Poincare sheaves on the moduli spaces of torsionfree sheaves over an irreducible curve
Abstract
Let Y be a geometrically irreducible reduced projective curve defined over real numbers. Let UY (respectively, U'Y) be the moduli space of geometrically stable torsionfree sheaves (respectively, locally free sheaves) on Y of rank n and degree d. Define \, =\, d+n(1-genus(Y)), where genus(Y) is the arithmetic genus. If 2n is coprime to , then there is a Poincare sheaf over UY× Y. If 2n is not coprime to , then there is no Poincare sheaf over any nonempty open subset of U'Y.
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