Snehajit Misra
TIFR, Mumbai
March 19, 2020
Ampleness of vector bundles: A line bundle $L$ on a smooth projective variety $X$ is called ample if some positive multiple $mL$ of $L$ gives a closed embedding of $X$ into a projective space. A vector bundle $V$ on $X$ is called ample if the tautological line bundle on the associated projective bundle $P(E)$ over $X$ is ample. In this talk, we will discuss about the ampleness criterion of vector bundles on smooth projective varieties.
TIFR, Mumbai
March 19, 2020
Ampleness of vector bundles: A line bundle $L$ on a smooth projective variety $X$ is called ample if some positive multiple $mL$ of $L$ gives a closed embedding of $X$ into a projective space. A vector bundle $V$ on $X$ is called ample if the tautological line bundle on the associated projective bundle $P(E)$ over $X$ is ample. In this talk, we will discuss about the ampleness criterion of vector bundles on smooth projective varieties.