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$H^2(X,T_X)=0$ implies the Frölicher spectral sequence degenerates at $E_1$?

Let $X$ be a compact complex manifold, if $X$ satisfies $H^2(X,T_X)=0$, then it is well-known that the Kuranishi space of $X$ is smooth by Kodaira and Spencer's deformation theory. On the other hand, ...
Tom's user avatar
  • 471
1 vote
0 answers
96 views

Birational deformations of holomorphic symplectic manifolds

Let $X$ and $X'$ be birational holomorphic symplectic manifolds. Then the birational morphism between them identifies $H^2(X)$ with $H^2(Y)$. The period space of $X$ is defined to be a subset of $\...
fgh's user avatar
  • 178
2 votes
0 answers
129 views

Hodge coniveaux of Calabi-Yau manifolds

Let $X$ be a strict compact Calabi-Yau manifold of dimension $n$. By this, I mean that $X$ is a simply connected projective manifold whose holomorphic forms are generated by a nowhere zero top degree ...
Pène Papin's user avatar
5 votes
0 answers
284 views

Formal neighborhood of stable curves

For a smooth projective curve $X/\mathbb{C}$, every (infinitesimal) deformation is trivial when restricted to $X \setminus x$ for any $x \in X$. In particular, all deformations can be obtained by “...
E. KOW's user avatar
  • 834
2 votes
0 answers
110 views

Invariance of plurigenera: singular surface case

The invariance of plurigenera is one most central problems in deformation theory. I mainly concern about the (singular) surface setting in this post since Iitaka had proved that the deformation ...
Invariance's user avatar
3 votes
1 answer
167 views

semiample of canonical bundle in a smooth family (Campana's proof)

The following lemma is due to Campana, The class $\mathcal C$ is not stable by small deformations Let $\mathcal X\rightarrow \Delta$ be a smooth family, if $K_{X_0}$ is nef and big, then so is every ...
Invariance's user avatar
1 vote
0 answers
240 views

Unexpected holomorphic tubular neighborhood

While considering a "plumbed family of complex curves" (i.e. a complex $1$-parameter family of smooth curves degenerating to a nodal curve), I encountered an unexpected holomorphic tubular ...
Mohan Swaminathan's user avatar
1 vote
0 answers
176 views

Obstruction map for holomorphic line bundle $\operatorname{Ob}_L:H^1(X,\mathcal O)\to H^2(X,\mathcal O)$

$\DeclareMathOperator\Ob{Ob}$In Chan & Suen's paper A differential-geometric approach to deformation of pairs $(X, E)$ p.20, the authors define a Kuranishi map (or obstruction map) for the ...
Tom's user avatar
  • 471
1 vote
0 answers
257 views

When the whole space $H^2(X,\mathbb Q)$ can be represented by $c(L_t)$ of $X_t$?

Let $X$ be a compact complex manifold, $\pi:\mathcal X\to B$ be a holomorphic family of $X$ with $X_t=\pi^{-1}(t),t\in B$, and $X_0=X$. Let $L_t$ be a holomorphic line bundle over $X_t$, then its ...
Tom's user avatar
  • 471
2 votes
1 answer
261 views

Smooth, non-isotrivial fibration with vanishing Kodaira-Spencer map at a point

This question arose by reading the paper [1], in particular, the remark at p. 737: As an example, consider a non-isotrivial smooth projective morphism $f \colon X \to Y$ from a smooth projective ...
Francesco Polizzi's user avatar
5 votes
1 answer
521 views

Deformation invariance of Chern classes

Let $\pi:\mathcal X\to B$ be a deformation of a compact complex manifold $X=\pi^{-1}(0)$, then for any $t\in B$, the first Chern class $c_1(X)=c_1(X_t)$? I know the Chern class of a manifold depends ...
Tom's user avatar
  • 471
2 votes
1 answer
386 views

Period map for $\partial\bar\partial$-manifolds

When we talk about the theory of variation of Hodge structures, we always assume that the central fiber is a Kähler manifold $X$, then consider a family of deformations $\pi:\mathcal X\to B$ and the ...
Tom's user avatar
  • 471
4 votes
0 answers
218 views

Why does a deformation modify the complex structure *holomorphically*?

This is a question regarding Chapter 9.1 of Claire Voisin's book [1] Let $\phi: \mathcal X \to B$ be a family of compact complex manifolds, that is a proper holomorphic submersion, with central fiber $...
red_trumpet's user avatar
  • 1,286
4 votes
0 answers
130 views

Stability of Ricci-flat Fujiki class $\mathcal C$ by small deformations

As we know, a compact Kähler manifold remains Kähler after any infinitesimal deformations. Since a compact complex manifold in Fujiki class $\mathcal C$ is bimeromorphic to a Kähler manifold, it was ...
Tom's user avatar
  • 471
4 votes
0 answers
236 views

Deform a non-Kähler manifold to a Kähler one

Let $X$ be a compact complex non-Kähler manifold, then what conditions do we need to make it has a Kähler deformation? that is to say it can be deformed to a Kähler manifold. Obviously not all the ...
Tom's user avatar
  • 471
1 vote
0 answers
161 views

Manifolds with $[,]:H^1(X,T_X)\times H^1(X,T_X)\rightarrow 0$

Let $X$ be a compact complex manifold, for arbitrary $\phi_1,\phi_2\in H^1(X,T_X)$, if the Lie bracket $[,]:H^1(X,T_X)\times H^1(X,T_X)\rightarrow H^2(X,T_X)$ always maps $\phi_1,\phi_2$ to zero, i.e.$...
Tom's user avatar
  • 471
6 votes
1 answer
877 views

The period map and the Kodaira--Spencer map

Let $f : X \to B$ be a non-isotrivial holomorphic submersion with connected fibres between compact Kähler manifolds of positive relative dimension. Suppose the fibres of $f$ are Calabi--Yau $(c_{1,\...
GradStudent's user avatar
5 votes
0 answers
218 views

Reducible surface as a degeneration

I am interested in the following situation. If $S_1\cup_D S_2$ is a union of two irreducible smooth projective surfaces over $k=\overline{k}$(over $k=\mathbb{C}$ is enough, if it's relevant) glued ...
Sungwoo's user avatar
  • 71
6 votes
1 answer
335 views

Universal deformation space of a cuspidal plane cubic curve

Does anyone have a reference for the universal deformation space of a cuspidal plane cubic curve? Specifically, a reference that discusses its discriminant locus -- Apparently it has a cuspidal ...
AmorFati's user avatar
  • 1,379
4 votes
0 answers
207 views

Rigid non-algebraic manifolds

The famous Kodaira problem asks: whether a compact Kähler manifold can always be deformed to a projective manifold? In order to provide a counterexample, one way is trying to construct a rigid compact ...
Tom's user avatar
  • 471
1 vote
0 answers
125 views

Explicit resolution of $\Omega^1_C$ for prestable curve $C$

Suppose $C$ is a complex projective curve (or a compact $1$-dimensional connected reduced complex space). If $C$ is smooth, then its module of differentials $\Omega^1_C$ is locally free. If $C$ is a ...
Mohan Swaminathan's user avatar
0 votes
0 answers
82 views

How geometry changes up to Hermitian inner product on Line bundle (Kodaira embedding)

Riemann metric $g \colon= \Sigma g_{ij} dx_i \otimes dx_j$ on a Kähler manifold $M$ will define the length of a line on $M$, i.e. intrinsic geometry. The line bundle $L$ on $M$ is equipped with a ...
Pierre's user avatar
  • 563
8 votes
1 answer
431 views

Holomorphic deformation of complex structure on the real plane

It is known that each complex structures on $\mathbb{R}^2$ is biholomorphic to either $\mathbb{C}$ or the open unit disk $\Delta$. One can continuously deform one complex structure to the other as is ...
Paul's user avatar
  • 1,409
5 votes
0 answers
189 views

Extension of holomorphic maps to smooth family of holomorphic maps

Let $\pi:X \to D^2$ be a family of diffeomorphic (but not isomorphic) complex manifolds. Each fiber is allowed to have boundary but is compact (maybe not Stein) and $D^2 \subset \mathbb{C}$ is a ...
Paul's user avatar
  • 1,409
5 votes
1 answer
824 views

Coarse moduli space versus Kuranishi family

We will work over complex number field $\mathbb{C}$. Let $\mathscr{M}_h$ be the moduli functor for canonically polarized manifolds with $h$ the Hilbert polynomial. Let us denote by $M_h$ the coarse ...
Higgs-Boson's user avatar
0 votes
1 answer
385 views

Some questions about Clemens' paper Cohomology and Obstructions I: Geometry of formal Kuranishi theory

I am reading the paper Cohomology and Obstructions I: Geometry of formal Kuranishi theory written by Herbert Clemens. I have found this paper hard to follow even though I am familiar with the ...
Wei Xia's user avatar
  • 157
7 votes
0 answers
506 views

A general definition of an equisingular family of singular varieties?

This question is about the existence of a definition. I'm far from being an expert in the field in question I apologize in advance for any inaccuracies or stupid and wrong assumptions. Let $X$ be a ...
Saal Hardali's user avatar
  • 7,789
15 votes
2 answers
2k views

Deformations of Calabi-Yau manifolds

Let $X$ be a compact complex smooth manifold with holomorphically trivial canonical class. It is true that any (sufficiently small?) deformation of the complex structure of $X$ also has ...
asv's user avatar
  • 21.8k
9 votes
2 answers
613 views

When is a formal deformation convergent?

Let $X$ be a finite type scheme over $\mathbb{C}$ and let $ \mathcal{X} \to Spf(\mathbb{C}[[x]])$ be a formal deformation of $X$. Which of the following assumptions (or combinations thereof) are ...
Saal Hardali's user avatar
  • 7,789
3 votes
1 answer
275 views

Deformation Theoretic Interpretation of $H^1(C,T_C(-2p))$

Suppose $C$ is a (non-singular) compact Riemann surface of genus $g$ and with $n$ (distinct) marked points $p_1,\ldots,p_n$. If we assume the stability condition ($2-2g-n<0$), then it is proved in "...
Mohan Swaminathan's user avatar
3 votes
1 answer
169 views

Degeneration of coadjoint orbits

Let $X$ be a projective manifold and we have a degeneration of fibers such that they are biholomorphic to coadjoint orbits, i.e, $X\to \Delta$ , and fibers $X_t$ are biholomorphic to coadjoint orbits ...
q123e's user avatar
  • 39
13 votes
3 answers
1k views

DGLA or $L_{\infty}$-algebra controlling the deformation of Einstein metrics and instantons

As proposed by Quillen, Drinfeld, and Deligne and other important mathematicians, there is supposed to be a philosophy that, at least over a field of characteristic zero, assigns to every "deformation ...
Bilateral's user avatar
  • 2,818
4 votes
0 answers
254 views

Deformation space and Kodaira-Spencer map of cyclic Galois coverings

This question concerns a statement from the paper by Ben Moonen "Special subvarieties arising from families of cyclic covers of the projective line. Documenta Math. 15 (2010)", Lemma 5.5. ii). More ...
Darius Math's user avatar
  • 2,221
1 vote
1 answer
393 views

Deformations of a compact complex manifold

(Note: originally asked on stackexchange) Let $X$ be a compact, complex manifold and $A\in \textbf{Art}$ where $\textbf{Art}$ is the category of local artinian $\mathbb{C}$-algebras with residue ...
user374252's user avatar
7 votes
0 answers
215 views

"Tubular neighbourhood" for non-reduced curves

I have a manifold $X$ covered by a family of elliptic curves, some of which have non-reduced structure (like multiple fibers on elliptic surfaces; such non-reduced curves $C$ are members of my family, ...
Katia Amerik's user avatar
4 votes
1 answer
398 views

Deformation of $\mathbb{P}^1 \times \mathbb{P}^1$

I learnt that $\mathbb{P}^1 \times \mathbb{P}^1$ is rigid, but can be deformed to a non-rigid Hirzebruch surface $S$. Suppose $\pi: M \to B$ is such deformation such that $\mathbb{P}^1 \times \mathbb{...
Li Yutong's user avatar
  • 3,472
2 votes
1 answer
499 views

Normal bundle to fibers of a rational morphism

Let $f:X\dashrightarrow C$ be a rational fibration from a 3-dimensional variety $X$ to a curve $C$ such that generic fiber is smooth and different fibers intrsect in smooth curves. Take $S$ to be a ...
lks8271's user avatar
  • 165
2 votes
1 answer
483 views

Local deformations of Lagrangian submanifolds in holomorphic symplectic manifold and their intersections

Let $Y\subset X$ be a Lagrangian submanifold in a holomorphic symplectic manifold $X$. We know that there exists a local moduli space $M$, which parametrizes lagrangian submanifolds in $X$(there are ...
Lya's user avatar
  • 63
6 votes
0 answers
227 views

Deformation of Complex Spaces

I am trying to learn about deformations of complex spaces from the paper of Palamodov. I am particularly interested in the relative tangent cohomology. Is there any other modern reference to this ...
Chitrabhanu's user avatar
4 votes
0 answers
245 views

Deformations of the moduli space of ppav's

Consider the complex algebraic moduli space $X:=\mathcal A_g^n$ of ppav's of dimension $g$ with some high enough level $n$ structure (so that it represents the corresponding functor). Can one compute ...
Christian's user avatar
  • 193
5 votes
1 answer
307 views

Infinitesimal deformations of fake projective planes (or ball quotients)

This question is related to the answer I gave to this MO question. What I'm asking is probably well-known to the experts in the field, and I apologize in advance if this turns out to be trivial. By ...
Francesco Polizzi's user avatar
7 votes
2 answers
1k views

References for the moduli space of complex structures

I am looking for references where the moduli space of complex structures on a complex manifold is well explained: in particular the infinitesimal deformations, the obstructions, the elliptic complex ...
Bilateral's user avatar
  • 2,818
1 vote
1 answer
389 views

Infinitely many rational nt multisection in elliptic K3 surfaces by deformation theory

I'm trying to read this paper of Bogomolov and Tschinkel http://arxiv.org/pdf/math/9902092.pdf about potential density of rational points on elliptic K3 Surfaces. I got quite stuck in Corollary 3.27 ...
Angelo's user avatar
  • 13
14 votes
0 answers
709 views

Is Hironaka's example the only known deformation of Kähler manifolds with non-Kähler central fibre?

A well-known example in the deformation theory of compact complex manifolds is the one given by Hironaka in his 1962 paper An Example of a Non-Kählerian Complex-Analytic Deformation of Kählerian ...
Michael Albanese's user avatar
15 votes
1 answer
3k views

Kodaira-Spencer theory of deformation done right

I thought in asking this question on Math StackExchange, but by my experience I don' t think anyone will notice me. Recently, I started studying deformation of complex manifolds in the sense of ...
user40276's user avatar
  • 2,227
2 votes
0 answers
366 views

Deformation over small disk and deformation over complex disk

Let $D=\mathop{Spec}(\mathbb C[[t]])$ be the algebraic small disk and let $\Delta= \{z\in \mathbb C: |z|<1\} $. Let $X_0$ be an algebraic surface over $\mathop{Spec}\mathbb C$ Suppose now that I ...
Rogelio Yoyontzin's user avatar
5 votes
1 answer
534 views

Existence of logarithmic structures and d-semistability

I am reading a paper ( Kawamata, Y.; Namikawa, Y. Logarithmic deformations of normal crossing varieties and smoothing of degenerate Calabi-Yau varieties. Invent. math. 1994, 118, 395–409.) I have a ...
Rogelio Yoyontzin's user avatar
3 votes
1 answer
319 views

How to determine "genericness" of an element of a family of algebraic varieties?

Given a (flat) family of complex algebraic varieties $X_t$ (say parametrized by $\mathbb{C}$) and a specific $t_0$, how does one proceed to check if $X_{t_0}$ is a 'generic element'? More precisely, ...
pinaki's user avatar
  • 5,339
4 votes
1 answer
257 views

Is there a rigid curve in a product of complex manifolds?

Let $X=Y\times Z$ be a product of complex manifolds $Y,Z$. Is it true that there exists no rigid curve on $X$? Here I mean by a rigid curve a curve which is not a member of any family of curves on $X$....
Thom's user avatar
  • 41
11 votes
1 answer
930 views

Deformations of smooth projective hypersurfaces and the Jacobian ring

It is a well-known result of Griffiths that the pieces of Hodge filtration of a smooth hypersurface $X:= (f=0)$ of degree $d$ in $\mathbb{P}^{n}$ are isomorphic to graded pieces of the Jacobian ring ...
Jack's user avatar
  • 637