On Correspondences of a K3 Surface with itself, II
Abstract
Let X be a K3 surface with a polarization H of degree H2=2rs and with a primitive Mukai vector (r,H,s). The moduli space of sheaves over X with the isotropic Mukai vector (r,H,s) is again a K3 surface Y. We prove that Y X, if Picard lattice N(X) has an element h1 with h12=f(r,s), and the pair (H,h1) satisfies a finite number of congruence conditions modulo Ni(r,s). These conditions are exactly written and are necessary for Y X, if X is general with rk N(X)=2. Existence of such criterion is surprising and gives some geometric interpretation of elements in N(X) with negative square. We also desribe all divisorial conditions on moduli of (X,H) which imply Y X. Thus, here we treat in general problems considered in math.AG/0206158, math.AG/0304415, math.AG/0307355 when H.N(X)=Z was assumed. In general, the results are much more complicated and less efficient.
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