The following pages link to On a Theorem of Van de Ven (Q3510102):
Displaying 19 items.
- Around the Van Daele-Schmüdgen theorem (Q487208) (← links)
- Van Lambalgen's theorem and high degrees (Q540405) (← links)
- Uniqueness of equivariant compactifications of \(\mathbb{C}^n\) by a Fano manifold of Picard number 1 (Q743729) (← links)
- Very ampleness of \(K_ x\otimes {\mathcal L}^{\dim \,{\mathbf{X}}}\) for ample and spanned line bundles \({\mathcal L}\) (Q752102) (← links)
- On a result of van Mill and Schrijver (Q1072148) (← links)
- On the mathematical work of Le Van Thiem. (Q1396072) (← links)
- On the failure cycles for the quadratic normality of a projective variety (Q1919900) (← links)
- Submanifolds of \(\mathbb{P}^n(l)\) with splitting tangent sequence (Q2115197) (← links)
- A remark on Zak's theorem on tangencies (Q2391556) (← links)
- Rational curves of minimal degree and characterizations of projective spaces (Q2498482) (← links)
- Submanifolds with splitting tangent sequence (Q2571062) (← links)
- Recognizing ℙ<sup><i>n</i></sup>in Classical and Modern Setting (Q2827238) (← links)
- (Q3187647) (← links)
- (Q3367822) (← links)
- When van Lambalgen’s Theorem fails (Q3420060) (← links)
- On the Non-Splitting of the Normal Bundle Sequence (Q3656741) (← links)
- A Remark on a Theorem of Vo Van Tan (Q3788283) (← links)
- On a theorem of Vesentini (Q4811182) (← links)
- On manifolds whose tangent bundle contains an ample subbundle. (Q5950704) (← links)