Abstract:
The Cremona group is the group of birational transformations of the projective plane.
One of the key techniques to understand its group structure is its isometric action on an
infinite dimensional hyperboloid. We will explain this action and give some examples on
how it can be used to prove some structure results about the Cremona group. In particular,
we will show that the Cremona group is not simple and describe its simple subgroups.