On the degree of irrationality of low genus K3 surfaces
Abstract
Given a general polarized K3 surface S⊂ Pg of genus g 14, we study projections S Pg P2 of minimal degree and their variational structure. In particular, we prove that the degree of irrationality of all such surfaces is at most 4, and that for g=7,8,9,11 there are no rational maps S P2 of degree 3 induced by the primitive linear system. Our methods combine vector bundle techniques \`a la Lazarsfeld with derived category tools, and also make use of the rich theory of singular curves on K3 surfaces.
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