On some moduli spaces of bundles on K3 surfaces, II

Abstract

We give many examples in which there exist infinitely many divisorial conditions on the moduli space of polarized K3 surfaces (S,H) of degree H2=2g-2, g ≥ 3, and Picard number rk N(S)=(S)=2 such that for a general K3 surface S satisfying these conditions the moduli space of sheaves MS(r,H,s) is birationally equivalent to the Hilbert scheme S[g-rs] of zero-dimensional subschemes of S of lenght equal to g-rs. This result generalizes the main result of Nik1 when g=rs+1 and of Monat when r=s=2, g ≥ 5.