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For questions about or involving complex manifolds.

3 votes
0 answers
231 views

Kawamata BPF applied to a semi-positive line bundle using Demailly's holomorphic Morse inequ...

Let $M$ be a compact complex manifold equipped with a line bundle $L$ which has curvature which is non-negative and strictly positive outside of a measure zero set $Z$. In his paper "Holomorphic Mors …
Misha Verbitsky's user avatar
8 votes
2 answers
373 views

Real analytic subvariety in complex manifold which is complex outside of its singular set

Let $M$ be a complex manifold, and $Z \subset M$ a closed real analytic subvariety. Suppose that the set of smooth points in $Z$ is complex analytic in $M$. Will it follow that $Z$ is complex analytic …
Misha Verbitsky's user avatar
5 votes

“Logarithmic” form of Kodaira Embedding

Sure, you should assume that there are sufficiently many functions which grow polynomially. Here is an example of such a result. THEOREM: Let $M$ be a Stein variety equipped with a Kahler metric outsi …
Misha Verbitsky's user avatar
2 votes

Holomorphic vector fields acting on Dolbeault cohomology

Klemyatin proved that this action is trivial if the corresponding ${\Bbb C}$-flow is compatible with some metric (hence can be extended to a compact torus action), https://arxiv.org/abs/1909.04075, (N …
Misha Verbitsky's user avatar
7 votes
0 answers
126 views

holomorphic functions on Stein manifolds reaching maxima in a given point on the boundary (S...

Let $M$ be a Stein manifold with smooth, strictly pseudoconvex boundary, and $x$ a point on its boundary. Is there a holomorphic function $f$ on $M$, smooth on the boundary, with strict maximum of $|f …
Misha Verbitsky's user avatar
1 vote

HKT manifolds with non trivial canonical bundle

For $SU(3)$ and Hopf it is the anticanonical bundle which has many sections. In other examples of Joyce, it is also the anticanonical bundle or its powers. For nilmanifolds, the canonical bundle is ho …
Misha Verbitsky's user avatar
6 votes

Cohomology of neighborhood of $\mathbb{C}\mathbb{P}^1$ in $\mathbb{C}\mathbb{P}^n$

It is not hard to see that the first cohomology is infinite-dimensional. Take a complement $M:=CP^3 \ CP^1$ and consider a projection $\pi:\; M \mapsto CP^1$. It is not hard to see that $M$ is isomor …
Misha Verbitsky's user avatar
5 votes
2 answers
383 views

fibers of birational contraction for complex manifolds - are they Moishezon?

Let $X$ be a smooth complex manifold and $\phi:\; X \mapsto Y$ a proper holomorphic map which is birational ("birational contraction"), and $Z= \phi^{-1}(y)$ its fiber in a point $y$. The variety $Y$ …
Misha Verbitsky's user avatar
5 votes

Different notions of convergence of complex subvarieties

For Kahler manifold this is true. First, notice that limits in the sense of Barlett or Douady clearly (up to multiplicity) coincide with the limits in Hausdorff topology on the set of compact subsets. …
Misha Verbitsky's user avatar
3 votes

Foliations by holomorphic curves on complex surfaces

This is a question which is related to Lagrangian foliations on hyperkaehler manifolds, but much of the results are conjectures, or unpublished. Let $M$ be a K3, and $\omega$ a cohomology class on a b …
Misha Verbitsky's user avatar
5 votes
Accepted

Is it always possible to extend a closed (1, 1)-form on a divisor to a closed (1, 1)-form on...

Yes. For the proof, see e.g. http://arxiv.org/abs/math/0609617 Theorem 4.1. Here a stronger result is actually proven: Theorem: Let $(M, \omega)$ be a compact Kahler manifold, and $Z\subset M$ a clos …
Misha Verbitsky's user avatar