Affiliation:
1. Institut de Mathématiques de Jussieu‐Paris rive gauche Paris France
2. Mathematisches Institut Universität Bonn Bonn Germany
Abstract
AbstractThis is a survey article, with essentially complete proofs, of a series of recent results concerning the geometry of the characteristic foliation on smooth divisors in compact hyperkähler manifolds, starting with work by Hwang–Viehweg, but also covering articles by Amerik–Campana and Abugaliev. The restriction of the holomorphic symplectic form on a hyperkähler manifold to a smooth hypersurface leads to a regular foliation of rank 1, the characteristic foliation. The picture is complete in dimension 4 and shows that the behaviour of the leaves of on is determined by the Beauville–Bogomolov square of . In higher dimensions, some of the results depend on the abundance conjecture for .