Moduli spaces of one dimensional sheaves on log surfaces and Hilbert schemes

Abstract

Let X be a smooth projective rational surface, D⊂ X an effective anticanonical curve, β a curve class on X and d=Σ wiPi an effective divisor on Dsm. We consider the moduli space Mβ(X, D, d) of sheaves on X which are direct images of rank-1 torsion-free sheaves on integral curves C in β such that C|D=d, and show that each point of Mβ(X, D, d) is smooth over a point in the product of the Hilbert schemes of surface singularities of types Awi-1. Hence, Mβ(X, D, d) has symplectic singularities and admits a unique symplectic resolution.