Let $F: (\Sch/S) \to (\textit{Sets})$ be a | |
| contravariant functor | |
| locally of finite presentation with $S$ finite type over a field or excellent | |
| DVR, $s \in S$ be a locally closed point, $\hat A$ be a complete Noetherian | |
| local $\mathcal{O}_S$-algebra with residue field $k'$ a finite extension of | |
| $k(s)$, | |
| and $\hat{\xi} \in F(\hat A)$ be an effective formal versal deformation of an | |
| element $\xi_0 \in F(k')$. Then there is a scheme $X$ finite type over $S$ and | |
| a closed point $x \in X$ with residue field $k(x) = k'$ and an element $\xi \in | |
| F(X)$ such that there is an isomorphism $\hat{\mathcal{O}}_{X, x} \cong \hat{A}$ | |
| identifying the restrictions of $\xi$ and $\hat{\xi}$ in each $F(\hat A / | |
| \mathfrak m^n)$. The algebraization is unique if $\hat{\xi}$ is a universal | |
| deformation. Applications are given to the representability of the Hilbert | |
| and Picard schemes. | |
| \end{quote} | |
| \item Artin: \emph{Algebraization of formal moduli. II} | |
| \cite{ArtinII} | |
| \begin{quote} | |
| Vaguely, it is shown that if one can contract a closed subset $Y' \subset X'$ | |
| formally locally around $Y'$, then exists a global morphism $X' \to X$ | |
| contracting $Y$ with $X$ an algebraic space. | |
| \end{quote} | |
| \item | |
| Artin: \emph{Versal deformations and algebraic stacks} \cite{ArtinVersal} | |
| \begin{quote} | |
| This momentous paper builds on his work in | |
| \cite{Artin-Algebraic-Approximation} and \cite{ArtinI}. This paper | |
| introduces Artin's criterion which allows one to prove algebraicity of a | |
| stack by verifying deformation-theoretic properties. More precisely (but | |
| not very precisely), Artin constructs a presentation of a limit preserving | |
| stack $\mathcal{X}$ | |
| locally around a point $x \in \mathcal{X}(k)$ as follows: assuming the stack | |
| $\mathcal{X}$ | |
| satisfies Schlessinger's criterion(\cite{Sch}), there exists a formal | |
| versal deformation | |
| $\hat{\xi} \in \lim \mathcal{X}(\hat A / \mathfrak m^n)$ of | |
| $x$. Assuming that formal deformations are effective (i.e., | |
| $\mathcal{X}(\hat{A}) \to \lim \mathcal{X}(\hat A / \mathfrak m^n)$ | |
| is bijective), then one obtains an effective formal versal | |
| deformation $\xi \in \mathcal{X}(\hat A)$. Using results in | |
| \cite{ArtinI}, one produces a finite type scheme $U$ and an | |
| element $\xi_U: U \to \mathcal{X}$ which is formally versal at a point | |
| $u \in U$ over $x$. Then if we assume $\mathcal{X}$ admits a deformation | |
| and obstruction theory | |
| satisfying certain conditions (ie. compatibility with \'etale localization and | |
| completion as well as constructibility condition), then it is shown in section | |
| 4 that formal versality is an open condition so that after shrinking $U$, $U | |
| \to \mathcal{X}$ is smooth. | |
| Artin also presents a proof that any stack admitting an fppf presentation by | |
| a scheme admits a smooth presentation by a scheme so that in particular | |
| one can form quotient stacks by flat, separated, finitely presented group | |
| schemes. | |
| \end{quote} | |
| \item Conrad, de Jong: \emph{Approximation of Versal Deformations} | |
| \cite{conrad-dejong} | |
| \begin{quote} | |
| This paper offers an approach to Artin's algebraization result by applying | |
| Popescu's powerful result: if $A$ is a Noetherian ring and $B$ a Noetherian | |
| $A$-algebra, then the map $A \to B$ is a regular morphism if and only if $B$ | |
| is a direct limit of smooth $A$-algebras. It is not hard to see that Popescu's | |
| result implies Artin's approximation over an arbitrary excellent scheme (the | |
| excellence hypothesis implies that for a local ring $A$, the map | |
| $A^{\text{h}} \to \hat A$ from the henselization to the completion is regular). | |
| The paper uses Popescu's result to give a ``groupoid'' generalization of the | |
| main theorem in \cite{ArtinI} which is valid over arbitrary | |
| excellent base schemes and for arbitrary points $s \in S$. | |
| In particular, the results in \cite{ArtinVersal} hold under an arbitrary | |
| excellent base. They discuss the \'etale-local uniqueness of the | |
| algebraization and whether the automorphism group of the object acts naturally | |
| on the henselization of the algebraization. | |
| \end{quote} | |
| \item Jason Starr: \emph{Artin's axioms, composition, and moduli spaces} | |
| \cite{starr_artin} | |
| \begin{quote} | |
| The paper establishes that Artin's axioms for algebraization are compatible | |
| with the composition of 1-morphisms. | |
| \end{quote} | |
| \item Martin Olsson: \emph{Deformation theory of representable | |
| morphism of algebraic stacks} \cite{olsson_deformation} | |
| \begin{quote} | |
| This generalizes standard deformation theory results for morphisms of schemes | |
| to representable morphisms of algebraic stacks in terms of the cotangent | |
| complex. These results cannot be viewed as consequences of Illusie's general | |
| theory as the cotangent complex of a representable morphism $X \to \mathcal{X}$ | |
| is not | |
| defined in terms of cotangent complex of a morphism of ringed topoi (because | |
| the lisse-\'etale site is not functorial). | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Coarse moduli spaces} | |
| \label{subsection-coarse-moduli-spaces} | |
| \noindent | |
| Papers discussing coarse moduli spaces. | |
| \begin{itemize} | |
| \item Keel, Mori: \emph{Quotients in Groupoids} \cite{K-M} | |
| \begin{quote} | |
| It had apparently long been ``folklore'' that separated Deligne-Mumford stacks | |
| admitted coarse moduli spaces. A rigorous (although terse) proof of the | |
| following theorem is presented here: if $\mathcal{X}$ is an Artin stack | |
| locally of | |
| finite type over a Noetherian base scheme such that the inertia stack | |
| $I_\mathcal{X} \to \mathcal{X}$ is finite, then there exists a coarse | |
| moduli space $\phi : \mathcal{X} \to Y$ | |
| with $\phi$ separated and $Y$ an algebraic space locally of finite type over | |
| $S$. The hypothesis that the inertia is finite is precisely the right | |
| condition: there exists a coarse moduli space $\phi : \mathcal{X} \to Y$ with | |
| $\phi$ | |
| separated if and only if the inertia is finite. | |
| \end{quote} | |
| \item Conrad: \emph{The Keel-Mori Theorem via Stacks} \cite{conrad} | |
| \begin{quote} | |
| Keel and Mori's paper \cite{K-M} is written in the groupoid language and | |
| some find it challenging to grasp. Brian Conrad presents a stack-theoretic | |
| version of the proof which is quite transparent although it uses the | |
| sophisticated language of stacks. Conrad also removes the Noetherian | |
| hypothesis. | |
| \end{quote} | |
| \item Rydh: \emph{Existence of quotients by finite groups and coarse moduli | |
| spaces} \cite{rydh_quotients} | |
| \begin{quote} | |
| Rydh removes the hypothesis from \cite{K-M} and \cite{conrad} that | |
| $\mathcal{X}$ | |
| be finitely presented over some base. | |
| \end{quote} | |
| \item | |
| Abramovich, Olsson, Vistoli: \emph{Tame stacks in positive characteristic} | |
| \cite{tame} | |
| \begin{quote} | |
| They define a \emph{tame Artin stack} as an Artin stack with finite inertia | |
| such that if $\phi : \mathcal{X} \to Y$ is the coarse moduli space, | |
| $\phi_*$ is exact | |
| on quasi-coherent sheaves. They prove that for an Artin stack with finite | |
| inertia, the following are equivalent: $\mathcal{X}$ is tame if and only | |
| if the stabilizers of $\mathcal{X}$ are linearly reductive | |
| if and only if $\mathcal{X}$ is \'etale locally on the coarse | |
| moduli space a quotient of an affine scheme by a linearly reductive group | |
| scheme. For a tame Artin stack, the coarse moduli space is particularly nice. | |
| For instance, the coarse moduli space commutes with arbitrary base change while | |
| a general coarse moduli space for an Artin stack with finite inertia will only | |
| commute with flat base change. | |
| \end{quote} | |
| \item Alper: \emph{Good moduli spaces for Artin stacks} \cite{alper_good} | |
| \begin{quote} | |
| For general Artin stacks with infinite affine stabilizer groups (which are | |
| necessarily non-separated), coarse moduli spaces often do not exist. The | |
| simplest example is $[\mathbf{A}^1 / \mathbf{G}_m]$. It is defined here that a | |
| quasi-compact | |
| morphism $\phi : \mathcal{X} \to Y$ is a \emph{good moduli space} if | |
| $\mathcal{O}_Y \to \phi_* | |
| \mathcal{O}_\mathcal{X}$ is an isomorphism and $\phi_*$ is exact on | |
| quasi-coherent sheaves. | |
| This notion generalizes a tame Artin stack in \cite{tame} as well as | |
| encapsulates Mumford's geometric invariant theory: if $G$ is a reductive group | |
| acting linearly on $X \subset \mathbf{P}^n$, then the morphism from the | |
| quotient | |
| stack of the semi-stable locus to the GIT quotient $[X^{ss}/G] \to X//G$ is a | |
| good moduli space. The notion of a good moduli space has many nice geometric | |
| properties: (1) $\phi$ is surjective, universally closed, and universally | |
| submersive, (2) $\phi$ identifies points in $Y$ with points in $\mathcal{X}$ up | |
| to | |
| closure equivalence, (3) $\phi$ is universal for maps to algebraic spaces, (4) | |
| good moduli spaces are stable under arbitrary base change, and (5) a vector | |
| bundle on an Artin stack descends to the good moduli space if and only if the | |
| representations are trivial at closed points. | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Intersection theory} | |
| \label{subsection-intersection-theory} | |
| \noindent | |
| Papers discussing intersection theory on algebraic stacks. | |
| \begin{itemize} | |
| \item | |
| Vistoli: \emph{Intersection theory on algebraic stacks and on their moduli | |
| spaces} \cite{vistoli_intersection} | |
| \begin{quote} | |
| This paper develops the foundations for intersection theory with rational | |
| coefficients for Deligne-Mumford stacks. If $\mathcal{X}$ is a separated | |
| Deligne-Mumford stack, the chow group $\CH_*(\mathcal{X})$ with rational | |
| coefficients is | |
| defined as the free abelian group of integral closed substacks of dimension $k$ | |
| up to rational equivalence. There is a flat pullback, a proper push-forward | |
| and a generalized Gysin homomorphism for regular local embeddings. If | |
| $\phi : \mathcal{X} \to Y$ is a moduli space (ie. a proper morphism with | |
| is bijective on | |
| geometric points), there is an induced push-forward $\CH_*(\mathcal{X}) \to | |
| \CH_k(Y)$ | |
| which is an isomorphism. | |
| \end{quote} | |
| \item Edidin, Graham: \emph{Equivariant Intersection Theory} | |
| \cite{edidin-graham} | |
| \begin{quote} | |
| The purpose of this article is to develop intersection theory with integral | |
| coefficients for a quotient stack $[X/G]$ of an action of an algebraic group | |
| $G$ on an algebraic space $X$ or, in other words, to develop a $G$-equivariant | |
| intersection theory of $X$. Equivariant chow groups defined using only | |
| invariant cycles does not produce a theory with nice properties. Instead, | |
| generalizing Totaro's definition in the case of $BG$ and motivated by the fact | |
| that if $V \to X$ is a vector bundle then $\CH_i(X) \cong \CH_i(V)$ | |
| naturally, the authors define $\CH_i^G(X)$ as follows: | |
| Let $\dim(X) = n$ and $\dim(G) = g$. For each $i$, choose a $l$-dimensional | |
| $G$-representation $V$ where $G$ acts freely on an open subset $U \subset V$ | |
| whose complement as codimension $d > n - i$. So $X_G = [X \times U / G]$ is an | |
| algebraic space (it can even be chosen to be a scheme). Then they define | |
| $\CH_i^G(X) = \CH_{i + l - g}(X_G)$. For the quotient stack, one defines | |
| $\CH_i( [X/G]) = \CH_{i + g}^G(X) = \CH_{i + l}(X_G)$. | |
| In particular, $\CH_i([X/G]) = 0$ for $i > \dim [X/G] = n - g$ | |
| but can be non-zero for $i \ll 0$. For example | |
| $\CH_i(B \mathbf{G}_m) = \mathbf{Z}$ for $i \le 0$. | |
| They establish that these equivariant Chow groups enjoy the same functorial | |
| properties as ordinary Chow groups. Furthermore, they establish that if | |
| $[X / G] \cong [Y / H]$ that $\CH_i([X/G]) = \CH_i([Y/H])$ | |
| so that the definition is | |
| independent on how the stack is presented as a quotient stack. | |
| \end{quote} | |
| \item | |
| Kresch: \emph{Cycle Groups for Artin Stacks} \cite{kresch_cycle} | |
| \begin{quote} | |
| Kresch defines Chow groups for arbitrary Artin stacks agreeing with Edidin and | |
| Graham's definition in \cite{edidin-graham} in the case of quotient stack. For | |
| algebraic stacks with affine stabilizer groups, the theory satisfies the usual | |
| properties. | |
| \end{quote} | |
| \item Behrend and Fantechi: \emph{The intrinsic normal cone} | |
| \cite{behrend-fantechi} | |
| \begin{quote} | |
| Generalizing a construction due to Li and Tian, Behrend and Fantechi construct | |
| a virtual fundamental class for a Deligne-Mumford stack. | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Quotient stacks} | |
| \label{subsection-quotient-stacks} | |
| \noindent | |
| Quotient stacks\footnote{In the literature, | |
| \emph{quotient stack} often means a stack of the | |
| form $[X/G]$ with $X$ an algebraic space and $G$ a subgroup scheme | |
| of $\text{GL}_n$ rather than an arbitrary flat group scheme.} | |
| form a very important subclass of Artin stacks which include almost all moduli | |
| stacks studied by algebraic geometers. The geometry of a quotient stack | |
| $[X/G]$ is the $G$-equivariant geometry of $X$. It is often easier to show | |
| properties are true for quotient stacks and some results are only known to be | |
| true for quotient stacks. The following papers address: When is an algebraic | |
| stack a global quotient stack? Is an algebraic stack ``locally'' a quotient | |
| stack? | |
| \begin{itemize} | |
| \item Laumon, Moret-Bailly: \cite[Chapter 6]{LM-B} | |
| \begin{quote} | |
| Chapter 6 contains several facts about the local and global structure of | |
| algebraic stacks. It is proved that an algebraic stack $\mathcal{X}$ over $S$ | |
| is a | |
| quotient stack $[Y/G]$ with $Y$ an algebraic space (resp. scheme, resp. affine | |
| scheme) and $G$ a finite group if and only if there exists an algebraic space | |
| (resp. scheme, resp. affine scheme) $Y'$ and an finite \'etale morphism $Y' | |
| \to \mathcal{X}$. It is shown that any Deligne-Mumford stack over $S$ and | |
| $x : \Spec(K) \to \mathcal{X}$ admits an representable, \'etale and | |
| separated morphism $\phi : [X/G] \to \mathcal{X}$ where $G$ is a finite group | |
| acting on an affine scheme over $S$ such | |
| that $\Spec(K) = [X/G] \times_\mathcal{X} \Spec(K)$. | |
| The existence of presentations | |
| with geometrically connected fibers is also discussed in detail. | |
| \end{quote} | |
| \item | |
| Edidin, Hassett, Kresch, Vistoli: | |
| \emph{Brauer Groups and Quotient stacks} \cite{ehkv} | |
| \begin{quote} | |
| First, they establish some fundamental (although not very difficult) | |
| facts concerning | |
| when a given algebraic stack (always assumed finite type over a Noetherian | |
| scheme in this paper) is a quotient stack. For an algebraic stack | |
| $\mathcal{X}$ : $\mathcal{X}$ is a quotient stack if and only if | |
| there exists a vector bundle $V \to \mathcal{X}$ such that for every | |
| geometric point, the stabilizer acts faithfully on the fiber | |
| if and only if there exists a vector bundle $V \to \mathcal{X}$ and | |
| a locally closed substack | |
| $V^0 \subset V$ such that $V^0$ is representable and surjects onto | |
| $\mathcal{X}$. They | |
| establish that an algebraic stack is a quotient stack if there exists finite | |
| flat cover by an algebraic space. Any smooth Deligne-Mumford stack with | |
| generically trivial stabilizer is a quotient stack. | |
| They show that a $\mathbf{G}_m$-gerbe over a Noetherian scheme $X$ | |
| corresponding to | |
| $\beta \in H^2(X, \mathbf{G}_m)$ is a quotient stack if and only if $\beta$ is | |
| in the | |
| image of the Brauer map $\text{Br}(X) \to \text{Br}'(X)$. They use this to | |
| produce a | |
| non-separated Deligne-Mumford stack that is not a quotient stack. | |
| \end{quote} | |
| \item Totaro: \emph{The resolution property for schemes and stacks} | |
| \cite{totaro_resolution} | |
| \begin{quote} | |
| A stack has the resolution property if every coherent sheaf is the quotient of | |
| a vector bundle. The first main theorem is that if $\mathcal{X}$ is a normal | |
| Noetherian algebraic stack with affine stabilizer groups at closed points, then | |
| the following are equivalent: (1) $\mathcal{X}$ has the resolution property and | |
| (2) | |
| $\mathcal{X} = [Y/\text{GL}_n]$ with $Y$ quasi-affine. In the case | |
| $\mathcal{X}$ is finite type over | |
| a field, then (1) and (2) are equivalent to: (3) | |
| $\mathcal{X} = [\Spec(A)/G]$ with $G$ | |
| an affine group scheme finite type over $k$. The implication that quotient | |
| stacks have the resolution property was proven by Thomason. | |
| The second main theorem is that if $\mathcal{X}$ is a smooth Deligne-Mumford | |
| stack over | |
| a field which has a finite and generically trivial stabilizer group | |
| $I_\mathcal{X} | |
| \to \mathcal{X}$ and whose coarse moduli space is a scheme with affine | |
| diagonal, then | |
| $\mathcal{X}$ has the resolution property. Another cool result states that if | |
| $\mathcal{X}$ is | |
| a Noetherian algebraic stack satisfying the resolution property, then | |
| $\mathcal{X}$ has | |
| affine diagonal if and only if the closed points have affine stabilizer. | |
| \end{quote} | |
| \item Kresch: \emph{On the Geometry of Deligne-Mumford Stacks} | |
| \cite{kresch_geometry} | |
| \begin{quote} | |
| This article summarizes general structure results of Deligne-Mumford | |
| stacks (of finite type over a field) and contains some interesting results | |
| concerning quotient stacks. It is shown that any smooth, separated, | |
| generically tame Deligne-Mumford stack with quasi-projective coarse moduli | |
| space is a quotient stack $[Y/G]$ with $Y$ quasi-projective and $G$ an | |
| algebraic group. If $\mathcal{X}$ is a Deligne-Mumford stack whose coarse | |
| moduli space | |
| is a scheme, then $\mathcal{X}$ is Zariski-locally a quotient stack if and only | |
| if it | |
| admits a Zariski-open covering by stack quotients of schemes by finite groups. | |
| If $\mathcal{X}$ is a Deligne-Mumford stack proper over a field of | |
| characteristic 0 | |
| with coarse moduli space $Y$, then: $Y$ is projective and $\mathcal{X}$ is a | |
| quotient stack if and only if $Y$ is projective and $\mathcal{X}$ | |
| possesses a generating sheaf if and only if | |
| $\mathcal{X}$ admits a closed embedding into a smooth proper DM stack with | |
| projective | |
| coarse moduli space. This motivates a definition that a Deligne-Mumford stack | |
| is \emph{projective} if there exists a closed embedding into a smooth, proper | |
| Deligne-Mumford stack with projective coarse moduli space. | |
| \end{quote} | |
| \item Kresch, Vistoli \emph{On coverings of Deligne-Mumford stacks and | |
| surjectivity of the Brauer map} \cite{kresch-vistoli} | |
| \begin{quote} | |
| It is shown that in characteristic 0 and for a fixed $n$, the following two | |
| statements are equivalent: (1) every smooth Deligne-Mumford stack of dimension | |
| $n$ is a quotient stack and (2) the Azumaya Brauer group coincides with the | |
| cohomological Brauer group for smooth schemes of dimension $n$. | |
| \end{quote} | |
| \item Kresch: \emph{Cycle Groups for Artin Stacks} \cite{kresch_cycle} | |
| \begin{quote} | |
| It is shown that a reduced Artin stack finite type over a field with affine | |
| stabilizer groups admits a stratification by quotient stacks. | |
| \end{quote} | |
| \item Abramovich-Vistoli: | |
| \emph{Compactifying the space of stable maps} \cite{abramovich-vistoli} | |
| \begin{quote} | |
| Lemma 2.2.3 establishes that for any separated Deligne-Mumford stack is | |
| \'etale-locally on the coarse moduli space a quotient stack $[U/G]$ where $U$ | |
| affine and $G$ a finite group. \cite[Theorem 2.12]{olsson_homstacks} shows in | |
| this argument $G$ is even the stabilizer group. | |
| \end{quote} | |
| \item Abramovich, Olsson, Vistoli: | |
| \emph{Tame stacks in positive characteristic} \cite{tame} | |
| \begin{quote} | |
| This paper shows that a tame Artin stack is \'etale locally on the coarse | |
| moduli space a quotient stack of an affine by the stabilizer group. | |
| \end{quote} | |
| \item Alper: \emph{On the local quotient structure of Artin stacks} | |
| \cite{alper_quotient} | |
| \begin{quote} | |
| It is conjectured that for an Artin stack $\mathcal{X}$ and a closed point $x | |
| \in \mathcal{X}$ | |
| with linearly reductive stabilizer, then there is an \'etale morphism $[V/G_x] | |
| \to \mathcal{X}$ with $V$ an algebraic space. Some evidence for this | |
| conjecture is | |
| given. A simple deformation theory argument (based on ideas in \cite{tame}) | |
| shows that it is true formally locally. A stack-theoretic proof of Luna's | |
| \'etale slice theorem is presented proving that for stacks | |
| $\mathcal{X} = [\Spec(A)/G]$ | |
| with $G$ linearly reductive, then \'etale locally on the GIT quotient | |
| $\Spec(A^G)$, $\mathcal{X}$ is a quotient stack by the stabilizer. | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Cohomology} | |
| \label{subsection-cohomology} | |
| \noindent | |
| Papers discussing cohomology of sheaves on algebraic stacks. | |
| \begin{itemize} | |
| \item Olsson: \emph{Sheaves on Artin stacks} \cite{olsson_sheaves} | |
| \begin{quote} | |
| This paper develops the theory of quasi-coherent and constructible sheaves | |
| proving basic cohomological properties. This paper corrects a mistake in | |
| \cite{LM-B} in the functoriality of the lisse-\'etale site. The cotangent | |
| complex is constructed. In addition, the following theorems are proved: | |
| Grothendieck's Fundamental Theorem for proper morphisms, Grothendieck's | |
| Existence Theorem, Zariski's Connectedness Theorem and finiteness theorem | |
| for proper pushforwards of coherent and constructible sheaves. | |
| \end{quote} | |
| \item Behrend: \emph{Derived $l$-adic categories for algebraic stacks} | |
| \cite{behrend_derived} | |
| \begin{quote} | |
| Proves the Lefschetz trace formula for algebraic stacks. | |
| \end{quote} | |
| \item Behrend: \emph{Cohomology of stacks} \cite{behrend_cohomology} | |
| \begin{quote} | |
| Defines the de Rham cohomology for differentiable stacks and singular | |
| cohomology for topological stacks. | |
| \end{quote} | |
| \item Faltings: | |
| \emph{Finiteness of coherent cohomology for proper fppf stacks} | |
| \cite{faltings_finiteness} | |
| \begin{quote} | |
| Proves coherence for direct images of coherent sheaves for proper morphisms. | |
| \end{quote} | |
| \item Abramovich, Corti, Vistoli: | |
| \emph{Twisted bundles and admissible covers} \cite{acv} | |
| \begin{quote} | |
| The appendix contains the proper base change theorem for \'etale cohomology | |
| for tame Deligne-Mumford stacks. | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Existence of finite covers by schemes} | |
| \label{subsection-finite-covers} | |
| \noindent | |
| The existence of finite covers of Deligne-Mumford stacks by schemes | |
| is an important result. In intersection theory on Deligne-Mumford | |
| stacks, it is an essential ingredient in defining proper push-forward | |
| for non-representable morphisms. There are several | |
| results about $\overline{\mathcal{M}}_g$ relying on the existence of a finite | |
| cover by a \emph{smooth} scheme which was proven by Looijenga. Perhaps the | |
| first result in this direction is \cite[Theorem 6.1]{seshadri_quotients} | |
| which treats the equivariant setting. | |
| \begin{itemize} | |
| \item Vistoli: \emph{Intersection theory on algebraic stacks and on their | |
| moduli spaces} \cite{vistoli_intersection} | |
| \begin{quote} | |
| If $\mathcal{X}$ is a Deligne-Mumford stack with a moduli space (ie. a proper | |
| morphism | |
| which is bijective on geometric points), then there exists a finite morphism | |
| $X \to \mathcal{X}$ from a scheme $X$. | |
| \end{quote} | |
| \item Laumon, Moret-Bailly: \cite[Chapter 16]{LM-B} | |
| \begin{quote} | |
| As an application of Zariski's main theorem, Theorem 16.6 establishes: if | |
| $\mathcal{X}$ is a Deligne-Mumford stack finite type over a Noetherian scheme, | |
| then | |
| there exists a finite, surjective, generically \'etale morphism $Z \to | |
| \mathcal{X}$ | |
| with $Z$ a scheme. It is also shown in Corollary 16.6.2 that any Noetherian | |
| normal algebraic space is isomorphic to the algebraic space quotient $X'/G$ | |
| for a finite group $G$ acting a normal scheme $X$. | |
| \end{quote} | |
| \item Edidin, Hassett, Kresch, Vistoli: | |
| \emph{Brauer Groups and Quotient stacks} \cite{ehkv} | |
| \begin{quote} | |
| Theorem 2.7 states: | |
| if $\mathcal{X}$ is an algebraic stack of finite type over a | |
| Noetherian ground scheme $S$, then the diagonal | |
| $\mathcal{X} \to \mathcal{X} \times_S \mathcal{X}$ is | |
| quasi-finite if and only if there exists a finite surjective | |
| morphism $X \to F$ from a scheme $X$. | |
| \end{quote} | |
| \item Kresch, Vistoli: \emph{On coverings of Deligne-Mumford stacks and | |
| surjectivity of the Brauer map} \cite{kresch-vistoli} | |
| \begin{quote} | |
| It is proved here that any smooth, separated Deligne-Mumford stack finite type | |
| over a field with quasi-projective coarse moduli space admits a finite, flat | |
| cover by a smooth quasi-projective scheme. | |
| \end{quote} | |
| \item Olsson: \emph{On proper coverings of Artin stacks} \cite{olsson_proper} | |
| \begin{quote} | |
| Proves that if $\mathcal{X}$ is an Artin stack separated | |
| and finite type over $S$, then | |
| there exists a proper surjective morphism $X \to \mathcal{X}$ from a scheme $X$ | |
| quasi-projective over $S$. As an application, Olsson proves coherence and | |
| constructibility of direct image sheaves under proper morphisms. As an | |
| application, he proves Grothendieck's existence theorem for proper | |
| Artin stacks. | |
| \end{quote} | |
| \item Rydh: \emph{Noetherian approximation of algebraic spaces and stacks} | |
| \cite{rydh_approx} | |
| \begin{quote} | |
| Theorem B of this paper is as follows. | |
| Let $X$ be a quasi-compact algebraic stack with quasi-finite and separated | |
| diagonal (resp.\ a quasi-compact Deligne-Mumford stack | |
| with quasi-compact and separated diagonal). Then there exists a scheme | |
| $Z$ and a finite, finitely presented and surjective morphism $Z \to X$ | |
| that is flat (resp.\ \'etale) over a dense quasi-compact open substack | |
| $U \subset X$. | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Rigidification} | |
| \label{subsection-rigidification} | |
| \noindent | |
| Rigidification is a process for removing a flat subgroup from the inertia. | |
| For example, if $X$ is a projective variety, the morphism from the Picard | |
| stack to the Picard scheme is a rigidification of the group of automorphism | |
| $\mathbf{G}_m$. | |
| \begin{itemize} | |
| \item Abramovich, Corti, Vistoli: | |
| \emph{Twisted bundles and admissible covers} \cite{acv} | |
| \begin{quote} | |
| Let $\mathcal{X}$ be an algebraic stack over $S$ and $H$ be a flat, finitely | |
| presented separated group scheme over $S$. Assume that for every object | |
| $\xi \in \mathcal{X}(T)$ there is an embedding | |
| $H(T) \hookrightarrow \text{Aut}_{\mathcal{X}(T)}(\xi)$ which is compatible | |
| under pullbacks in the sense that for every arrow $\phi : \xi \rightarrow \xi'$ | |
| over $f: T \rightarrow T'$ and $g \in H(T')$, $g \circ \phi = \phi \circ f^*g$. | |
| Then there exists an algebraic stack $\mathcal{X}/H$ and a | |
| morphism $\rho : \mathcal{X} \rightarrow \mathcal{X}/H$ which is | |
| an fppf gerbe such that for every $\xi \in \mathcal{X}(T)$, the morphism | |
| $\text{Aut}_{\mathcal{X}(T)} (\xi) | |
| \rightarrow \text{Aut}_{\mathcal{X}/H (T)} (\xi) $ | |
| is surjective with kernel $H(T)$. | |
| \end{quote} | |
| \item Romagny: \emph{Group actions on stacks and applications} | |
| \cite{romagny_actions} | |
| \begin{quote} | |
| Discusses how group actions behave with respect to rigidifications. | |
| \end{quote} | |
| \item Abramovich, Graber, Vistoli: | |
| \emph{Gromov-Witten theory for Deligne-Mumford stacks} \cite{agv} | |
| \begin{quote} | |
| The appendix gives a summary of rigidification as in \cite{acv} with two | |
| alternative interpretations. This paper also contains constructions for | |
| gluing algebraic stacks along closed substacks and for taking roots of line | |
| bundles. | |
| \end{quote} | |
| \item | |
| Abramovich, Olsson, Vistoli: \emph{Tame stacks in positive characteristic} | |
| (\cite{tame}) | |
| \begin{quote} | |
| The appendix handles the more complicated situation where the flat subgroup | |
| stack of the inertia $H \subset I_\mathcal{X}$ is normal but not | |
| necessarily central. | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Stacky curves} | |
| \label{subsection-stacky-curves} | |
| \noindent | |
| Papers discussing stacky curves. | |
| \begin{itemize} | |
| \item Abramovich, Vistoli: \emph{Compactifying the space of stable maps} | |
| \cite{abramovich-vistoli} | |
| \begin{quote} | |
| This paper introduces \emph{twisted curves}. The moduli space of stable | |
| maps from stable curves into an algebraic stack is typically not compact. | |
| By using maps from twisted curves, the authors construct a moduli stack | |
| which is proper when the target is a tame Deligne-Mumford stack whose | |
| coarse moduli space is projective. | |
| \end{quote} | |
| \item Behrend, Noohi: \emph{Uniformization of Deligne-Mumford curves} | |
| \cite{behrend-noohi} | |
| \begin{quote} | |
| Proves a uniformization theorem of Deligne-Mumford analytic curves. | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Hilbert, Quot, Hom and branchvariety stacks} | |
| \label{subsection-hilbert-quot-hom} | |
| \noindent | |
| Papers discussing Hilbert schemes and the like. | |
| \begin{itemize} | |
| \item Vistoli: \emph{The Hilbert stack and the theory of moduli of families} | |
| \cite{vistoli_hilbert} | |
| \begin{quote} | |
| If $\mathcal{X}$ is a algebraic stack separated and locally of finite type | |
| over a locally Noetherian and locally separated algebraic space $S$, Vistoli | |
| defines the Hilbert stack $\mathcal{H}\text{ilb}(\mathcal{F} / S)$ | |
| parameterizing finite and unramified morphisms from proper schemes. | |
| It is claimed without proof that $\mathcal{H}\text{ilb}(\mathcal{F} / S)$ | |
| is an algebraic stack. As a consequence, it is proved that with $\mathcal{X}$ | |
| as above, the Hom stack $\mathcal{H} \text{om}_S(T, \mathcal{X})$ is an | |
| algebraic stack if $T$ is proper and flat over $S$. | |
| \end{quote} | |
| \item Olsson, Starr: \emph{Quot functors for Deligne-Mumford stacks} | |
| \cite{olsson-starr} | |
| \begin{quote} | |
| If $\mathcal{X}$ is a Deligne-Mumford stack separated and locally of finite | |
| presentation over an algebraic space $S$ and $\mathcal{F}$ is a locally | |
| finitely-presented $\mathcal{O}_\mathcal{X}$-module, the quot functor | |
| $\text{Quot}(\mathcal{F} / \mathcal{X} / S)$ is represented by an algebraic | |
| space separated and locally of finite presentation over $S$. This paper | |
| also defines generating sheaves and proves existence of a generating sheaf | |
| for tame, separated Deligne-Mumford stacks which are global quotient stacks | |
| of a scheme by a finite group. | |
| \end{quote} | |
| \item Olsson: \emph{Hom-stacks and Restrictions of Scalars} | |
| \cite{olsson_homstacks} | |
| \begin{quote} | |
| Suppose $\mathcal{X}$ and $\mathcal{Y}$ are Artin stacks locally of finite | |
| presentation over an algebraic space $S$ with finite diagonal with | |
| $\mathcal{X}$ proper and flat over $S$ such that fppf-locally on $S$, | |
| $\mathcal{X}$ admits a finite finitely presented flat cover by an algebraic | |
| space (eg. $\mathcal{X}$ is Deligne-Mumford or a tame Artin stack). | |
| Then $\Hom_S(\mathcal{X}, \mathcal{Y})$ is an Artin stack locally | |
| of finite presentation over $S$. | |
| \end{quote} | |
| \item Alexeev and Knutson: \emph{Complete moduli spaces of branchvarieties} | |
| (\cite{alexeev-knutson}) | |
| \begin{quote} | |
| They define a branchvariety of $\mathbf{P}^n$ as a finite morphism | |
| $X \rightarrow \mathbf{P}^n$ from a \emph{reduced} scheme $X$. They prove | |
| that the moduli stack of branchvarieties with fixed Hilbert polynomial and | |
| total degrees of $i$-dimensional components is a proper Artin stack with | |
| finite stabilizer. They compare the stack of branchvarieties with the | |
| Hilbert scheme, Chow scheme and moduli space of stable maps. | |
| \end{quote} | |
| \item Lieblich: \emph{Remarks on the stack of coherent algebras} | |
| \cite{lieblich_remarks} | |
| \begin{quote} | |
| This paper constructs a generalization of Alexeev and Knutson's stack of | |
| branch-varieties over a scheme $Y$ by building the stack as a stack of | |
| algebras over the structure sheaf of $Y$. Existence proofs of $\text{Quot}$ | |
| and $\Hom$ spaces are given. | |
| \end{quote} | |
| \item Starr: \emph{Artin's axioms, composition, and moduli spaces} | |
| \cite{starr_artin} | |
| \begin{quote} | |
| As an application of the main result, a common generalization of Vistoli's | |
| Hilbert stack \cite{vistoli_hilbert} and Alexeev and Knutson's stack of | |
| branchvarieties \cite{alexeev-knutson} is provided. If $\mathcal{X}$ is | |
| an algebraic stack locally of finite type over an excellent scheme $S$ | |
| with finite diagonal, then the stack $\mathcal{H}$ parameterizing morphisms | |
| $g: T \rightarrow \mathcal{X}$ from a proper algebraic space $T$ with a | |
| $G$-ample line bundle $L$ is an Artin stack locally of finite type over $S$. | |
| \end{quote} | |
| \item Lundkvist and Skjelnes: | |
| \emph{Non-effective deformations of Grothendieck's Hilbert functor} | |
| \cite{lundkvist-skjelnes} | |
| \begin{quote} | |
| Shows that the Hilbert functor of a non-separated scheme is not represented | |
| since there are non-effective deformations. | |
| \end{quote} | |
| \item Halpern-Leistner and Preygel: | |
| \emph{Mapping stacks and categorical notions of properness} | |
| \cite{HL-P} | |
| \begin{quote} | |
| This paper gives a proof that the Hom stack is algebraic under some | |
| hypotheses on source and target which are more general than, or at | |
| least different from, the ones in Olsson's paper. | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Toric stacks} | |
| \label{subsection-toric} | |
| \noindent | |
| Toric stacks provide a great class of examples and a natural testing ground | |
| for conjectures due to the dictionary between the geometry of a toric stack | |
| and the combinatorics of its stacky fan in a similar way that toric varieties | |
| provide examples and counterexamples in scheme theory. | |
| \begin{itemize} | |
| \item Borisov, Chen and Smith: \emph{The orbifold Chow ring of toric | |
| Deligne-Mumford stacks} \cite{bcs} | |
| \begin{quote} | |
| Inspired by Cox's construction for toric varieties, this paper defines | |
| smooth toric DM stacks as explicit quotient stacks associated to a | |
| combinatorial object called a \emph{stacky fan}. | |
| \end{quote} | |
| \item Iwanari: \emph{The category of toric stacks} \cite{iwanari_toric} | |
| \begin{quote} | |
| This paper defines a \emph{toric triple} as a smooth Deligne-Mumford stack | |
| $\mathcal{X}$ with an open immersion $\mathbf{G}_m \hookrightarrow \mathcal{X}$ | |
| with dense image (and therefore $\mathcal{X}$ is an orbifold) and an action | |
| $\mathcal{X} \times \mathbf{G}_m \rightarrow \mathcal{X}$. It is shown that | |
| there is an equivalence between the 2-category of toric triples and the | |
| 1-category of stacky fans. The relationship between toric triples and the | |
| definition of smooth toric DM stacks in \cite{bcs} is discussed. | |
| \end{quote} | |
| \item Iwanari: \emph{Integral Chow rings for toric stacks} | |
| \cite{iwanari_chow} | |
| \begin{quote} | |
| Generalizes Cox's $\Delta$-collections for toric varieties to toric orbifolds. | |
| \end{quote} | |
| \item Perroni: \emph{A note on toric Deligne-Mumford stacks} | |
| \cite{perroni} | |
| \begin{quote} | |
| Generalizes Cox's $\Delta$-collections and Iwanari's paper | |
| \cite{iwanari_chow} to general smooth toric DM stacks. | |
| \end{quote} | |
| \item Fantechi, Mann, and Nironi: \emph{Smooth toric DM stacks} | |
| \cite{fmn} | |
| \begin{quote} | |
| This paper defines a smooth toric DM stack as a smooth DM stack | |
| $\mathcal{X}$ with the action of a DM torus $\mathcal{T}$ (ie. a Picard | |
| stack isomorphic to $T \times BG$ with $G$ finite) having an open dense | |
| orbit isomorphic to $\mathcal{T}$. They give a ``bottom-up description'' | |
| and prove an equivalence between smooth toric DM stacks and stacky fans. | |
| \end{quote} | |
| \item Geraschenko and Satriano: \emph{Toric Stacks I and II} | |
| \cite{gs_toric1} and \cite{gs_toric2} | |
| \begin{quote} | |
| These papers define a toric stack as the stack quotient of a toric | |
| variety by a subgroup of its torus. A generically stacky toric stack | |
| is defined as a torus invariant substack of a toric stack. This definition | |
| encompasses and extends previous definitions of toric stacks. The first | |
| paper develops a dictionary between the combinatorics of stacky fans | |
| and the geometry of the corresponding stacks. It also gives a moduli | |
| interpretation of smooth toric stacks, generalizing the one in \cite{perroni}. | |
| The second paper proves an intrinsic characterization of toric stacks. | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Theorem on formal functions and Grothendieck's Existence Theorem} | |
| \label{subsection-theorem-formal-functions} | |
| \noindent | |
| These papers give generalizations of the theorem on formal functions | |
| \cite[III.4.1.5]{EGA} (sometimes referred to Grothendieck's Fundamental | |
| Theorem for proper morphisms) and Grothendieck's Existence | |
| Theorem \cite[III.5.1.4]{EGA}. | |
| \begin{itemize} | |
| \item Knutson: \emph{Algebraic spaces} \cite[Chapter V]{Kn} | |
| \begin{quote} | |
| Generalizes these theorems to algebraic spaces. | |
| \end{quote} | |
| \item Abramovich-Vistoli: \emph{Compactifying the space of stable maps} | |
| \cite[A.1.1]{abramovich-vistoli} | |
| \begin{quote} | |
| Generalizes these theorems to tame Deligne-Mumford stacks | |
| \end{quote} | |
| \item Olsson and Starr: \emph{Quot functors for Deligne-Mumford stacks} | |
| \cite{olsson-starr} | |
| \begin{quote} | |
| Generalizes these theorems to separated Deligne-Mumford stacks. | |
| \end{quote} | |
| \item Olsson: \emph{On proper coverings of Artin stacks} | |
| \cite{olsson_proper} | |
| \begin{quote} | |
| Provides a generalization to proper Artin stacks. | |
| \end{quote} | |
| \item Conrad: \emph{Formal GAGA on Artin stacks} \cite{conrad_gaga} | |
| \begin{quote} | |
| Provides a generalization to proper Artin stacks and proves a formal | |
| GAGA theorem. | |
| \end{quote} | |
| \item Olsson: \emph{Sheaves on Artin stacks} \cite{olsson_sheaves} | |
| \begin{quote} | |
| Provides another proof for the generalization to proper Artin stacks. | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Group actions on stacks} | |
| \label{subsection-group-actions} | |
| \noindent | |
| Actions of groups on algebraic stacks naturally appear. | |
| For instance, symmetric group $S_n$ acts on $\overline{\mathcal{M}}_{g, n}$ | |
| and for an action of a group $G$ on a scheme $X$, the normalizer of $G$ in | |
| $\text{Aut}(X)$ acts on $[X/G]$. Furthermore, torus actions on stacks | |
| often appear in Gromov-Witten theory. | |
| \begin{itemize} | |
| \item Romagny: \emph{Group actions on stacks and applications} | |
| \cite{romagny_actions} | |
| \begin{quote} | |
| This paper makes precise what it means for a group to act on an algebraic | |
| stack and proves existence of fixed points as well as existence of quotients | |
| for actions of group schemes on algebraic stacks. See also Romagny's earlier | |
| note \cite{romagny_notes}. | |
| \end{quote} | |
| \end{itemize} | |
| \subsection{Taking roots of line bundles} | |
| \label{subsection-root-stacks} | |
| \noindent | |
| This useful construction was discovered independently by Cadman and by | |
| Abramovich, Graber and Vistoli. Given a scheme $X$ with an effective Cartier | |
| divisor $D$, the $r$th root stack is an Artin stack branched over $X$ at $D$ | |
| with a $\mu_r$ stabilizer over $D$ and scheme-like away from $D$. | |
| \begin{itemize} | |
| \item Charles Cadman | |
| \emph{Using Stacks to Impose Tangency Conditions on Curves} | |
| \cite{cadman} | |
| \item Abramovich, Graber, Vistoli: \emph{Gromov-Witten theory for | |
| Deligne-Mumford stacks} \cite{agv} | |
| \end{itemize} | |
| \subsection{Other papers} | |
| \label{subsection-other} | |
| \noindent | |
| Potpourri of other papers. | |
| \begin{itemize} | |
| \item Lieblich: \emph{Moduli of twisted sheaves} \cite{lieblich_twisted} | |
| \begin{quote} | |
| This paper contains a summary of gerbes and twisted sheaves. | |
| If $\mathcal{X} \rightarrow X$ is a $\mu_n$-gerbe with $X$ a projective | |
| relative surface with smooth connected geometric fibers, it is shown that | |
| the stack of semistable $\mathcal{X}$-twisted sheaves is an Artin stack | |
| locally of finite presentation over $S$. This paper also develops the | |
| theory of associated points and purity of sheaves on Artin stacks. | |
| \end{quote} | |
| \item Lieblich, Osserman: | |
| \emph{Functorial reconstruction theorem for stacks} | |
| \cite{lieblich-osserman} | |
| \begin{quote} | |
| Proves some surprising and interesting results on | |
| when an algebraic stack can be reconstructed from its associated functor. | |
| \end{quote} | |
| \item David Rydh: | |
| \emph{Noetherian approximation of algebraic spaces and stacks} | |
| \cite{rydh_approx} | |
| \begin{quote} | |
| This paper shows that every quasi-compact algebraic stack | |
| with quasi-finite diagonal can be approximated by a Noetherian stack. | |
| There are applications to removing the Noetherian hypothesis in results | |
| of Chevalley, Serre, Zariski and Chow. | |
| \end{quote} | |
| \end{itemize} | |
| \section{Stacks in other fields} | |
| \label{section-stacks-areas} | |
| \begin{itemize} | |
| \item Behrend and Noohi: \emph{Uniformization of Deligne-Mumford curves} | |
| \cite{behrend-noohi} | |
| \begin{quote} | |
| Gives an overview and comparison of topological, analytic and algebraic stacks. | |
| \end{quote} | |
| \item Behrang Noohi: \emph{Foundations of topological stacks I} \cite{noohi} | |
| \item David Metzler: \emph{Topological and smooth stacks} \cite{metzler} | |
| \end{itemize} | |
| \section{Higher stacks} | |
| \label{section-higher-stacks} | |
| \begin{itemize} | |
| \item Lurie: \emph{Higher topos theory} \cite{lurie_topos} | |
| \item Lurie: \emph{Derived Algebraic Geometry I - V} | |
| \cite{dag1}, \cite{dag2}, \cite{dag3}, \cite{dag4}, \cite{dag5} | |
| \item To\"en: \emph{Higher and derived stacks: a global overview} | |
| \cite{toen_higher} | |
| \item To\"en and Vezzosi: \emph{Homotopical algebraic geometry I, II} | |
| \cite{hag1}, \cite{hag2} | |
| \end{itemize} | |
| \input{chapters} | |
| \bibliography{my} | |
| \bibliographystyle{amsalpha} | |
| \end{document} | |