The polarized degree of irrationality of K3 surfaces

Abstract

Given a polarized variety (X,L), we construct and study projections of low degree X P(H0(L)) P n using the associated kernel bundles. As an application, we can show that the degree of irrationality of a very general (1,6) abelian surface, as well as that of a very general K3 surface of genus 6 is 3. We also give new upper bounds for K3 surfaces of any genus. Moreover, in the case of surfaces, this observation can be used to show that maps of the degree at most d move in families. We study the family of projections of minimal degree of a very general K3 surface of genus 4,5,6. As a different application of our construction, we exhibit new rational maps of low degree for some hyper-K\"ahler varieties, abelian varieties and Gushel--Mukai threefolds.