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“…We say that a holomorphic line bundle L over X is very ample if H 0 (X, L) gives an embedding of X into a complex projective space as a locally closed complex submanifold. In [12] he proved that L is very ample for torusless quasi-abelian varieties if it is positive. The Lefschetz-type theorem for general quasi-abelian varieties is reduced to the torusless case [12].…”
Section: (X L) −→ Af (ψ)mentioning
confidence: 99%
“…We say that a holomorphic line bundle L over X is very ample if H 0 (X, L) gives an embedding of X into a complex projective space as a locally closed complex submanifold. In [12] he proved that L is very ample for torusless quasi-abelian varieties if it is positive. The Lefschetz-type theorem for general quasi-abelian varieties is reduced to the torusless case [12].…”
Section: (X L) −→ Af (ψ)mentioning
confidence: 99%
“…In [12] he proved that L is very ample for torusless quasi-abelian varieties if it is positive. The Lefschetz-type theorem for general quasi-abelian varieties is reduced to the torusless case [12].…”
Section: (X L) −→ Af (ψ)mentioning
confidence: 99%
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