Semistable sheaves on Del Pezzo surfaces and Kronecker modules
Abstract
In this paper we deal with semistable sheaves which can be represented as the cokernel of an injective (or as the kernel of a surjective) morphism E1m E2n , where E1 and E2 are exceptional bundles. To each such a sheaf we assign the linear map m*(E1,E2) n. We obtain sufficient conditions on the topological invariants of the sheaves for the moduli space of the sheaves to be isomorphic to the quotient of an open subset in L(m*(E1,E2),n) under the action of SL(m)×SL(n).
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