Geometrical finiteness for automorphism groups via cone conjecture

This paper aims to establish the geometrical finiteness for the natural isometric actions of (birational) automorphism groups on the hyperbolic spaces for K3 surfaces, Enriques surfaces, Coble surfaces, and irreducible symplectic varieties. As an application, it can be seen that such groups are non-positively curved: CAT (0) and relatively hyperbolic. In the case of K3 surfaces, we additionally provide a dynamical characterization of the relative hyperbolicity, and the first counterexample to Mukai's conjecture concerning the virtual cohomological dimension of automorphism groups.