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Algebraic varieties, stacks, sheaves, schemes, moduli spaces, complex geometry, quantum cohomology.
1
vote
2
answers
304
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Why does the divisor $Z$ homologous to $0$ in projective mainfold satisfy that every irreduc...
In Voisin's book "Hodge theory and complex algebraic geometry I",
the proof of proposition 12.7 (page 296) says that
if $X$ is projective, then every divisor $Z$ homologous to $0$ can be written as …
1
vote
0
answers
87
views
How to prove Butler's inequality for the maximal slope of the kernel bundle?
In Butler' paper "Normal generation of vector bundles over a curve" (J.d.g.,1994). Proposition 1.4 said that
$$prop^+(M_E)\leq \max\left\{-2,\frac{-prop^+(E)}{prop^+(E)-g}\right\}$$
where $E$ is a g …
2
votes
Monodromy group of 1-dimensional families of hyperelliptic curves
The following reference may be helpful to you:
[1] Yukio Matsumoto, José María Montesinos-Amilibia, Pseudo-periodic homeomorphisms and degeneration of Riemann Surfaces, Bull. Amer. Math. Soc., 30(19 …
3
votes
1
answer
225
views
Why $\pi_1(X)\cong \pi_1(Y)$ for a double cover $\pi:X\to Y$ with a nef, smooth and big bran...
Let $X,Y$ be smooth algebraic surfaces and $\pi:X\to Y$ be a double cover.
Let $B\subseteq Y$ be the branch locus. We assume that $B$ is nef, big and smooth.
[1] says that $\pi_1(X)\cong\pi_1(Y)$ (Se …
2
votes
0
answers
504
views
How to find the global equation of a dual curve?
(1) Let $C\subseteq \mathbb{P}^2$ be a curve defined by a homogeneous equation $F(X,Y,Z)=0$. The dual curve of C, denoted by $C'$, is the image of the map
$$[X,Y,Z]\to [\frac{\partial F}{\partial X},\ …
2
votes
1
answer
1k
views
What is Mordell-Weil lattice?
What is Mordell-Weil lattice?
4
votes
2
answers
513
views
Why do the subgroups of $Hdg^{2k}(X)$ generated by the cycle classes and Chern classes of ve...
In Voinsin's book [1], Theorem 11.32 (page 280) says:
"If X is an algebraic variety, these subgroups of $Hdg^{2k}(X) coincide."
However, the proof did not show that the subgroup generated by
cycle …
2
votes
Global sections of a linear system
As I know, Sheng-li Tan is an expert on the linear systems on algebraic surfaces. You can refer to his papers such as [1]. I think you will find what you desire.
In the case for ruled surface, you c …
11
votes
0
answers
561
views
How to get a Dehn-twist presentation of a periodic map of a Riemann surface?
Let $f:S\to S$ be a given periodic map of order $n$, and $(m_i,\lambda_i, \sigma_i)$ be the valency of the multiple point $p_i$ of $f$ ( $i=1,\cdots,r$ ).
A classical result says such $f$ is isotop …
0
votes
1
answer
485
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What is a right-handed Dehn twist of a cut curve of a Riemann surface?
Let $\Sigma_g$ be a Riemann surface of genus g, and $C$ is a cut curve of $\Sigma_g$, i.e. an oriented simple close curve.
What is a right-handed Dehn twist of $C$ of $\Sigma_g$?
13
votes
1
answer
1k
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How to compute the Picard-Lefschetz monodromy matrix of a non-semistable fiber?
Let $f:X\to B$ be a family of curves of genus $g$ over a smooth curve $B$. Let $F_0$ be a singular fiber.
If $F_0$ is a semistable fiber, the monodromy matrix can be gotten by the classical Picard-L …