A note on deformations of moduli spaces of sheaves on K3 surfaces

Abstract

In this paper we study deformation classes of moduli spaces of sheaves on a projective K3 surface. More precisely, let (S1,H1) and (S2,H2) be two polarized K3 surfaces, m∈N, and for i=1,2 let mvi be a Mukai vector on Si such that Hi is mvi-generic. Moreover, suppose that the moduli spaces Mmv1(S1,H1) of H1-semistable sheaves on S1 of Mukai vector mv1 and Mmv2(S2,H2) of H2-semistable sheaves on S2 with Mukai vector mv2, have the same dimension. The aim of this paper is to prove that Mmv1(S1,H1) is deformation equivalent to Mmv2(S2,H2), showing a conjecture of Z. Zhang contained in [18].