We study the positivity properties of Ulrich bundles defined with respect to an ample and globally generated polarization. First we prove a generalization of a theorem by Lopez on the first Chern class. Then, under some additional assumptions on the polarization, we give a description of its augmented base locus, which consequently leads to a characterization of the V-bigness and of the ampleness of an Ulrich bundle in this setting. Finally we study the normal generation of an Ulrich bundle focusing on curves, on surfaces with q=p_g=0 and on hypersurfaces of dimension 2 and 3.
On the positivity of Ulrich bundles / Buttinelli, Valerio. - (2026 Jan 20).
On the positivity of Ulrich bundles
buttinelli, Valerio
20/01/2026
Abstract
We study the positivity properties of Ulrich bundles defined with respect to an ample and globally generated polarization. First we prove a generalization of a theorem by Lopez on the first Chern class. Then, under some additional assumptions on the polarization, we give a description of its augmented base locus, which consequently leads to a characterization of the V-bigness and of the ampleness of an Ulrich bundle in this setting. Finally we study the normal generation of an Ulrich bundle focusing on curves, on surfaces with q=p_g=0 and on hypersurfaces of dimension 2 and 3.| File | Dimensione | Formato | |
|---|---|---|---|
|
Tesi_dottorato_Buttinelli.pdf
accesso aperto
Note: tesi completa
Tipologia:
Tesi di dottorato
Licenza:
Creative commons
Dimensione
1.35 MB
Formato
Adobe PDF
|
1.35 MB | Adobe PDF |
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
