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Let $S$ be a smooth complex projective surface which is a complete intersection and such that $K_S=\mathcal{O}_S(k)$, $k >0$. Let $C$ be a smooth curve on $S$ such that $C^2 >0$. I'm interested in a …

Let $D$ be a big and nef divisor on a smooth complex projective minimal surface and let $\phi_D$ be the induced rational map. Is it true that $\phi_D$ is generically finite? Otherwise does someone kno …

I'm not able to figure out the precise relation between nefness and freeness of a rational curve $C$ on a projective variety $X$. A curve is said to be nef if it intersects non-negatively every effe …

Hi everybody, let $\mathcal{P}_g$ be the moduli stack parametrizing pairs $(S,C)$ where $S$ is a K3 surface with a primitive polarization $L$ of genus $g$ and $C \in |L|$ is a smooth curve of genus $ …

Hi everybody, let $X$ be a smooth projective variety of dimension $n$ and let $f:\mathbb{P}^1 \rightarrow X$ be a morphism. A theorem of Grothendieck says that the vector bundle $f^{*}T_X$ splits as …