Frederic Campana, Fei Wang, De-Qi Zhang
Published 2012-03-26Version 1
We prove two results about the natural representation of a group G of automorphisms of a normal projective threefold X on its second cohomology. We show that if X is minimal then G, modulo a normal subgroup of null entropy, is embedded as a Zariski-dense subset in a semi-simple real linear algebraic group of real rank < 3. Next, we show that X is a complex torus if the image of G is an almost abelian group of positive rank and the kernel is infinite, unless X is equivariantly non-trivially fibred.
Comments: Transactions of the American Mathematical Society (to appear)
Pseudo-Automorphisms of positive entropy on the blowups of products of projective spaces
A hierarchy of topological systems with completely positive entropy
A theorem of Tits type for compact Kahler manifolds
![QR code for arXiv:1203.5665 [math.DS]](http://oss.arxitics.com/images/favicon.svg)