Characteristic foliations -- a survey

Abstract

This 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 hyperk\"ahler 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 hyperk\"ahler manifold X to a smooth hypersurface D⊂ X leads to a regular foliation F⊂ TD of rank one, the characteristic foliation. The picture is complete in dimension four and shows that the behavior of the leaves of F on D is determined by the Beauville-Bogomolov square q(D) of D. In higher dimensions, some of the results depend on the abundance conjecture for D.