Symplectic birational transformations of the plane

Abstract

We study the group of symplectic birational transformations of the plane. It is proved that this group is generated by SL(2,Z), the torus and a special map of order 5, as it was conjectured by A. Usnich. Then we consider a special subgroup H, of finite type, defined over any field which admits a surjective morphism to the Thompson group of piecewise linear automorphisms of Z2. We prove that the presentation for this group conjectured by Usnich is correct.