On symplectic birational self-maps of projective hyperk\"ahler manifolds of K3[n]-type
Abstract
We prove that projective hyperk\"ahler manifolds of K3[n]-type admitting a non-trivial symplectic birational self-map of finite order are isomorphic to moduli spaces of stable (twisted) coherent sheaves on K3 surfaces. Motivated by this result, we analyze the reflections on the movable cone of moduli spaces of sheaves and determine when they come from a birational involution.
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