Collections of parabolic orbits in homogeneous spaces, homogeneous dynamics and hyperkahler geometry

Ekaterina Amerik; Misha Verbitsky

Collections of parabolic orbits in homogeneous spaces, homogeneous dynamics and hyperkahler geometry

Ekaterina Amerik, Misha Verbitsky

Abstract

Let $M$ be a hyperkähler manifold with $b_2(M)\geq 5$. We improve our earlier results on the Morrison-Kawamata cone conjecture by showing that the Beauville-Bogomolov square of the primitive MBM classes (i.e. the classes whose orthogonal hyperplanes bound the Kähler cone in the positive cone, or, in other words, the classes of negative extremal rational curves on deformations of $M$) is bounded in absolute value by a number depending only on the deformation class of $M$. The proof uses ergodic theory on homogeneous spaces.

Collections of parabolic orbits in homogeneous spaces, homogeneous dynamics and hyperkahler geometry

Abstract

Let

be a hyperkähler manifold with

. We improve our earlier results on the Morrison-Kawamata cone conjecture by showing that the Beauville-Bogomolov square of the primitive MBM classes (i.e. the classes whose orthogonal hyperplanes bound the Kähler cone in the positive cone, or, in other words, the classes of negative extremal rational curves on deformations of

) is bounded in absolute value by a number depending only on the deformation class of

. The proof uses ergodic theory on homogeneous spaces.

Collections of parabolic orbits in homogeneous spaces, homogeneous dynamics and hyperkahler geometry

Abstract

Collections of parabolic orbits in homogeneous spaces, homogeneous dynamics and hyperkahler geometry

Abstract

Paper Structure

Table of Contents