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Michael Albanese
Michael Albanese
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Are most of the KahlerKähler manifolds non projective-projective?

Since now-a-days lots of research activities are happening to prove many results for compact KahlerKähler manifolds which are known for projective varieties, I was wondering are there plenty of non-projective KahlerKähler manifolds? If yes, where can I find some explicit examples? I am aware of the theorem that a generic complex torus $\mathbb{C}^g/\Lambda$ is non-projective.

Are most of the Kahler manifolds non projective?

Since now-a-days lots of research activities are happening to prove many results for compact Kahler manifolds which are known for projective varieties, I was wondering are there plenty of non-projective Kahler manifolds? If yes, where can I find some explicit examples? I am aware of the theorem that a generic complex torus $\mathbb{C}^g/\Lambda$ is non-projective.

Are most Kähler manifolds non-projective?

Since now-a-days lots of research activities are happening to prove many results for compact Kähler manifolds which are known for projective varieties, I was wondering are there plenty of non-projective Kähler manifolds? If yes, where can I find some explicit examples? I am aware of the theorem that a generic complex torus $\mathbb{C}^g/\Lambda$ is non-projective.

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Bingo
Bingo
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Are most of the Kahler manifolds non projective?

Since now-a-days lots of research activities are happening to prove many results for compact Kahler manifolds which are known for projective varieties, I was wondering are there plenty of non-projective Kahler manifolds? If yes, where can I find some explicit examples? I am aware of the theorem that a generic complex torus $\mathbb{C}^g/\Lambda$ is non-projective.