A classification of Lagrangian planes in holomorphic symplectic varieties

Abstract

Classically, an indecomposable class R in the cone of effective curves on a K3 surface X is representable by a smooth rational curve if and only if R2=-2. We prove a higher-dimensional generalization conjectured by Hassett and Tschinkel: for a holomorphic symplectic variety M deformation equivalent to a Hilbert scheme of n points on a K3 surface, an extremal curve class R∈ H2(M,Z) in the Mori cone is the line in a Lagrangian n-plane Pn⊂ M if and only if certain intersection-theoretic criteria are met. In particular, any such class satisfies (R,R)=-n+32 and the primitive such classes are all contained in a single monodromy orbit.