Seminari del Dipartimento

Geometria

It is well known since the beginning of the 20th century that a minimal model of an algebraic complex surface is unique. From this one can deduce that minimal models of surfaces of general type with bounded volume form a bounded family.
In this talk I will show how the number of minimal models of an n-dimensional manifold can be bounded in term of its volume for any n. Moreover, I will explain that in any dimension minimal models of general type and bounded volume form a bounded family. 
This is based on a joint work with D. Martinelli and S. Schreieder.
 
 
org: VIVIANI Filippo