This thesis studies linear systems of divisors on Hyperkähler manifolds. A relationship between linear systems on Hilbert squares on a K3 surface and Gaussian maps is established, then is used for the study of Gaussian maps on canonical curves. An infinite family of non-divisorial base loci for ample divisors is constructed for Hilbert schemes of points on K3 surfaces. The formulae for the Euler characteristic of divisors is completed for the last two known examples of Hyperkähler manifolds. In addition, a general theorem is proved on the asymptotic base loci of big divisors on Hyperkähler manifolds.
Linear systems on hyperkahler manifolds
RIOS ORTIZ, ANGEL DAVID
2022
Abstract
This thesis studies linear systems of divisors on Hyperkähler manifolds. A relationship between linear systems on Hilbert squares on a K3 surface and Gaussian maps is established, then is used for the study of Gaussian maps on canonical curves. An infinite family of non-divisorial base loci for ample divisors is constructed for Hilbert schemes of points on K3 surfaces. The formulae for the Euler characteristic of divisors is completed for the last two known examples of Hyperkähler manifolds. In addition, a general theorem is proved on the asymptotic base loci of big divisors on Hyperkähler manifolds.File in questo prodotto:
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Utilizza questo identificativo per citare o creare un link a questo documento:
https://hdl.handle.net/20.500.14242/192563
Il codice NBN di questa tesi è
URN:NBN:IT:UNIROMA1-192563