.vscode/ltex.dictionary.en-US.txt

@@ -58,24 +58,3 @@ Goresky
 Schottky
 Calabi
 Yau
-Tian
-Brendle
-Guenancia
-Biquard
-Fano
-anticanonical
-orbifold
-Eyssidieux
-Guedj
-Zeriahi
-Kolodziej
-Cho
-Choi
-Hein
-smoothable
-Datar
-Fu
-Delcroix
-Székelyhidi
-Tosatti
-Chiu

MFO26.tex

@@ -3,7 +3,6 @@
 %
 % Local font definitions -- need to come first
 %
-\usepackage{amsthm}
 \usepackage{libertine}
 \usepackage[libertine]{newtxmath}
 
@@ -21,8 +20,6 @@
 
 \sloppy
 
-\newtheorem*{q}{Question}
-
 % Colours for hyperlinks
 \definecolor{lightgray}{RGB}{220,220,220}
 \definecolor{gray}{RGB}{180,180,180}
@@ -119,14 +116,14 @@ insight into the singular setting, which remains open to date.
 
 \paragraph{Non-compact Setting}
 
-Geometers study Lagrangian fibrations over non-compact bases in the framework of
+In the non-compact setting, geometers study Lagrangian fibrations in the
-the ``$P=W$ conjecture,'' which Maulik--Shen and Hausel--Mellit--Minets--Schiffmann
+framework of the ``$P=W$ conjecture,'' which Maulik–Shen and
-have recently proved \cite{arXiv:2209.02568, arXiv:2209.05429}.  In the same
+Hausel–Mellit–Minets–Schiffmann have recently proved \cite{arXiv:2209.02568,
-setting, Shen–Yin discovered a remarkable symmetry of certain pushforward
+arXiv:2209.05429}.  In the same setting, Shen–Yin discovered a remarkable
-sheaves and conjectured that more general symmetries exist. Schnell has recently
+symmetry of certain pushforward sheaves and conjectured that more general
-established these conjectures in \cite{arXiv:2303.05364} and also proved two
+symmetries exist. Schnell has recently established these conjectures in
-conjectures of Maulik–Shen–Yin on the behavior of certain perverse sheaves near
+\cite{arXiv:2303.05364} and also proved two conjectures of Maulik–Shen–Yin on
-singular fibers.
+the behavior of certain perverse sheaves near singular fibers.
 
 
 \subsubsection{Singer--Hopf conjecture and fundamental groups of Kähler manifolds}
@@ -150,78 +147,57 @@ group theory with experts on Hodge theory and to explore further potential
 applications of the methods from one field to problems in the other.
 
 
-\subsection{Canonical Metrics and Hyperbolicity}
+\subsection{Canonical metrics and Kobayashi hyperbolicity}
 
-\subsubsection{Kähler--Einstein Metrics with Conic Singularities and Their Limits}
+\subsubsection{Kähler-Einstein metrics with conic singularities and their limits}
 
-In the proof of the Donaldson--Tian--Yau conjecture, which Chen--Donaldson--Sun
+In the proof of Donaldson-Tian-Yau conjecture -around 2015-, the Kähler-Einstein
-gave in a series of papers around 2015, Kähler--Einstein metrics with conic
+metrics with conic singularities along a smooth divisor are playing a key role.
-singularities along a smooth divisor emerged to play a vital role. Since then,
+Since then, they have become an object of study in its own right. For example,
-these metrics have become an object of study in their own right.  The work of
+we currently dispose of results which are completely analog to Yau’s celebrated
-Brendle, Donaldson, Guenancia, Rubinstein, and many others provides a complete
+solution of Calabi conjecture in conic setting, by the work of S. Brendle, S.
-package of results that generalize Yau's celebrated solution of the Calabi
+Donaldson, H. Guenancia, Y. Rubinstein,  among many others. 
-conjecture to the conic setting.  Today, many exciting recent developments in
-this field gravitate around the following general question.
 
-\begin{q}
+An important number of the exciting recent developments in this field are
-  Let $X$ be a projective manifold, and let $D\subset $ be a non-singular
+gravitating around the following general question: \emph{let $X$ be a projective
-  divisor.  Assume that for every sufficiently small angle $0< \beta << 1$,
+manifold, and let $D\subset $ be a non-singular divisor. We assume that for each
-  there exists a unique Kähler--Einstein metric $\omega_\beta$ with conic
+angle $0< \beta<< 1$ small enough, there exists a unique KE metric
-  singularities of angle $2\pi\beta$ along $D$.  In other words, assume that
+$\omega_\beta$ with conic singularities of angle $2\pi\beta$ along $D$, i.e.
-  \[
+$$Ricci_{\omega_\beta}= \lambda \omega_{\beta}+ (1-\beta)[D],$$
-    Ricci_{\omega_\beta}= \lambda \cdot \omega_{\beta}+ (1-\beta)\cdot [D],
+where $\lambda$ is equal to -1 or 1. Can one extract a limit of $(\omega_\beta)$
-    \quad
+as $\beta\to 0$, eventually after rescaling}?
-    \text{where } \lambda \in \{ \pm 1\}.
-  \]
-  Is there a meaningful limit of $\omega_\beta$ as $\beta\to 0$, perhaps after
-  rescaling?
-\end{q}
 
-Starting with \cite{zbMATH07615186}, a series of articles by Biquard--Guenancia
+The series of articles by Biquard-Guenancia —2022 and 2024-- settle many
-settles many relevant (and technically challenging!) particular cases of this
+interesting and technically challenging particular casses of this question:
-question.
+toroidal compactifications of ball quotients -in which the limit mentioned above
-\begin{itemize}
+is the hyperbolic metric- and the case of a Fano manifold together with a
-  \item If $(X,D)$ is the toroidal compactification of a ball quotient, then the
+divisor $D$ proportional to the anticanonical class -the limit of the rescaled
-  limit of the metric exists and equals the hyperbolic metric.
+metric is the Tian-Yau metric. 
+\smallskip
 
-  \item If $X$ is Fano and $D$ is a divisor whose class is proportional to the
+On the other hand, there has been increasing interest in the understanding of
-  anticanonical class, then the limit of the rescaled metric exists and equals
+Kähler-Einstein metrics on singular spaces. Perhaps one of the first result in
-  the Tian--Yau metric. 
+this direction is due to S. Kobayashi (construction of orbifold Kähler-Einstein
-\end{itemize}
+metrics), while a definitive existence result for a large class of singularities
-More work is ongoing, and we expect to report on substantial progress by the
+was obtained by Eyssidieux-Guedj-Zeriahi by combining Yau's technique with S.
-time our workshop takes place.
+Kolodziej's $\mathcal C^0$ estimates. Recently Li-Tian-Wang extended
+Chen-Donaldson-Sun’s solution of the Yau-Tian-Donaldson conjecture to general
+$\mathbb Q$-Fano varieties. Thus, we now have several sources/motivations for
+studying singular Kähler-Einstein metrics on normal varieties.
 
-
+For applications it is desirable to have control of the geometry of these
-\subsubsection{Kähler--Einstein Metrics on Singular Spaces}
+metrics near the singularities, but so far little is known in general. The
-
+continuity of their potential has only been established very recently (beginning
-Motivated by progress in the Minimal Model Program, there has been increasing
+of 2024) by Y.-W- Luke and Y.-J. Choi. Beyond that, the main progress in this
-interest in Kähler--Einstein metrics on singular spaces.  While one of the first
+direction is due to Hein-Sun, who showed that near a large class of smoothable
-results in this direction dates back to the early 1970s when Kobayashi
+isolated singularities that are locally isomorphic to a Calabi-Yau cone, the
-constructed orbifold Kähler--Einstein metrics, a definitive existence result for
+singular Calabi-Yau metric must be asymptotic in a strong sense to the
-a relevant class of singularities was obtained by Eyssidieux--Guedj--Zeriahi
+Calabi-Yau cone metric. Recently an analogous result was shown by Datar-Fu-Song
-about 15 years ago in \cite{zbMATH05859416}, by combining Yau's technique with
+in the case of isolated log canonical singularities using the bounded geometry
-Kolodziej's $\mathcal C^0$ estimates.  Much more recently, Li--Tian--Wang
+method, and precise asymptotics were obtained shortly after by Fu-Hein-Jiang.
-extended Chen-Donaldson-Sun's solution of the Yau--Tian--Donaldson conjecture to
+Important contributions in direct connection with these topics are due to S.-K.
-general $\mathbb Q$-Fano varieties \cite{zbMATH07382001, zbMATH07597119}.
+Chiu,T. Delcroix, H.-J. Hein, C. Li, Y. Li, S. Sun, G. Székelyhidi, V. Tosatti
-
+and K. Zhang.
-For most applications, it is essential to control the geometry of these metrics
-near the singularities.  Despite the problem's obvious importance, little is
-known so far.  The continuity of the metric's potential has been established
-quite recently in the preprint \cite{arXiv:2401.03935} of Cho--Choi. Beyond
-that, the main progress in this direction is due to Hein--Sun
-\cite{zbMATH06827885}, who showed that near a large class of smoothable isolated
-singularities that are locally isomorphic to a Calabi-Yau cone, the singular
-Calabi-Yau metric must be asymptotic in a strong sense to the Calabi-Yau cone
-metric.  Using the bounded geometry method, Datar--Fu--Song recently showed an
-analogous result in the case of isolated log canonical singularities
-\cite{zbMATH07669617}.  Fu–Hein–Jiang obtained precise asymptotics shortly
-after, \cite{zbMATH07782497}. Essential contributions directly connected to
-these topics are due to Chiu, Delcroix, Hein, C.~Li, Y.~Li, Sun, Székelyhidi,
-Tosatti, and Zhang.
-
-\bigskip
-
-{\color{red}\textbf --- DO NOT READ ANYTHING BELOW THIS LINE ---}
 
 
 \subsubsection{Complex hyperbolicity}

general.bib

@@ -1,132 +1,3 @@
-@Article{zbMATH07782497,
- Author = {Fu, Xin and Hein, Hans-Joachim and Jiang, Xumin},
- Title = {Asymptotics of {K{\"a}hler}-{Einstein} metrics on complex hyperbolic cusps},
- FJournal = {Calculus of Variations and Partial Differential Equations},
- Journal = {Calc. Var. Partial Differ. Equ.},
- ISSN = {0944-2669},
- Volume = {63},
- Number = {1},
- Pages = {34},
- Note = {Id/No 6},
- Year = {2024},
- Language = {English},
- DOI = {10.1007/s00526-023-02613-4},
- Keywords = {32Q20,35J96,53C55},
- zbMATH = {7782497},
- Zbl = {1535.32023}
-}
-
-@Article{zbMATH07669617,
- Author = {Datar, Ved and Fu, Xin and Song, Jian},
- Title = {K{\"a}hler-{Einstein} metrics near an isolated log-canonical singularity},
- FJournal = {Journal f{\"u}r die Reine und Angewandte Mathematik},
- Journal = {J. Reine Angew. Math.},
- ISSN = {0075-4102},
- Volume = {797},
- Pages = {79--116},
- Year = {2023},
- Language = {English},
- DOI = {10.1515/crelle-2022-0095},
- Keywords = {83C75,53C21,32Q20,03C80,35B35,83C30},
- zbMATH = {7669617},
- Zbl = {1521.83164}
-}
-
-@Article{zbMATH06827885,
- Author = {Hein, Hans-Joachim and Sun, Song},
- Title = {Calabi-{Yau} manifolds with isolated conical singularities},
- FJournal = {Publications Math{\'e}matiques},
- Journal = {Publ. Math., Inst. Hautes {\'E}tud. Sci.},
- ISSN = {0073-8301},
- Volume = {126},
- Pages = {73--130},
- Year = {2017},
- Language = {English},
- DOI = {10.1007/s10240-017-0092-1},
- Keywords = {32Q25,32Q20,14J32},
- URL = {www.numdam.org/articles/10.1007/s10240-017-0092-1/},
- zbMATH = {6827885},
- Zbl = {1397.32009}
-}
-
-@misc{arXiv:2401.03935,
-      title={Continuity of solutions to complex Monge-Amp\`{e}re equations on compact K\"{a}hler spaces}, 
-      author={Ye-Won Luke Cho and Young-Jun Choi},
-      year={2024},
-      eprint={2401.03935},
-      archivePrefix={arXiv},
-      primaryClass={math.DG},
-      url={https://arxiv.org/abs/2401.03935}, 
-}
-
-@Article{zbMATH07597119,
- Author = {Li, Chi and Tian, Gang and Wang, Feng},
- Title = {The uniform version of {Yau}-{Tian}-{Donaldson} conjecture for singular {Fano} varieties},
- FJournal = {Peking Mathematical Journal},
- Journal = {Peking Math. J.},
- ISSN = {2096-6075},
- Volume = {5},
- Number = {2},
- Pages = {383--426},
- Year = {2022},
- Language = {English},
- DOI = {10.1007/s42543-021-00039-5},
- Keywords = {32Q20,32Q26,14J45},
- zbMATH = {7597119},
- Zbl = {1504.32068}
-}
-
-@Article{zbMATH07382001,
- Author = {Li, Chi and Tian, Gang and Wang, Feng},
- Title = {On the {Yau}-{Tian}-{Donaldson} conjecture for singular {Fano} varieties},
- FJournal = {Communications on Pure and Applied Mathematics},
- Journal = {Commun. Pure Appl. Math.},
- ISSN = {0010-3640},
- Volume = {74},
- Number = {8},
- Pages = {1748--1800},
- Year = {2021},
- Language = {English},
- DOI = {10.1002/cpa.21936},
- Keywords = {32Q20,14J45,53C55},
- zbMATH = {7382001},
- Zbl = {1484.32041}
-}
-
-@Article{zbMATH05859416,
- Author = {Eyssidieux, Philippe and Guedj, Vincent and Zeriahi, Ahmed},
- Title = {Singular {K{\"a}hler}-{Einstein} metrics},
- FJournal = {Journal of the American Mathematical Society},
- Journal = {J. Am. Math. Soc.},
- ISSN = {0894-0347},
- Volume = {22},
- Number = {3},
- Pages = {607--639},
- Year = {2009},
- Language = {English},
- DOI = {10.1090/S0894-0347-09-00629-8},
- Keywords = {32W20,32Q20,32J27,14J17},
- zbMATH = {5859416},
- Zbl = {1215.32017}
-}
-
-@Article{zbMATH07615186,
- Author = {Biquard, Olivier and Guenancia, Henri},
- Title = {Degenerating {K{\"a}hler}-{Einstein} cones, locally symmetric cusps, and the {Tian}-{Yau} metric},
- FJournal = {Inventiones Mathematicae},
- Journal = {Invent. Math.},
- ISSN = {0020-9910},
- Volume = {230},
- Number = {3},
- Pages = {1101--1163},
- Year = {2022},
- Language = {English},
- DOI = {10.1007/s00222-022-01138-5},
- Keywords = {32Q20,53C55,35J99},
- zbMATH = {7615186},
- Zbl = {1510.32057}
-}
-
 @Article{zbMATH07790946,
  Author = {Llosa Isenrich, Claudio and Py, Pierre},
  Title = {Subgroups of hyperbolic groups, finiteness properties and complex hyperbolic lattices},
@@ -206,24 +77,6 @@
       url={https://arxiv.org/abs/2309.16763}, 
 }
 
-@article {MR4044463,
-    AUTHOR = {Musta\c t\u a, Mircea and Popa, Mihnea},
-     TITLE = {Hodge ideals},
-   JOURNAL = {Mem. Amer. Math. Soc.},
-  FJOURNAL = {Memoirs of the American Mathematical Society},
-    VOLUME = {262},
-      YEAR = {2019},
-    NUMBER = {1268},
-     PAGES = {v+80},
-      ISSN = {0065-9266,1947-6221},
-      ISBN = {978-1-4704-3781-7; 978-1-4704-5509-5},
-   MRCLASS = {14D07 (14F17 14J17 32S25)},
-  MRNUMBER = {4044463},
-MRREVIEWER = {Matthias\ Wendt},
-       DOI = {10.1090/memo/1268},
-       URL = {https://doi.org/10.1090/memo/1268},
-}
-
 @article {MR4081135,
     AUTHOR = {Mustaţă, Mircea and Popa, Mihnea},
      TITLE = {Hodge filtration, minimal exponent, and local vanishing},