The Hodge--Poincar\'e polynomial of the moduli spaces of stable vector bundles over an algebraic curve
manuscripta math. 137, 19-55 (2012) Let X be a nonsingular complex projective variety that is acted on by a reductive group $G$ and such that $X^{ss} \neq X_{(0)}^{s}\neq \emptyset$. We give formulae for the Hodge--Poincar\'e series of the quotient $X_{(0)}^s/G$. We use these computations to ob...
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| Zusammenfassung: | manuscripta math. 137, 19-55 (2012) Let X be a nonsingular complex projective variety that is acted on by a
reductive group $G$ and such that $X^{ss} \neq X_{(0)}^{s}\neq \emptyset$. We
give formulae for the Hodge--Poincar\'e series of the quotient $X_{(0)}^s/G$.
We use these computations to obtain the corresponding formulae for the
Hodge--Poincar\'e polynomial of the moduli space of properly stable vector
bundles when the rank and the degree are not coprime. We compute explicitly the
case in which the rank equals 2 and the degree is even. |
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| DOI: | 10.48550/arxiv.0809.0287 |