Uhlenbeck compactification as a Bridgeland moduli space

Abstract

Let (X,H) be a smooth, projective, polarized surface over C, and let v ∈ Knum(X) be a class of positive rank. We prove that for certain Bridgeland stability conditions σ = (A, Z) "on the vertical wall" for v, the good moduli space Mσ(v) parameterizing S-equivalence classes of σ-semistable objects of class v in A is projective. Moreover, we construct a bijective morphism MUhl(v) Mσ(v) from the Uhlenbeck compactification of μ-stable vector bundles.