On the cohomology ring of the moduli space of rank 2 vector bundles on a curve

Abstract

Let g be the moduli space of stable holomorphic vector bundles of rank 2 and fixed determinant of odd degree over a smooth complex projective curve of genus g. This paper proves various properties of the rational cohomology ring H*(g). It is shown that the first relation in genus g between the standard generators satisfies a recurrence relation in g and that the invariant subring for the mapping class group is a complete intersection ring. (These two results have been obtained independently by Zagier, Baranovsky and Siebert & Tian.) A Gr\"obner basis is found for the ideal of invariant relations. A structural formula for H*(g) (originally conjectured by Mumford) is verified and a natural monomial basis is given.

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